0 1 0 2 H [1]
1 1 248943333 2 T [0]
2 2 15925 2 H [3]
3 2 91434681.0 2 T [2, 4]
4 2 91434682.0 2 H [3, 5]
5 2 92093328.0 2 T [4, 6]
6 2 92093329 2 H [5, 7]
7 2 178043169.0 2 T [8, 6]
8 2 178043170.0 3 H [9, 7]
9 2 221204993.0 3 T [8, 10]
10 2 221204994 2 H [9, 11]
11 2 221284178.0 2 T [10, 75, 12]
12 2 221284179.0 2 H [11, 13]
13 2 242181356 2 T [12]
14 3 0 2 H [15]
15 3 198230596 2 T [14]
16 4 0 2 H [17]
17 4 190202564 2 T [16]
18 5 19315 2 H [19]
19 5 207673.2 2 T [18, 20]
20 5 207674.2 1 H [19, 21]
21 5 216966.8 1 T [20, 22]
22 5 216967.8 2 H [21, 23]
23 5 181472713 2 T [22]
24 6 0 2 H [25]
25 6 170739897 2 T [24]
26 7 0 2 H [27]
27 7 159334984 2 T [26]
28 8 0 2 H [29]
29 8 7938217.0 2 T [32, 28, 30]
30 8 7938218.0 2 H [29, 31]
31 8 12402837.5 2 T [32, 30]
32 8 12402838.5 2 H [33, 29, 31]
33 8 145076125 2 T [32]
34 9 0 2 H [35]
35 9 39822667.0 2 T [34, 36, 37]
36 9 39822668.0 2 H [35, 37]
37 9 41293385.0 2 T [35, 36, 38]
38 9 41293386.0 2 H [37, 39]
39 9 61850024.0 2 T [40, 46, 38]
40 9 61850025.0 2 H [41, 39]
41 9 62801168.0 2 T [40, 42]
42 9 62801169.0 2 H [48, 41, 43]
43 9 62935061.0 2 T [48, 42, 44]
44 9 62935062.0 2 H [43, 45]
45 9 65399230.0 2 T [44, 46]
46 9 65399231.0 2 H [39, 45, 47]
47 9 65657315.0 2 T [48, 46]
48 9 65657316.0 2 H [49, 42, 43, 47]
49 9 138334464 2 T [48]
50 10 18515 2 H [51]
51 10 39180378.0 2 T [50, 52]
52 10 39180379.0 1 H [51, 53]
53 10 39201729.0 1 T [52, 54]
54 10 39201730 2 H [53, 55]
55 10 45888983.0 2 T [56, 58, 54]
56 10 45888984.0 2 H [57, 55]
57 10 49960781.0 2 T [56, 58]
58 10 49960782.0 2 H [57, 59, 55]
59 10 133785265 2 T [58]
60 11 0 2 H [61]
61 11 135069565 2 T [60]
62 12 14569 2 H [63]
63 12 9476200.5 2 T [64, 62]
64 12 9476201.5 1 H [65, 63]
65 12 9580571.0 1 T [64, 66]
66 12 9580572 2 H [65, 67]
67 12 133263959 2 T [66]
68 13 0 2 H [69]
69 13 114352102 2 T [68]
70 14 0 2 H [71]
71 14 18898944.0 2 T [72, 70]
72 14 18898945.0 2 H [73, 74, 71]
73 14 19620470.0 2 T [72, 74]
74 14 19620471.0 2 H [72, 73, 75]
75 14 105159387.0 2 T [74, 11, 76]
76 14 105159388.0 2 H [75, 77]
77 14 106873282 2 T [76]
78 15 0 2 H [79]
79 15 20425822.0 2 T [80, 81, 78]
80 15 20425823.0 2 H [81, 79]
81 15 20994245.25 2 T [80, 82, 79]
82 15 20994246.25 2 H [81, 83]
83 15 23220838.0 2 T [82, 84, 85]
84 15 23220839.0 2 H [83, 85]
85 15 28424089.5 2 T [83, 84, 86]
86 15 28424090.5 2 H [85, 87]
87 15 30531668.0 2 T [88, 90, 86]
88 15 30531669.0 2 H [89, 87]
89 15 32595449.0 2 T [88, 90]
90 15 32595450.0 2 H [89, 91, 87]
91 15 101976509 2 T [90]
92 16 14135 2 H [93]
93 16 185279.0 2 T [92, 94]
94 16 185280.0 1 H [93, 95]
95 16 196388.5 1 T [96, 94]
96 16 196389.5 2 H [97, 95]
97 16 14806491.0 2 T [96, 98]
98 16 14806492.0 2 H [97, 99, 102]
99 16 14905245.0 2 T [104, 98, 100]
100 16 14905246.0 2 H [99, 101]
101 16 15322465.0 2 T [100, 102]
102 16 15322466.0 2 H [98, 101, 103]
103 16 18490832.0 2 T [104, 102]
104 16 18490833.0 2 H [105, 99, 103]
105 16 21557960.0 2 T [104, 106, 107]
106 16 21557961.0 2 H [105, 107]
107 16 22690602.0 2 T [105, 106, 108]
108 16 22690603.0 2 H [107, 109]
109 16 32264686.0 2 T [108, 109, 110]
110 16 32264687.0 3 H [109, 111]
111 16 32324883.0 3 T [112, 110]
112 16 32324884.0 3 H [113, 116, 111]
113 16 32964090.0 3 T [112, 114]
114 16 32964091 2 H [113, 115]
115 16 33499296.0 2 T [114, 116]
116 16 33499297.0 2 H [112, 115, 117]
117 16 90224750 2 T [116]
118 17 66654 2 H [119]
119 17 46284335.0 2 T [120, 118]
120 17 46284336.0 0 H [121, 119]
121 17 46702870.0 0 T [120, 122]
122 17 46702871 2 H [121, 123]
123 17 83246391 2 T [122]
124 18 0 2 H [125]
125 18 80256374 2 T [124]
126 19 0 2 H [127]
127 19 58605715 2 T [126]
128 20 0 2 H [129]
129 20 29123897.0 2 T [128, 130, 133]
130 20 29123898.0 2 H [129, 131]
131 20 29682542.0 2 T [130, 132]
132 20 29682543.0 2 H [136, 131, 133]
133 20 29884548.0 2 T [129, 132, 134]
134 20 29884549.0 2 H [133, 135]
135 20 30173892.0 2 T [136, 134]
136 20 30173893.0 2 H [137, 132, 135]
137 20 64333718 2 T [136]
138 21 5010515 2 H [139]
139 21 5703412.0 2 T [152, 138, 140]
140 21 5703413.0 2 H [139, 141]
141 21 6215576.0 2 T [140, 142]
142 21 6215577.0 2 H [141, 150, 143]
143 21 6365040.75 2 T [144, 154, 142]
144 21 6365041.75 2 H [145, 143]
145 21 7129982.0 2 T [144, 146]
146 21 7129983.0 1 H [145, 147]
147 21 7137617.0 1 T [146, 148]
148 21 7137618 2 H [147, 149]
149 21 8100606.0 2 T [148, 150]
150 21 8100607.0 2 H [149, 142, 151]
151 21 8192569.0 2 T [152, 150]
152 21 8192570.0 2 H [153, 139, 151]
153 21 8825989.0 2 T [152, 154]
154 21 8825990.0 2 H [153, 155, 143]
155 21 46697229 2 T [154]
156 22 10514804 2 H [157]
157 22 11370078.5 2 T [156, 158, 159]
158 22 11370079.5 2 H [157, 159]
159 22 12641252.0 2 T [160, 157, 158]
160 22 12641253.0 2 H [161, 159]
161 22 18181891.5 2 T [160, 169, 162]
162 22 18181892.5 2 H [161, 163]
163 22 18189402.0 2 T [162, 164, 165]
164 22 18189403.0 1 H [163, 165]
165 22 18876658.0 1 T [163, 164, 166]
166 22 18876659 2 H [170, 165, 167]
167 22 18921116.0 2 T [168, 166]
168 22 18921117.0 2 H [169, 170, 167]
169 22 21167061.75 2 T [168, 161, 170]
170 22 21167062.75 2 H [168, 169, 171, 166]
171 22 50805586 2 T [170]
172 23 0 1 H [173]
173 23 156025612 1 T [172]
174 24 11555 1 H [175]
175 24 20054894.0 1 T [176, 174]
176 24 20054895.0 0 H [177, 175]
177 24 20372129.0 0 T [176, 178]
178 24 20372130 1 H [177, 179]
179 24 57212131 1 T [178]
[(0, 1, 2, 'S'), (2, 3, 2, 'S'), (3, 4, 0, 'R'), (4, 5, 2, 'S'), (5, 6, 0, 'R'), (6, 7, 2, 'S'), (7, 8, 0, 'R'), (8, 9, 3, 'S'), (9, 10, 0, 'R'), (11, 10, 2, 'S'), (11, 12, 0, 'R'), (12, 13, 2, 'S'), (14, 15, 2, 'S'), (16, 17, 2, 'S'), (18, 19, 2, 'S'), (19, 20, 0, 'R'), (20, 21, 1, 'S'), (21, 22, 0, 'R'), (22, 23, 2, 'S'), (24, 25, 2, 'S'), (26, 27, 2, 'S'), (29, 28, 2, 'S'), (29, 30, 0, 'R'), (31, 30, 2, 'S'), (31, 32, 0, 'R'), (32, 33, 2, 'S'), (35, 34, 2, 'S'), (35, 36, 0, 'R'), (37, 36, 2, 'S'), (37, 38, 0, 'R'), (39, 38, 2, 'S'), (39, 40, 0, 'R'), (41, 40, 2, 'S'), (41, 42, 0, 'R'), (43, 42, 2, 'S'), (43, 44, 0, 'R'), (45, 44, 2, 'S'), (45, 46, 0, 'R'), (47, 46, 2, 'S'), (47, 48, 0, 'R'), (48, 49, 2, 'S'), (50, 51, 2, 'S'), (51, 52, 0, 'R'), (52, 53, 1, 'S'), (53, 54, 0, 'R'), (55, 54, 2, 'S'), (55, 56, 0, 'R'), (57, 56, 2, 'S'), (57, 58, 0, 'R'), (58, 59, 2, 'S'), (60, 61, 2, 'S'), (62, 63, 2, 'S'), (63, 64, 0, 'R'), (64, 65, 1, 'S'), (65, 66, 0, 'R'), (66, 67, 2, 'S'), (68, 69, 2, 'S'), (71, 70, 2, 'S'), (71, 72, 0, 'R'), (73, 72, 2, 'S'), (73, 74, 0, 'R'), (75, 74, 2, 'S'), (75, 76, 0, 'R'), (76, 77, 2, 'S'), (79, 78, 2, 'S'), (79, 80, 0, 'R'), (81, 80, 2, 'S'), (81, 82, 0, 'R'), (83, 82, 2, 'S'), (83, 84, 0, 'R'), (85, 84, 2, 'S'), (85, 86, 0, 'R'), (87, 86, 2, 'S'), (87, 88, 0, 'R'), (89, 88, 2, 'S'), (89, 90, 0, 'R'), (90, 91, 2, 'S'), (92, 93, 2, 'S'), (93, 94, 0, 'R'), (94, 95, 1, 'S'), (95, 96, 0, 'R'), (97, 96, 2, 'S'), (97, 98, 0, 'R'), (99, 98, 2, 'S'), (99, 100, 0, 'R'), (101, 100, 2, 'S'), (101, 102, 0, 'R'), (103, 102, 2, 'S'), (103, 104, 0, 'R'), (105, 104, 2, 'S'), (105, 106, 0, 'R'), (107, 106, 2, 'S'), (107, 108, 0, 'R'), (108, 109, 2, 'S'), (109, 110, 0, 'R'), (111, 110, 3, 'S'), (111, 112, 0, 'R'), (112, 113, 3, 'S'), (113, 114, 0, 'R'), (115, 114, 2, 'S'), (115, 116, 0, 'R'), (116, 117, 2, 'S'), (118, 119, 2, 'S'), (119, 120, 0, 'R'), (120, 121, 0, 'S'), (121, 122, 0, 'R'), (122, 123, 2, 'S'), (124, 125, 2, 'S'), (126, 127, 2, 'S'), (129, 128, 2, 'S'), (129, 130, 0, 'R'), (131, 130, 2, 'S'), (131, 132, 0, 'R'), (133, 132, 2, 'S'), (133, 134, 0, 'R'), (135, 134, 2, 'S'), (135, 136, 0, 'R'), (136, 137, 2, 'S'), (139, 138, 2, 'S'), (139, 140, 0, 'R'), (141, 140, 2, 'S'), (141, 142, 0, 'R'), (143, 142, 2, 'S'), (143, 144, 0, 'R'), (144, 145, 2, 'S'), (145, 146, 0, 'R'), (146, 147, 1, 'S'), (147, 148, 0, 'R'), (149, 148, 2, 'S'), (149, 150, 0, 'R'), (151, 150, 2, 'S'), (151, 152, 0, 'R'), (153, 152, 2, 'S'), (153, 154, 0, 'R'), (154, 155, 2, 'S'), (157, 156, 2, 'S'), (157, 158, 0, 'R'), (159, 158, 2, 'S'), (159, 160, 0, 'R'), (161, 160, 2, 'S'), (161, 162, 0, 'R'), (162, 163, 2, 'S'), (163, 164, 0, 'R'), (164, 165, 1, 'S'), (165, 166, 0, 'R'), (167, 166, 2, 'S'), (167, 168, 0, 'R'), (169, 168, 2, 'S'), (169, 170, 0, 'R'), (170, 171, 2, 'S'), (172, 173, 1, 'S'), (174, 175, 1, 'S'), (175, 176, 0, 'R'), (176, 177, 0, 'S'), (177, 178, 0, 'R'), (178, 179, 1, 'S'), (11, 75, 0, 'SV'), (29, 32, 0, 'SV'), (35, 37, 0, 'SV'), (39, 46, 0, 'SV'), (42, 48, 0, 'SV'), (43, 48, 0, 'SV'), (55, 58, 0, 'SV'), (72, 74, 0, 'SV'), (79, 81, 0, 'SV'), (83, 85, 0, 'SV'), (87, 90, 0, 'SV'), (98, 102, 0, 'SV'), (99, 104, 0, 'SV'), (105, 107, 0, 'SV'), (109, 109, 0, 'SV'), (112, 116, 0, 'SV'), (129, 133, 0, 'SV'), (132, 136, 0, 'SV'), (139, 152, 0, 'SV'), (142, 150, 0, 'SV'), (143, 154, 0, 'SV'), (157, 159, 0, 'SV'), (161, 169, 0, 'SV'), (163, 165, 0, 'SV'), (166, 170, 0, 'SV'), (168, 170, 0, 'SV')]
Y0 (0, 1, 2, 'S')
A0 A0
B0 B0
A1 A1
B1 B1
obj -2*Y0 + 4
Sv_sum 0
CN_tune 306*Z0
obj B0 + B1 - 20*Y0 + 3366*Z0 + 40
Problem:
MINIMIZE
1*B0 + 1*B1 + -20*Y0 + 3366*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A0 - B0 - Y0 = -2

_C5: - 2 A1 - B1 - Y0 = -2

VARIABLES
0 <= A0 Integer
0 <= A1 Integer
0 <= B0 <= 1 Integer
0 <= B1 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A0, A1, B0, B1, Y0, Z0]
A0 = 1.0
A1 = 1.0
B0 = 0.0
B1 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (2, 3, 2, 'S')
X1 (3, 4, 0, 'R')
Y2 (4, 5, 2, 'S')
X3 (5, 6, 0, 'R')
Y4 (6, 7, 2, 'S')
X5 (7, 8, 0, 'R')
Y6 (8, 9, 3, 'S')
X7 (9, 10, 0, 'R')
Y8 (11, 10, 2, 'S')
X9 (11, 75, 0, 'SV')
X10 (11, 12, 0, 'R')
Y11 (75, 74, 2, 'S')
X12 (75, 76, 0, 'R')
X13 (72, 74, 0, 'SV')
X14 (73, 74, 0, 'R')
Y15 (73, 72, 2, 'S')
X16 (71, 72, 0, 'R')
Y17 (71, 70, 2, 'S')
Y18 (76, 77, 2, 'S')
Y19 (12, 13, 2, 'S')
A2 A2
B2 B2
A3 A3
B3 B3
A4 A4
B4 B4
A5 A5
B5 B5
A6 A6
B6 B6
A7 A7
B7 B7
A8 A8
B8 B8
A9 A9
B9 B9
A10 A10
B10 B10
A11 A11
B11 B11
A75 A75
B75 B75
A74 A74
B74 B74
A72 A72
B72 B72
A73 A73
B73 B73
A71 A71
B71 B71
A70 A70
B70 B70
A76 A76
B76 B76
A77 A77
B77 B77
A12 A12
B12 B12
A13 A13
B13 B13
obj -2*X1 - 2*X10 - 2*X12 - 2*X13 - 2*X14 - 2*X16 - 2*X3 - 2*X5 - 2*X7 - 2*X9 - 2*Y0 - 2*Y11 - 2*Y15 - 2*Y17 - 2*Y18 - 2*Y19 - 2*Y2 - 2*Y4 - 2*Y6 - 2*Y8 + 42
Sv_sum T13 + 8*T9
CN_tune 80*Z0 + 38*Z11 + 4*Z15 + 20*Z17 + 8*Z18 + 24*Z19 + 4*Z2 + 38*Z4 + 60*Z6 + 4*Z8
obj B10 + B11 + B12 + B13 + B2 + B3 + B4 + B5 + B6 + B7 + B70 + B71 + B72 + B73 + B74 + B75 + B76 + B77 + B8 + B9 - 10*T13 - 80*T9 - 20*X1 - 20*X10 - 20*X12 - 20*X13 - 20*X14 - 20*X16 - 20*X3 - 20*X5 - 20*X7 - 20*X9 - 20*Y0 - 20*Y11 - 20*Y15 - 20*Y17 - 20*Y18 - 20*Y19 - 20*Y2 - 20*Y4 - 20*Y6 - 20*Y8 + 880*Z0 + 418*Z11 + 44*Z15 + 220*Z17 + 88*Z18 + 264*Z19 + 44*Z2 + 418*Z4 + 660*Z6 + 44*Z8 + 420
Problem:
MINIMIZE
1*B10 + 1*B11 + 1*B12 + 1*B13 + 1*B2 + 1*B3 + 1*B4 + 1*B5 + 1*B6 + 1*B7 + 1*B70 + 1*B71 + 1*B72 + 1*B73 + 1*B74 + 1*B75 + 1*B76 + 1*B77 + 1*B8 + 1*B9 + -10*T13 + -80*T9 + -20*X1 + -20*X10 + -20*X12 + -20*X13 + -20*X14 + -20*X16 + -20*X3 + -20*X5 + -20*X7 + -20*X9 + -20*Y0 + -20*Y11 + -20*Y15 + -20*Y17 + -20*Y18 + -20*Y19 + -20*Y2 + -20*Y4 + -20*Y6 + -20*Y8 + 880*Z0 + 418*Z11 + 44*Z15 + 220*Z17 + 88*Z18 + 264*Z19 + 44*Z2 + 418*Z4 + 660*Z6 + 44*Z8 + 420
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: Y2 + Z2 >= 0

_C6: - Y2 + Z2 >= 0

_C7: Z2 <= 1

_C8: X3 >= 1

_C9: Y4 + Z4 >= 0

_C10: - Y4 + Z4 >= 0

_C11: Z4 <= 1

_C12: X5 >= 1

_C13: Y6 + Z6 >= 0

_C14: - Y6 + Z6 >= 0

_C15: Z6 <= 1

_C16: X7 >= 1

_C17: Y8 + Z8 >= 0

_C18: - Y8 + Z8 >= 0

_C19: Z8 <= 1

_C20: - 10 T9 + X9 <= 0

_C21: - T9 + X9 >= 0

_C22: X9 >= 0

_C23: X10 >= 1

_C24: Y11 + Z11 >= 0

_C25: - Y11 + Z11 >= 0

_C26: Z11 <= 1

_C27: X12 >= 1

_C28: - 10 T13 + X13 <= 0

_C29: - T13 + X13 >= 0

_C30: X13 >= 0

_C31: X14 >= 1

_C32: Y15 + Z15 >= 0

_C33: - Y15 + Z15 >= 0

_C34: Z15 <= 1

_C35: X16 >= 1

_C36: Y17 + Z17 >= 0

_C37: - Y17 + Z17 >= 0

_C38: Z17 <= 1

_C39: Y18 + Z18 >= 0

_C40: - Y18 + Z18 >= 0

_C41: Z18 <= 1

_C42: Y19 + Z19 >= 0

_C43: - Y19 + Z19 >= 0

_C44: Z19 <= 1

_C45: - 2 A2 - B2 - Y0 = -2

_C46: X1 + Y0 <= 2

_C47: - 2 A3 - B3 + X1 + Y0 = -2

_C48: X1 + Y2 <= 2

_C49: - 2 A4 - B4 + X1 + Y2 = -2

_C50: X3 + Y2 <= 2

_C51: - 2 A5 - B5 + X3 + Y2 = -2

_C52: X3 + Y4 <= 2

_C53: - 2 A6 - B6 + X3 + Y4 = -2

_C54: X5 + Y4 <= 2

_C55: - 2 A7 - B7 + X5 + Y4 = -2

_C56: X5 + Y6 <= 3

_C57: - 2 A8 - B8 + X5 + Y6 = -3

_C58: X7 + Y6 <= 3

_C59: - 2 A9 - B9 + X7 + Y6 = -3

_C60: X7 + Y8 <= 2

_C61: - 2 A10 - B10 + X7 + Y8 = -2

_C62: X10 + X9 + Y8 <= 2

_C63: - 2 A11 - B11 + X10 + X9 + Y8 = -2

_C64: X12 + X9 + Y11 <= 2

_C65: - 2 A75 - B75 + X12 + X9 + Y11 = -2

_C66: X13 + X14 + Y11 <= 2

_C67: - 2 A74 - B74 + X13 + X14 + Y11 = -2

_C68: X13 + X16 + Y15 <= 2

_C69: - 2 A72 - B72 + X13 + X16 + Y15 = -2

_C70: X14 + Y15 <= 2

_C71: - 2 A73 - B73 + X14 + Y15 = -2

_C72: X16 + Y17 <= 2

_C73: - 2 A71 - B71 + X16 + Y17 = -2

_C74: - 2 A70 - B70 - Y17 = -2

_C75: X12 + Y18 <= 2

_C76: - 2 A76 - B76 + X12 + Y18 = -2

_C77: - 2 A77 - B77 - Y18 = -2

_C78: X10 + Y19 <= 2

_C79: - 2 A12 - B12 + X10 + Y19 = -2

_C80: - 2 A13 - B13 - Y19 = -2

VARIABLES
0 <= A10 Integer
0 <= A11 Integer
0 <= A12 Integer
0 <= A13 Integer
0 <= A2 Integer
0 <= A3 Integer
0 <= A4 Integer
0 <= A5 Integer
0 <= A6 Integer
0 <= A7 Integer
0 <= A70 Integer
0 <= A71 Integer
0 <= A72 Integer
0 <= A73 Integer
0 <= A74 Integer
0 <= A75 Integer
0 <= A76 Integer
0 <= A77 Integer
0 <= A8 Integer
0 <= A9 Integer
0 <= B10 <= 1 Integer
0 <= B11 <= 1 Integer
0 <= B12 <= 1 Integer
0 <= B13 <= 1 Integer
0 <= B2 <= 1 Integer
0 <= B3 <= 1 Integer
0 <= B4 <= 1 Integer
0 <= B5 <= 1 Integer
0 <= B6 <= 1 Integer
0 <= B7 <= 1 Integer
0 <= B70 <= 1 Integer
0 <= B71 <= 1 Integer
0 <= B72 <= 1 Integer
0 <= B73 <= 1 Integer
0 <= B74 <= 1 Integer
0 <= B75 <= 1 Integer
0 <= B76 <= 1 Integer
0 <= B77 <= 1 Integer
0 <= B8 <= 1 Integer
0 <= B9 <= 1 Integer
0 <= T13 <= 1 Integer
0 <= T9 <= 1 Integer
0 <= X1 Integer
0 <= X10 Integer
0 <= X12 Integer
0 <= X13 Integer
0 <= X14 Integer
0 <= X16 Integer
0 <= X3 Integer
0 <= X5 Integer
0 <= X7 Integer
0 <= X9 Integer
Y0 free Integer
Y11 free Integer
Y15 free Integer
Y17 free Integer
Y18 free Integer
Y19 free Integer
Y2 free Integer
Y4 free Integer
Y6 free Integer
Y8 free Integer
Z0 free Integer
Z11 free Integer
Z15 free Integer
Z17 free Integer
Z18 free Integer
Z19 free Integer
Z2 free Integer
Z4 free Integer
Z6 free Integer
Z8 free Integer

Optimal
[A10, A11, A12, A13, A2, A3, A4, A5, A6, A7, A70, A71, A72, A73, A74, A75, A76, A77, A8, A9, B10, B11, B12, B13, B2, B3, B4, B5, B6, B7, B70, B71, B72, B73, B74, B75, B76, B77, B8, B9, T13, T9, X1, X10, X12, X13, X14, X16, X3, X5, X7, X9, Y0, Y11, Y15, Y17, Y18, Y19, Y2, Y4, Y6, Y8, Z0, Z11, Z15, Z17, Z18, Z19, Z2, Z4, Z6, Z8]
3 4 2.0 R
11 12 1.0 R
75 76 1.0 R
72 74 0.0 SV
73 74 2.0 R
71 72 2.0 R
5 6 2.0 R
7 8 2.0 R
9 10 2.0 R
11 75 1.0 SV
A10 = 2.0
A11 = 2.0
A12 = 1.0
A13 = 1.0
A2 = 1.0
A3 = 2.0
A4 = 2.0
A5 = 2.0
A6 = 2.0
A7 = 2.0
A70 = 1.0
A71 = 2.0
A72 = 2.0
A73 = 2.0
A74 = 2.0
A75 = 2.0
A76 = 1.0
A77 = 1.0
A8 = 2.0
A9 = 2.0
B10 = 0.0
B11 = 0.0
B12 = 1.0
B13 = 0.0
B2 = 0.0
B3 = 0.0
B4 = 0.0
B5 = 0.0
B6 = 0.0
B7 = 0.0
B70 = 0.0
B71 = 0.0
B72 = 0.0
B73 = 0.0
B74 = 0.0
B75 = 0.0
B76 = 1.0
B77 = 0.0
B8 = 1.0
B9 = 1.0
T13 = 0.0
T9 = 1.0
X1 = 2.0
X10 = 1.0
X12 = 1.0
X13 = 0.0
X14 = 2.0
X16 = 2.0
X3 = 2.0
X5 = 2.0
X7 = 2.0
X9 = 1.0
Y0 = 0.0
Y11 = 0.0
Y15 = 0.0
Y17 = 0.0
Y18 = 0.0
Y19 = 0.0
Y2 = 0.0
Y4 = 0.0
Y6 = 0.0
Y8 = 0.0
Z0 = 0.0
Z11 = 0.0
Z15 = 0.0
Z17 = 0.0
Z18 = 0.0
Z19 = 0.0
Z2 = 0.0
Z4 = 0.0
Z6 = 0.0
Z8 = 0.0
44.0 Objective Answer
Y0 (14, 15, 2, 'S')
A14 A14
B14 B14
A15 A15
B15 B15
obj -2*Y0 + 4
Sv_sum 0
CN_tune 246*Z0
obj B14 + B15 - 20*Y0 + 2706*Z0 + 40
Problem:
MINIMIZE
1*B14 + 1*B15 + -20*Y0 + 2706*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A14 - B14 - Y0 = -2

_C5: - 2 A15 - B15 - Y0 = -2

VARIABLES
0 <= A14 Integer
0 <= A15 Integer
0 <= B14 <= 1 Integer
0 <= B15 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A14, A15, B14, B15, Y0, Z0]
A14 = 1.0
A15 = 1.0
B14 = 0.0
B15 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (16, 17, 2, 'S')
A16 A16
B16 B16
A17 A17
B17 B17
obj -2*Y0 + 4
Sv_sum 0
CN_tune 240*Z0
obj B16 + B17 - 20*Y0 + 2640*Z0 + 40
Problem:
MINIMIZE
1*B16 + 1*B17 + -20*Y0 + 2640*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A16 - B16 - Y0 = -2

_C5: - 2 A17 - B17 - Y0 = -2

VARIABLES
0 <= A16 Integer
0 <= A17 Integer
0 <= B16 <= 1 Integer
0 <= B17 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A16, A17, B16, B17, Y0, Z0]
A16 = 1.0
A17 = 1.0
B16 = 0.0
B17 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (18, 19, 2, 'S')
X1 (19, 20, 0, 'R')
Y2 (20, 21, 1, 'S')
X3 (21, 22, 0, 'R')
Y4 (22, 23, 2, 'S')
A18 A18
B18 B18
A19 A19
B19 B19
A20 A20
B20 B20
A21 A21
B21 B21
A22 A22
B22 B22
A23 A23
B23 B23
obj -2*X1 - 2*X3 - 2*Y0 - 2*Y2 - 2*Y4 + 10
Sv_sum 0
CN_tune 8*Z0 + 152*Z4
obj B18 + B19 + B20 + B21 + B22 + B23 - 20*X1 - 20*X3 - 20*Y0 - 20*Y2 - 20*Y4 + 88*Z0 + 1672*Z4 + 100
Problem:
MINIMIZE
1*B18 + 1*B19 + 1*B20 + 1*B21 + 1*B22 + 1*B23 + -20*X1 + -20*X3 + -20*Y0 + -20*Y2 + -20*Y4 + 88*Z0 + 1672*Z4 + 100
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: Y2 + Z2 >= 0

_C6: - Y2 + Z2 >= 0

_C7: Z2 <= 1

_C8: X3 >= 1

_C9: Y4 + Z4 >= 0

_C10: - Y4 + Z4 >= 0

_C11: Z4 <= 1

_C12: - 2 A18 - B18 - Y0 = -2

_C13: X1 + Y0 <= 2

_C14: - 2 A19 - B19 + X1 + Y0 = -2

_C15: X1 + Y2 <= 1

_C16: - 2 A20 - B20 + X1 + Y2 = -1

_C17: X3 + Y2 <= 1

_C18: - 2 A21 - B21 + X3 + Y2 = -1

_C19: X3 + Y4 <= 2

_C20: - 2 A22 - B22 + X3 + Y4 = -2

_C21: - 2 A23 - B23 - Y4 = -2

VARIABLES
0 <= A18 Integer
0 <= A19 Integer
0 <= A20 Integer
0 <= A21 Integer
0 <= A22 Integer
0 <= A23 Integer
0 <= B18 <= 1 Integer
0 <= B19 <= 1 Integer
0 <= B20 <= 1 Integer
0 <= B21 <= 1 Integer
0 <= B22 <= 1 Integer
0 <= B23 <= 1 Integer
0 <= X1 Integer
0 <= X3 Integer
Y0 free Integer
Y2 free Integer
Y4 free Integer
Z0 free Integer
Z2 free Integer
Z4 free Integer

Optimal
[A18, A19, A20, A21, A22, A23, B18, B19, B20, B21, B22, B23, X1, X3, Y0, Y2, Y4, Z0, Z2, Z4]
19 20 2.0 R
21 22 2.0 R
A18 = 1.0
A19 = 2.0
A20 = 1.0
A21 = 1.0
A22 = 2.0
A23 = 1.0
B18 = 0.0
B19 = 0.0
B20 = 0.0
B21 = 0.0
B22 = 0.0
B23 = 0.0
X1 = 2.0
X3 = 2.0
Y0 = 0.0
Y2 = -1.0
Y4 = 0.0
Z0 = 0.0
Z2 = 1.0
Z4 = 0.0
40.0 Objective Answer
Y0 (24, 25, 2, 'S')
A24 A24
B24 B24
A25 A25
B25 B25
obj -2*Y0 + 4
Sv_sum 0
CN_tune 216*Z0
obj B24 + B25 - 20*Y0 + 2376*Z0 + 40
Problem:
MINIMIZE
1*B24 + 1*B25 + -20*Y0 + 2376*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A24 - B24 - Y0 = -2

_C5: - 2 A25 - B25 - Y0 = -2

VARIABLES
0 <= A24 Integer
0 <= A25 Integer
0 <= B24 <= 1 Integer
0 <= B25 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A24, A25, B24, B25, Y0, Z0]
A24 = 1.0
A25 = 1.0
B24 = 0.0
B25 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (26, 27, 2, 'S')
A26 A26
B26 B26
A27 A27
B27 B27
obj -2*Y0 + 4
Sv_sum 0
CN_tune 198*Z0
obj B26 + B27 - 20*Y0 + 2178*Z0 + 40
Problem:
MINIMIZE
1*B26 + 1*B27 + -20*Y0 + 2178*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A26 - B26 - Y0 = -2

_C5: - 2 A27 - B27 - Y0 = -2

VARIABLES
0 <= A26 Integer
0 <= A27 Integer
0 <= B26 <= 1 Integer
0 <= B27 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A26, A27, B26, B27, Y0, Z0]
A26 = 1.0
A27 = 1.0
B26 = 0.0
B27 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (29, 28, 2, 'S')
X1 (29, 32, 0, 'SV')
X2 (29, 30, 0, 'R')
Y3 (32, 33, 2, 'S')
X4 (31, 32, 0, 'R')
Y5 (31, 30, 2, 'S')
A28 A28
B28 B28
A29 A29
B29 B29
A32 A32
B32 B32
A33 A33
B33 B33
A31 A31
B31 B31
A30 A30
B30 B30
obj -2*X1 - 2*X2 - 2*X4 - 2*Y0 - 2*Y3 - 2*Y5 + 12
Sv_sum T1
CN_tune 12*Z0 + 112*Z3 + 4*Z5
obj B28 + B29 + B30 + B31 + B32 + B33 - 10*T1 - 20*X1 - 20*X2 - 20*X4 - 20*Y0 - 20*Y3 - 20*Y5 + 132*Z0 + 1232*Z3 + 44*Z5 + 120
Problem:
MINIMIZE
1*B28 + 1*B29 + 1*B30 + 1*B31 + 1*B32 + 1*B33 + -10*T1 + -20*X1 + -20*X2 + -20*X4 + -20*Y0 + -20*Y3 + -20*Y5 + 132*Z0 + 1232*Z3 + 44*Z5 + 120
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 10 T1 + X1 <= 0

_C5: - T1 + X1 >= 0

_C6: X1 >= 0

_C7: X2 >= 1

_C8: Y3 + Z3 >= 0

_C9: - Y3 + Z3 >= 0

_C10: Z3 <= 1

_C11: X4 >= 1

_C12: Y5 + Z5 >= 0

_C13: - Y5 + Z5 >= 0

_C14: Z5 <= 1

_C15: - 2 A28 - B28 - Y0 = -2

_C16: X1 + X2 + Y0 <= 2

_C17: - 2 A29 - B29 + X1 + X2 + Y0 = -2

_C18: X1 + X4 + Y3 <= 2

_C19: - 2 A32 - B32 + X1 + X4 + Y3 = -2

_C20: - 2 A33 - B33 - Y3 = -2

_C21: X4 + Y5 <= 2

_C22: - 2 A31 - B31 + X4 + Y5 = -2

_C23: X2 + Y5 <= 2

_C24: - 2 A30 - B30 + X2 + Y5 = -2

VARIABLES
0 <= A28 Integer
0 <= A29 Integer
0 <= A30 Integer
0 <= A31 Integer
0 <= A32 Integer
0 <= A33 Integer
0 <= B28 <= 1 Integer
0 <= B29 <= 1 Integer
0 <= B30 <= 1 Integer
0 <= B31 <= 1 Integer
0 <= B32 <= 1 Integer
0 <= B33 <= 1 Integer
0 <= T1 <= 1 Integer
0 <= X1 Integer
0 <= X2 Integer
0 <= X4 Integer
Y0 free Integer
Y3 free Integer
Y5 free Integer
Z0 free Integer
Z3 free Integer
Z5 free Integer

Optimal
[A28, A29, A30, A31, A32, A33, B28, B29, B30, B31, B32, B33, T1, X1, X2, X4, Y0, Y3, Y5, Z0, Z3, Z5]
29 32 0.0 SV
29 30 2.0 R
31 32 2.0 R
A28 = 1.0
A29 = 2.0
A30 = 2.0
A31 = 2.0
A32 = 2.0
A33 = 1.0
B28 = 0.0
B29 = 0.0
B30 = 0.0
B31 = 0.0
B32 = 0.0
B33 = 0.0
T1 = 0.0
X1 = 0.0
X2 = 2.0
X4 = 2.0
Y0 = 0.0
Y3 = 0.0
Y5 = 0.0
Z0 = 0.0
Z3 = 0.0
Z5 = 0.0
40.0 Objective Answer
Y0 (35, 34, 2, 'S')
X1 (35, 36, 0, 'R')
X2 (35, 37, 0, 'SV')
Y3 (37, 36, 2, 'S')
X4 (37, 38, 0, 'R')
Y5 (39, 38, 2, 'S')
X6 (39, 40, 0, 'R')
X7 (39, 46, 0, 'SV')
Y8 (41, 40, 2, 'S')
X9 (41, 42, 0, 'R')
X10 (42, 48, 0, 'SV')
Y11 (43, 42, 2, 'S')
Y12 (48, 49, 2, 'S')
X13 (43, 48, 0, 'SV')
X14 (47, 48, 0, 'R')
X15 (43, 44, 0, 'R')
Y16 (45, 44, 2, 'S')
X17 (45, 46, 0, 'R')
Y18 (47, 46, 2, 'S')
A34 A34
B34 B34
A35 A35
B35 B35
A36 A36
B36 B36
A37 A37
B37 B37
A38 A38
B38 B38
A39 A39
B39 B39
A40 A40
B40 B40
A41 A41
B41 B41
A42 A42
B42 B42
A48 A48
B48 B48
A49 A49
B49 B49
A43 A43
B43 B43
A44 A44
B44 B44
A45 A45
B45 B45
A46 A46
B46 B46
A47 A47
B47 B47
obj -2*X1 - 2*X10 - 2*X13 - 2*X14 - 2*X15 - 2*X17 - 2*X2 - 2*X4 - 2*X6 - 2*X7 - 2*X9 - 2*Y0 - 2*Y11 - 2*Y12 - 2*Y16 - 2*Y18 - 2*Y3 - 2*Y5 - 2*Y8 + 32
Sv_sum T10 + T13 + T2 + T7
CN_tune 36*Z0 + 4*Z11 + 64*Z12 + 4*Z16 + 4*Z18 + 4*Z3 + 12*Z5 + 4*Z8
obj B34 + B35 + B36 + B37 + B38 + B39 + B40 + B41 + B42 + B43 + B44 + B45 + B46 + B47 + B48 + B49 - 10*T10 - 10*T13 - 10*T2 - 10*T7 - 20*X1 - 20*X10 - 20*X13 - 20*X14 - 20*X15 - 20*X17 - 20*X2 - 20*X4 - 20*X6 - 20*X7 - 20*X9 - 20*Y0 - 20*Y11 - 20*Y12 - 20*Y16 - 20*Y18 - 20*Y3 - 20*Y5 - 20*Y8 + 396*Z0 + 44*Z11 + 704*Z12 + 44*Z16 + 44*Z18 + 44*Z3 + 132*Z5 + 44*Z8 + 320
Problem:
MINIMIZE
1*B34 + 1*B35 + 1*B36 + 1*B37 + 1*B38 + 1*B39 + 1*B40 + 1*B41 + 1*B42 + 1*B43 + 1*B44 + 1*B45 + 1*B46 + 1*B47 + 1*B48 + 1*B49 + -10*T10 + -10*T13 + -10*T2 + -10*T7 + -20*X1 + -20*X10 + -20*X13 + -20*X14 + -20*X15 + -20*X17 + -20*X2 + -20*X4 + -20*X6 + -20*X7 + -20*X9 + -20*Y0 + -20*Y11 + -20*Y12 + -20*Y16 + -20*Y18 + -20*Y3 + -20*Y5 + -20*Y8 + 396*Z0 + 44*Z11 + 704*Z12 + 44*Z16 + 44*Z18 + 44*Z3 + 132*Z5 + 44*Z8 + 320
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: - 10 T2 + X2 <= 0

_C6: - T2 + X2 >= 0

_C7: X2 >= 0

_C8: Y3 + Z3 >= 0

_C9: - Y3 + Z3 >= 0

_C10: Z3 <= 1

_C11: X4 >= 1

_C12: Y5 + Z5 >= 0

_C13: - Y5 + Z5 >= 0

_C14: Z5 <= 1

_C15: X6 >= 1

_C16: - 10 T7 + X7 <= 0

_C17: - T7 + X7 >= 0

_C18: X7 >= 0

_C19: Y8 + Z8 >= 0

_C20: - Y8 + Z8 >= 0

_C21: Z8 <= 1

_C22: X9 >= 1

_C23: - 10 T10 + X10 <= 0

_C24: - T10 + X10 >= 0

_C25: X10 >= 0

_C26: Y11 + Z11 >= 0

_C27: - Y11 + Z11 >= 0

_C28: Z11 <= 1

_C29: Y12 + Z12 >= 0

_C30: - Y12 + Z12 >= 0

_C31: Z12 <= 1

_C32: - 10 T13 + X13 <= 0

_C33: - T13 + X13 >= 0

_C34: X13 >= 0

_C35: X14 >= 1

_C36: X15 >= 1

_C37: Y16 + Z16 >= 0

_C38: - Y16 + Z16 >= 0

_C39: Z16 <= 1

_C40: X17 >= 1

_C41: Y18 + Z18 >= 0

_C42: - Y18 + Z18 >= 0

_C43: Z18 <= 1

_C44: - 2 A34 - B34 - Y0 = -2

_C45: X1 + X2 + Y0 <= 2

_C46: - 2 A35 - B35 + X1 + X2 + Y0 = -2

_C47: X1 + Y3 <= 2

_C48: - 2 A36 - B36 + X1 + Y3 = -2

_C49: X2 + X4 + Y3 <= 2

_C50: - 2 A37 - B37 + X2 + X4 + Y3 = -2

_C51: X4 + Y5 <= 2

_C52: - 2 A38 - B38 + X4 + Y5 = -2

_C53: X6 + X7 + Y5 <= 2

_C54: - 2 A39 - B39 + X6 + X7 + Y5 = -2

_C55: X6 + Y8 <= 2

_C56: - 2 A40 - B40 + X6 + Y8 = -2

_C57: X9 + Y8 <= 2

_C58: - 2 A41 - B41 + X9 + Y8 = -2

_C59: X10 + X9 + Y11 <= 2

_C60: - 2 A42 - B42 + X10 + X9 + Y11 = -2

_C61: X10 + X13 + X14 + Y12 <= 2

_C62: - 2 A48 - B48 + X10 + X13 + X14 + Y12 = -2

_C63: - 2 A49 - B49 - Y12 = -2

_C64: X13 + X15 + Y11 <= 2

_C65: - 2 A43 - B43 + X13 + X15 + Y11 = -2

_C66: X15 + Y16 <= 2

_C67: - 2 A44 - B44 + X15 + Y16 = -2

_C68: X17 + Y16 <= 2

_C69: - 2 A45 - B45 + X17 + Y16 = -2

_C70: X17 + X7 + Y18 <= 2

_C71: - 2 A46 - B46 + X17 + X7 + Y18 = -2

_C72: X14 + Y18 <= 2

_C73: - 2 A47 - B47 + X14 + Y18 = -2

VARIABLES
0 <= A34 Integer
0 <= A35 Integer
0 <= A36 Integer
0 <= A37 Integer
0 <= A38 Integer
0 <= A39 Integer
0 <= A40 Integer
0 <= A41 Integer
0 <= A42 Integer
0 <= A43 Integer
0 <= A44 Integer
0 <= A45 Integer
0 <= A46 Integer
0 <= A47 Integer
0 <= A48 Integer
0 <= A49 Integer
0 <= B34 <= 1 Integer
0 <= B35 <= 1 Integer
0 <= B36 <= 1 Integer
0 <= B37 <= 1 Integer
0 <= B38 <= 1 Integer
0 <= B39 <= 1 Integer
0 <= B40 <= 1 Integer
0 <= B41 <= 1 Integer
0 <= B42 <= 1 Integer
0 <= B43 <= 1 Integer
0 <= B44 <= 1 Integer
0 <= B45 <= 1 Integer
0 <= B46 <= 1 Integer
0 <= B47 <= 1 Integer
0 <= B48 <= 1 Integer
0 <= B49 <= 1 Integer
0 <= T10 <= 1 Integer
0 <= T13 <= 1 Integer
0 <= T2 <= 1 Integer
0 <= T7 <= 1 Integer
0 <= X1 Integer
0 <= X10 Integer
0 <= X13 Integer
0 <= X14 Integer
0 <= X15 Integer
0 <= X17 Integer
0 <= X2 Integer
0 <= X4 Integer
0 <= X6 Integer
0 <= X7 Integer
0 <= X9 Integer
Y0 free Integer
Y11 free Integer
Y12 free Integer
Y16 free Integer
Y18 free Integer
Y3 free Integer
Y5 free Integer
Y8 free Integer
Z0 free Integer
Z11 free Integer
Z12 free Integer
Z16 free Integer
Z18 free Integer
Z3 free Integer
Z5 free Integer
Z8 free Integer

Optimal
[A34, A35, A36, A37, A38, A39, A40, A41, A42, A43, A44, A45, A46, A47, A48, A49, B34, B35, B36, B37, B38, B39, B40, B41, B42, B43, B44, B45, B46, B47, B48, B49, T10, T13, T2, T7, X1, X10, X13, X14, X15, X17, X2, X4, X6, X7, X9, Y0, Y11, Y12, Y16, Y18, Y3, Y5, Y8, Z0, Z11, Z12, Z16, Z18, Z3, Z5, Z8]
35 36 2.0 R
42 48 0.0 SV
43 48 0.0 SV
47 48 2.0 R
43 44 2.0 R
45 46 2.0 R
35 37 0.0 SV
37 38 2.0 R
39 40 2.0 R
39 46 0.0 SV
41 42 2.0 R
A34 = 1.0
A35 = 2.0
A36 = 2.0
A37 = 2.0
A38 = 2.0
A39 = 2.0
A40 = 2.0
A41 = 2.0
A42 = 2.0
A43 = 2.0
A44 = 2.0
A45 = 2.0
A46 = 2.0
A47 = 2.0
A48 = 2.0
A49 = 1.0
B34 = 0.0
B35 = 0.0
B36 = 0.0
B37 = 0.0
B38 = 0.0
B39 = 0.0
B40 = 0.0
B41 = 0.0
B42 = 0.0
B43 = 0.0
B44 = 0.0
B45 = 0.0
B46 = 0.0
B47 = 0.0
B48 = 0.0
B49 = 0.0
T10 = 0.0
T13 = 0.0
T2 = 0.0
T7 = 0.0
X1 = 2.0
X10 = 0.0
X13 = 0.0
X14 = 2.0
X15 = 2.0
X17 = 2.0
X2 = 0.0
X4 = 2.0
X6 = 2.0
X7 = 0.0
X9 = 2.0
Y0 = 0.0
Y11 = 0.0
Y12 = 0.0
Y16 = 0.0
Y18 = 0.0
Y3 = 0.0
Y5 = 0.0
Y8 = 0.0
Z0 = 0.0
Z11 = 0.0
Z12 = 0.0
Z16 = 0.0
Z18 = 0.0
Z3 = 0.0
Z5 = 0.0
Z8 = 0.0
40.0 Objective Answer
Y0 (50, 51, 2, 'S')
X1 (51, 52, 0, 'R')
Y2 (52, 53, 1, 'S')
X3 (53, 54, 0, 'R')
Y4 (55, 54, 2, 'S')
X5 (55, 56, 0, 'R')
X6 (55, 58, 0, 'SV')
Y7 (57, 56, 2, 'S')
X8 (57, 58, 0, 'R')
Y9 (58, 59, 2, 'S')
A50 A50
B50 B50
A51 A51
B51 B51
A52 A52
B52 B52
A53 A53
B53 B53
A54 A54
B54 B54
A55 A55
B55 B55
A56 A56
B56 B56
A57 A57
B57 B57
A58 A58
B58 B58
A59 A59
B59 B59
obj -2*X1 - 2*X3 - 2*X5 - 2*X6 - 2*X8 - 2*Y0 - 2*Y2 - 2*Y4 - 2*Y7 - 2*Y9 + 18
Sv_sum T6
CN_tune 36*Z0 + 6*Z4 + 4*Z7 + 72*Z9
obj B50 + B51 + B52 + B53 + B54 + B55 + B56 + B57 + B58 + B59 - 10*T6 - 20*X1 - 20*X3 - 20*X5 - 20*X6 - 20*X8 - 20*Y0 - 20*Y2 - 20*Y4 - 20*Y7 - 20*Y9 + 396*Z0 + 66*Z4 + 44*Z7 + 792*Z9 + 180
Problem:
MINIMIZE
1*B50 + 1*B51 + 1*B52 + 1*B53 + 1*B54 + 1*B55 + 1*B56 + 1*B57 + 1*B58 + 1*B59 + -10*T6 + -20*X1 + -20*X3 + -20*X5 + -20*X6 + -20*X8 + -20*Y0 + -20*Y2 + -20*Y4 + -20*Y7 + -20*Y9 + 396*Z0 + 66*Z4 + 44*Z7 + 792*Z9 + 180
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: Y2 + Z2 >= 0

_C6: - Y2 + Z2 >= 0

_C7: Z2 <= 1

_C8: X3 >= 1

_C9: Y4 + Z4 >= 0

_C10: - Y4 + Z4 >= 0

_C11: Z4 <= 1

_C12: X5 >= 1

_C13: - 10 T6 + X6 <= 0

_C14: - T6 + X6 >= 0

_C15: X6 >= 0

_C16: Y7 + Z7 >= 0

_C17: - Y7 + Z7 >= 0

_C18: Z7 <= 1

_C19: X8 >= 1

_C20: Y9 + Z9 >= 0

_C21: - Y9 + Z9 >= 0

_C22: Z9 <= 1

_C23: - 2 A50 - B50 - Y0 = -2

_C24: X1 + Y0 <= 2

_C25: - 2 A51 - B51 + X1 + Y0 = -2

_C26: X1 + Y2 <= 1

_C27: - 2 A52 - B52 + X1 + Y2 = -1

_C28: X3 + Y2 <= 1

_C29: - 2 A53 - B53 + X3 + Y2 = -1

_C30: X3 + Y4 <= 2

_C31: - 2 A54 - B54 + X3 + Y4 = -2

_C32: X5 + X6 + Y4 <= 2

_C33: - 2 A55 - B55 + X5 + X6 + Y4 = -2

_C34: X5 + Y7 <= 2

_C35: - 2 A56 - B56 + X5 + Y7 = -2

_C36: X8 + Y7 <= 2

_C37: - 2 A57 - B57 + X8 + Y7 = -2

_C38: X6 + X8 + Y9 <= 2

_C39: - 2 A58 - B58 + X6 + X8 + Y9 = -2

_C40: - 2 A59 - B59 - Y9 = -2

VARIABLES
0 <= A50 Integer
0 <= A51 Integer
0 <= A52 Integer
0 <= A53 Integer
0 <= A54 Integer
0 <= A55 Integer
0 <= A56 Integer
0 <= A57 Integer
0 <= A58 Integer
0 <= A59 Integer
0 <= B50 <= 1 Integer
0 <= B51 <= 1 Integer
0 <= B52 <= 1 Integer
0 <= B53 <= 1 Integer
0 <= B54 <= 1 Integer
0 <= B55 <= 1 Integer
0 <= B56 <= 1 Integer
0 <= B57 <= 1 Integer
0 <= B58 <= 1 Integer
0 <= B59 <= 1 Integer
0 <= T6 <= 1 Integer
0 <= X1 Integer
0 <= X3 Integer
0 <= X5 Integer
0 <= X6 Integer
0 <= X8 Integer
Y0 free Integer
Y2 free Integer
Y4 free Integer
Y7 free Integer
Y9 free Integer
Z0 free Integer
Z2 free Integer
Z4 free Integer
Z7 free Integer
Z9 free Integer

Optimal
[A50, A51, A52, A53, A54, A55, A56, A57, A58, A59, B50, B51, B52, B53, B54, B55, B56, B57, B58, B59, T6, X1, X3, X5, X6, X8, Y0, Y2, Y4, Y7, Y9, Z0, Z2, Z4, Z7, Z9]
51 52 2.0 R
53 54 2.0 R
55 56 2.0 R
55 58 0.0 SV
57 58 2.0 R
A50 = 1.0
A51 = 2.0
A52 = 1.0
A53 = 1.0
A54 = 2.0
A55 = 2.0
A56 = 2.0
A57 = 2.0
A58 = 2.0
A59 = 1.0
B50 = 0.0
B51 = 0.0
B52 = 0.0
B53 = 0.0
B54 = 0.0
B55 = 0.0
B56 = 0.0
B57 = 0.0
B58 = 0.0
B59 = 0.0
T6 = 0.0
X1 = 2.0
X3 = 2.0
X5 = 2.0
X6 = 0.0
X8 = 2.0
Y0 = 0.0
Y2 = -1.0
Y4 = 0.0
Y7 = 0.0
Y9 = 0.0
Z0 = 0.0
Z2 = 1.0
Z4 = 0.0
Z7 = 0.0
Z9 = 0.0
40.0 Objective Answer
Y0 (60, 61, 2, 'S')
A60 A60
B60 B60
A61 A61
B61 B61
obj -2*Y0 + 4
Sv_sum 0
CN_tune 174*Z0
obj B60 + B61 - 20*Y0 + 1914*Z0 + 40
Problem:
MINIMIZE
1*B60 + 1*B61 + -20*Y0 + 1914*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A60 - B60 - Y0 = -2

_C5: - 2 A61 - B61 - Y0 = -2

VARIABLES
0 <= A60 Integer
0 <= A61 Integer
0 <= B60 <= 1 Integer
0 <= B61 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A60, A61, B60, B61, Y0, Z0]
A60 = 1.0
A61 = 1.0
B60 = 0.0
B61 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (62, 63, 2, 'S')
X1 (63, 64, 0, 'R')
Y2 (64, 65, 1, 'S')
X3 (65, 66, 0, 'R')
Y4 (66, 67, 2, 'S')
A62 A62
B62 B62
A63 A63
B63 B63
A64 A64
B64 B64
A65 A65
B65 B65
A66 A66
B66 B66
A67 A67
B67 B67
obj -2*X1 - 2*X3 - 2*Y0 - 2*Y2 - 2*Y4 + 10
Sv_sum 0
CN_tune 12*Z0 + 12*Z2 + 104*Z4
obj B62 + B63 + B64 + B65 + B66 + B67 - 20*X1 - 20*X3 - 20*Y0 - 20*Y2 - 20*Y4 + 132*Z0 + 132*Z2 + 1144*Z4 + 100
Problem:
MINIMIZE
1*B62 + 1*B63 + 1*B64 + 1*B65 + 1*B66 + 1*B67 + -20*X1 + -20*X3 + -20*Y0 + -20*Y2 + -20*Y4 + 132*Z0 + 132*Z2 + 1144*Z4 + 100
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: Y2 + Z2 >= 0

_C6: - Y2 + Z2 >= 0

_C7: Z2 <= 1

_C8: X3 >= 1

_C9: Y4 + Z4 >= 0

_C10: - Y4 + Z4 >= 0

_C11: Z4 <= 1

_C12: - 2 A62 - B62 - Y0 = -2

_C13: X1 + Y0 <= 2

_C14: - 2 A63 - B63 + X1 + Y0 = -2

_C15: X1 + Y2 <= 1

_C16: - 2 A64 - B64 + X1 + Y2 = -1

_C17: X3 + Y2 <= 1

_C18: - 2 A65 - B65 + X3 + Y2 = -1

_C19: X3 + Y4 <= 2

_C20: - 2 A66 - B66 + X3 + Y4 = -2

_C21: - 2 A67 - B67 - Y4 = -2

VARIABLES
0 <= A62 Integer
0 <= A63 Integer
0 <= A64 Integer
0 <= A65 Integer
0 <= A66 Integer
0 <= A67 Integer
0 <= B62 <= 1 Integer
0 <= B63 <= 1 Integer
0 <= B64 <= 1 Integer
0 <= B65 <= 1 Integer
0 <= B66 <= 1 Integer
0 <= B67 <= 1 Integer
0 <= X1 Integer
0 <= X3 Integer
Y0 free Integer
Y2 free Integer
Y4 free Integer
Z0 free Integer
Z2 free Integer
Z4 free Integer

Optimal
[A62, A63, A64, A65, A66, A67, B62, B63, B64, B65, B66, B67, X1, X3, Y0, Y2, Y4, Z0, Z2, Z4]
63 64 1.0 R
65 66 1.0 R
A62 = 1.0
A63 = 1.0
A64 = 1.0
A65 = 1.0
A66 = 1.0
A67 = 1.0
B62 = 0.0
B63 = 1.0
B64 = 0.0
B65 = 0.0
B66 = 1.0
B67 = 0.0
X1 = 1.0
X3 = 1.0
Y0 = 0.0
Y2 = 0.0
Y4 = 0.0
Z0 = 0.0
Z2 = 0.0
Z4 = 0.0
62.0 Objective Answer
Y0 (68, 69, 2, 'S')
A68 A68
B68 B68
A69 A69
B69 B69
obj -2*Y0 + 4
Sv_sum 0
CN_tune 144*Z0
obj B68 + B69 - 20*Y0 + 1584*Z0 + 40
Problem:
MINIMIZE
1*B68 + 1*B69 + -20*Y0 + 1584*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A68 - B68 - Y0 = -2

_C5: - 2 A69 - B69 - Y0 = -2

VARIABLES
0 <= A68 Integer
0 <= A69 Integer
0 <= B68 <= 1 Integer
0 <= B69 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A68, A69, B68, B69, Y0, Z0]
A68 = 1.0
A69 = 1.0
B68 = 0.0
B69 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (79, 78, 2, 'S')
X1 (79, 80, 0, 'R')
X2 (79, 81, 0, 'SV')
Y3 (81, 80, 2, 'S')
X4 (81, 82, 0, 'R')
Y5 (83, 82, 2, 'S')
X6 (83, 84, 0, 'R')
X7 (83, 85, 0, 'SV')
Y8 (85, 84, 2, 'S')
X9 (85, 86, 0, 'R')
Y10 (87, 86, 2, 'S')
X11 (87, 88, 0, 'R')
X12 (87, 90, 0, 'SV')
Y13 (89, 88, 2, 'S')
X14 (89, 90, 0, 'R')
Y15 (90, 91, 2, 'S')
A78 A78
B78 B78
A79 A79
B79 B79
A80 A80
B80 B80
A81 A81
B81 B81
A82 A82
B82 B82
A83 A83
B83 B83
A84 A84
B84 B84
A85 A85
B85 B85
A86 A86
B86 B86
A87 A87
B87 B87
A88 A88
B88 B88
A89 A89
B89 B89
A90 A90
B90 B90
A91 A91
B91 B91
obj -2*X1 - 2*X11 - 2*X12 - 2*X14 - 2*X2 - 2*X4 - 2*X6 - 2*X7 - 2*X9 - 2*Y0 - 2*Y10 - 2*Y13 - 2*Y15 - 2*Y3 - 2*Y5 - 2*Y8 + 28
Sv_sum T12 + T2 + T7
CN_tune 24*Z0 + 4*Z10 + 4*Z13 + 60*Z15 + 4*Z3 + 4*Z5 + 6*Z8
obj B78 + B79 + B80 + B81 + B82 + B83 + B84 + B85 + B86 + B87 + B88 + B89 + B90 + B91 - 10*T12 - 10*T2 - 10*T7 - 20*X1 - 20*X11 - 20*X12 - 20*X14 - 20*X2 - 20*X4 - 20*X6 - 20*X7 - 20*X9 - 20*Y0 - 20*Y10 - 20*Y13 - 20*Y15 - 20*Y3 - 20*Y5 - 20*Y8 + 264*Z0 + 44*Z10 + 44*Z13 + 660*Z15 + 44*Z3 + 44*Z5 + 66*Z8 + 280
Problem:
MINIMIZE
1*B78 + 1*B79 + 1*B80 + 1*B81 + 1*B82 + 1*B83 + 1*B84 + 1*B85 + 1*B86 + 1*B87 + 1*B88 + 1*B89 + 1*B90 + 1*B91 + -10*T12 + -10*T2 + -10*T7 + -20*X1 + -20*X11 + -20*X12 + -20*X14 + -20*X2 + -20*X4 + -20*X6 + -20*X7 + -20*X9 + -20*Y0 + -20*Y10 + -20*Y13 + -20*Y15 + -20*Y3 + -20*Y5 + -20*Y8 + 264*Z0 + 44*Z10 + 44*Z13 + 660*Z15 + 44*Z3 + 44*Z5 + 66*Z8 + 280
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: - 10 T2 + X2 <= 0

_C6: - T2 + X2 >= 0

_C7: X2 >= 0

_C8: Y3 + Z3 >= 0

_C9: - Y3 + Z3 >= 0

_C10: Z3 <= 1

_C11: X4 >= 1

_C12: Y5 + Z5 >= 0

_C13: - Y5 + Z5 >= 0

_C14: Z5 <= 1

_C15: X6 >= 1

_C16: - 10 T7 + X7 <= 0

_C17: - T7 + X7 >= 0

_C18: X7 >= 0

_C19: Y8 + Z8 >= 0

_C20: - Y8 + Z8 >= 0

_C21: Z8 <= 1

_C22: X9 >= 1

_C23: Y10 + Z10 >= 0

_C24: - Y10 + Z10 >= 0

_C25: Z10 <= 1

_C26: X11 >= 1

_C27: - 10 T12 + X12 <= 0

_C28: - T12 + X12 >= 0

_C29: X12 >= 0

_C30: Y13 + Z13 >= 0

_C31: - Y13 + Z13 >= 0

_C32: Z13 <= 1

_C33: X14 >= 1

_C34: Y15 + Z15 >= 0

_C35: - Y15 + Z15 >= 0

_C36: Z15 <= 1

_C37: - 2 A78 - B78 - Y0 = -2

_C38: X1 + X2 + Y0 <= 2

_C39: - 2 A79 - B79 + X1 + X2 + Y0 = -2

_C40: X1 + Y3 <= 2

_C41: - 2 A80 - B80 + X1 + Y3 = -2

_C42: X2 + X4 + Y3 <= 2

_C43: - 2 A81 - B81 + X2 + X4 + Y3 = -2

_C44: X4 + Y5 <= 2

_C45: - 2 A82 - B82 + X4 + Y5 = -2

_C46: X6 + X7 + Y5 <= 2

_C47: - 2 A83 - B83 + X6 + X7 + Y5 = -2

_C48: X6 + Y8 <= 2

_C49: - 2 A84 - B84 + X6 + Y8 = -2

_C50: X7 + X9 + Y8 <= 2

_C51: - 2 A85 - B85 + X7 + X9 + Y8 = -2

_C52: X9 + Y10 <= 2

_C53: - 2 A86 - B86 + X9 + Y10 = -2

_C54: X11 + X12 + Y10 <= 2

_C55: - 2 A87 - B87 + X11 + X12 + Y10 = -2

_C56: X11 + Y13 <= 2

_C57: - 2 A88 - B88 + X11 + Y13 = -2

_C58: X14 + Y13 <= 2

_C59: - 2 A89 - B89 + X14 + Y13 = -2

_C60: X12 + X14 + Y15 <= 2

_C61: - 2 A90 - B90 + X12 + X14 + Y15 = -2

_C62: - 2 A91 - B91 - Y15 = -2

VARIABLES
0 <= A78 Integer
0 <= A79 Integer
0 <= A80 Integer
0 <= A81 Integer
0 <= A82 Integer
0 <= A83 Integer
0 <= A84 Integer
0 <= A85 Integer
0 <= A86 Integer
0 <= A87 Integer
0 <= A88 Integer
0 <= A89 Integer
0 <= A90 Integer
0 <= A91 Integer
0 <= B78 <= 1 Integer
0 <= B79 <= 1 Integer
0 <= B80 <= 1 Integer
0 <= B81 <= 1 Integer
0 <= B82 <= 1 Integer
0 <= B83 <= 1 Integer
0 <= B84 <= 1 Integer
0 <= B85 <= 1 Integer
0 <= B86 <= 1 Integer
0 <= B87 <= 1 Integer
0 <= B88 <= 1 Integer
0 <= B89 <= 1 Integer
0 <= B90 <= 1 Integer
0 <= B91 <= 1 Integer
0 <= T12 <= 1 Integer
0 <= T2 <= 1 Integer
0 <= T7 <= 1 Integer
0 <= X1 Integer
0 <= X11 Integer
0 <= X12 Integer
0 <= X14 Integer
0 <= X2 Integer
0 <= X4 Integer
0 <= X6 Integer
0 <= X7 Integer
0 <= X9 Integer
Y0 free Integer
Y10 free Integer
Y13 free Integer
Y15 free Integer
Y3 free Integer
Y5 free Integer
Y8 free Integer
Z0 free Integer
Z10 free Integer
Z13 free Integer
Z15 free Integer
Z3 free Integer
Z5 free Integer
Z8 free Integer

Optimal
[A78, A79, A80, A81, A82, A83, A84, A85, A86, A87, A88, A89, A90, A91, B78, B79, B80, B81, B82, B83, B84, B85, B86, B87, B88, B89, B90, B91, T12, T2, T7, X1, X11, X12, X14, X2, X4, X6, X7, X9, Y0, Y10, Y13, Y15, Y3, Y5, Y8, Z0, Z10, Z13, Z15, Z3, Z5, Z8]
79 80 2.0 R
87 88 2.0 R
87 90 0.0 SV
89 90 2.0 R
79 81 0.0 SV
81 82 2.0 R
83 84 2.0 R
83 85 0.0 SV
85 86 2.0 R
A78 = 1.0
A79 = 2.0
A80 = 2.0
A81 = 2.0
A82 = 2.0
A83 = 2.0
A84 = 2.0
A85 = 2.0
A86 = 2.0
A87 = 2.0
A88 = 2.0
A89 = 2.0
A90 = 2.0
A91 = 1.0
B78 = 0.0
B79 = 0.0
B80 = 0.0
B81 = 0.0
B82 = 0.0
B83 = 0.0
B84 = 0.0
B85 = 0.0
B86 = 0.0
B87 = 0.0
B88 = 0.0
B89 = 0.0
B90 = 0.0
B91 = 0.0
T12 = 0.0
T2 = 0.0
T7 = 0.0
X1 = 2.0
X11 = 2.0
X12 = 0.0
X14 = 2.0
X2 = 0.0
X4 = 2.0
X6 = 2.0
X7 = 0.0
X9 = 2.0
Y0 = 0.0
Y10 = 0.0
Y13 = 0.0
Y15 = 0.0
Y3 = 0.0
Y5 = 0.0
Y8 = 0.0
Z0 = 0.0
Z10 = 0.0
Z13 = 0.0
Z15 = 0.0
Z3 = 0.0
Z5 = 0.0
Z8 = 0.0
40.0 Objective Answer
Y0 (92, 93, 2, 'S')
X1 (93, 94, 0, 'R')
Y2 (94, 95, 1, 'S')
X3 (95, 96, 0, 'R')
Y4 (97, 96, 2, 'S')
X5 (97, 98, 0, 'R')
Y6 (99, 98, 2, 'S')
X7 (98, 102, 0, 'SV')
X8 (99, 104, 0, 'SV')
X9 (99, 100, 0, 'R')
Y10 (105, 104, 2, 'S')
X11 (103, 104, 0, 'R')
X12 (105, 106, 0, 'R')
X13 (105, 107, 0, 'SV')
Y14 (107, 106, 2, 'S')
X15 (107, 108, 0, 'R')
Y16 (108, 109, 2, 'S')
X17 (109, 110, 0, 'R')
Y18 (111, 110, 3, 'S')
X19 (111, 112, 0, 'R')
Y20 (112, 113, 3, 'S')
X21 (112, 116, 0, 'SV')
X22 (113, 114, 0, 'R')
Y23 (115, 114, 2, 'S')
X24 (115, 116, 0, 'R')
Y25 (116, 117, 2, 'S')
Y26 (103, 102, 2, 'S')
X27 (101, 102, 0, 'R')
Y28 (101, 100, 2, 'S')
X29 (109, 109, 0, 'SV')
A92 A92
B92 B92
A93 A93
B93 B93
A94 A94
B94 B94
A95 A95
B95 B95
A96 A96
B96 B96
A97 A97
B97 B97
A98 A98
B98 B98
A99 A99
B99 B99
A104 A104
B104 B104
A105 A105
B105 B105
A106 A106
B106 B106
A107 A107
B107 B107
A108 A108
B108 B108
A109 A109
B109 B109
A110 A110
B110 B110
A111 A111
B111 B111
A112 A112
B112 B112
A113 A113
B113 B113
A114 A114
B114 B114
A115 A115
B115 B115
A116 A116
B116 B116
A117 A117
B117 B117
A103 A103
B103 B103
A102 A102
B102 B102
A101 A101
B101 B101
A100 A100
B100 B100
obj -2*X1 - 2*X11 - 2*X12 - 2*X13 - 2*X15 - 2*X17 - 2*X19 - 2*X21 - 2*X22 - 2*X24 - 2*X27 - 2*X29 - 2*X3 - 2*X5 - 2*X7 - 2*X8 - 2*X9 - 2*Y0 - 2*Y10 - 2*Y14 - 2*Y16 - 2*Y18 - 2*Y2 - 2*Y20 - 2*Y23 - 2*Y25 - 2*Y26 - 2*Y28 - 2*Y4 - 2*Y6 + 54
Sv_sum T13 + T21 + T29 + T7 + T8
CN_tune 8*Z0 + 4*Z10 + 4*Z14 + 6*Z16 + 12*Z18 + 12*Z20 + 4*Z23 + 52*Z25 + 4*Z26 + 4*Z28 + 8*Z4 + 4*Z6
obj B100 + B101 + B102 + B103 + B104 + B105 + B106 + B107 + B108 + B109 + B110 + B111 + B112 + B113 + B114 + B115 + B116 + B117 + B92 + B93 + B94 + B95 + B96 + B97 + B98 + B99 - 10*T13 - 10*T21 - 10*T29 - 10*T7 - 10*T8 - 20*X1 - 20*X11 - 20*X12 - 20*X13 - 20*X15 - 20*X17 - 20*X19 - 20*X21 - 20*X22 - 20*X24 - 20*X27 - 20*X29 - 20*X3 - 20*X5 - 20*X7 - 20*X8 - 20*X9 - 20*Y0 - 20*Y10 - 20*Y14 - 20*Y16 - 20*Y18 - 20*Y2 - 20*Y20 - 20*Y23 - 20*Y25 - 20*Y26 - 20*Y28 - 20*Y4 - 20*Y6 + 88*Z0 + 44*Z10 + 44*Z14 + 66*Z16 + 132*Z18 + 132*Z20 + 44*Z23 + 572*Z25 + 44*Z26 + 44*Z28 + 88*Z4 + 44*Z6 + 540
Problem:
MINIMIZE
1*B100 + 1*B101 + 1*B102 + 1*B103 + 1*B104 + 1*B105 + 1*B106 + 1*B107 + 1*B108 + 1*B109 + 1*B110 + 1*B111 + 1*B112 + 1*B113 + 1*B114 + 1*B115 + 1*B116 + 1*B117 + 1*B92 + 1*B93 + 1*B94 + 1*B95 + 1*B96 + 1*B97 + 1*B98 + 1*B99 + -10*T13 + -10*T21 + -10*T29 + -10*T7 + -10*T8 + -20*X1 + -20*X11 + -20*X12 + -20*X13 + -20*X15 + -20*X17 + -20*X19 + -20*X21 + -20*X22 + -20*X24 + -20*X27 + -20*X29 + -20*X3 + -20*X5 + -20*X7 + -20*X8 + -20*X9 + -20*Y0 + -20*Y10 + -20*Y14 + -20*Y16 + -20*Y18 + -20*Y2 + -20*Y20 + -20*Y23 + -20*Y25 + -20*Y26 + -20*Y28 + -20*Y4 + -20*Y6 + 88*Z0 + 44*Z10 + 44*Z14 + 66*Z16 + 132*Z18 + 132*Z20 + 44*Z23 + 572*Z25 + 44*Z26 + 44*Z28 + 88*Z4 + 44*Z6 + 540
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: Y2 + Z2 >= 0

_C6: - Y2 + Z2 >= 0

_C7: Z2 <= 1

_C8: X3 >= 1

_C9: Y4 + Z4 >= 0

_C10: - Y4 + Z4 >= 0

_C11: Z4 <= 1

_C12: X5 >= 1

_C13: Y6 + Z6 >= 0

_C14: - Y6 + Z6 >= 0

_C15: Z6 <= 1

_C16: - 10 T7 + X7 <= 0

_C17: - T7 + X7 >= 0

_C18: X7 >= 0

_C19: - 10 T8 + X8 <= 0

_C20: - T8 + X8 >= 0

_C21: X8 >= 0

_C22: X9 >= 1

_C23: Y10 + Z10 >= 0

_C24: - Y10 + Z10 >= 0

_C25: Z10 <= 1

_C26: X11 >= 1

_C27: X12 >= 1

_C28: - 10 T13 + X13 <= 0

_C29: - T13 + X13 >= 0

_C30: X13 >= 0

_C31: Y14 + Z14 >= 0

_C32: - Y14 + Z14 >= 0

_C33: Z14 <= 1

_C34: X15 >= 1

_C35: Y16 + Z16 >= 0

_C36: - Y16 + Z16 >= 0

_C37: Z16 <= 1

_C38: X17 >= 1

_C39: Y18 + Z18 >= 0

_C40: - Y18 + Z18 >= 0

_C41: Z18 <= 1

_C42: X19 >= 1

_C43: Y20 + Z20 >= 0

_C44: - Y20 + Z20 >= 0

_C45: Z20 <= 1

_C46: - 10 T21 + X21 <= 0

_C47: - T21 + X21 >= 0

_C48: X21 >= 0

_C49: X22 >= 1

_C50: Y23 + Z23 >= 0

_C51: - Y23 + Z23 >= 0

_C52: Z23 <= 1

_C53: X24 >= 1

_C54: Y25 + Z25 >= 0

_C55: - Y25 + Z25 >= 0

_C56: Z25 <= 1

_C57: Y26 + Z26 >= 0

_C58: - Y26 + Z26 >= 0

_C59: Z26 <= 1

_C60: X27 >= 1

_C61: Y28 + Z28 >= 0

_C62: - Y28 + Z28 >= 0

_C63: Z28 <= 1

_C64: - 10 T29 + X29 <= 0

_C65: - T29 + X29 >= 0

_C66: X29 >= 0

_C67: - 2 A92 - B92 - Y0 = -2

_C68: X1 + Y0 <= 2

_C69: - 2 A93 - B93 + X1 + Y0 = -2

_C70: X1 + Y2 <= 1

_C71: - 2 A94 - B94 + X1 + Y2 = -1

_C72: X3 + Y2 <= 1

_C73: - 2 A95 - B95 + X3 + Y2 = -1

_C74: X3 + Y4 <= 2

_C75: - 2 A96 - B96 + X3 + Y4 = -2

_C76: X5 + Y4 <= 2

_C77: - 2 A97 - B97 + X5 + Y4 = -2

_C78: X5 + X7 + Y6 <= 2

_C79: - 2 A98 - B98 + X5 + X7 + Y6 = -2

_C80: X8 + X9 + Y6 <= 2

_C81: - 2 A99 - B99 + X8 + X9 + Y6 = -2

_C82: X11 + X8 + Y10 <= 2

_C83: - 2 A104 - B104 + X11 + X8 + Y10 = -2

_C84: X12 + X13 + Y10 <= 2

_C85: - 2 A105 - B105 + X12 + X13 + Y10 = -2

_C86: X12 + Y14 <= 2

_C87: - 2 A106 - B106 + X12 + Y14 = -2

_C88: X13 + X15 + Y14 <= 2

_C89: - 2 A107 - B107 + X13 + X15 + Y14 = -2

_C90: X15 + Y16 <= 2

_C91: - 2 A108 - B108 + X15 + Y16 = -2

_C92: X17 + 2 X29 + Y16 <= 2

_C93: - 2 A109 - B109 + X17 + 2 X29 + Y16 = -2

_C94: X17 + Y18 <= 3

_C95: - 2 A110 - B110 + X17 + Y18 = -3

_C96: X19 + Y18 <= 3

_C97: - 2 A111 - B111 + X19 + Y18 = -3

_C98: X19 + X21 + Y20 <= 3

_C99: - 2 A112 - B112 + X19 + X21 + Y20 = -3

_C100: X22 + Y20 <= 3

_C101: - 2 A113 - B113 + X22 + Y20 = -3

_C102: X22 + Y23 <= 2

_C103: - 2 A114 - B114 + X22 + Y23 = -2

_C104: X24 + Y23 <= 2

_C105: - 2 A115 - B115 + X24 + Y23 = -2

_C106: X21 + X24 + Y25 <= 2

_C107: - 2 A116 - B116 + X21 + X24 + Y25 = -2

_C108: - 2 A117 - B117 - Y25 = -2

_C109: X11 + Y26 <= 2

_C110: - 2 A103 - B103 + X11 + Y26 = -2

_C111: X27 + X7 + Y26 <= 2

_C112: - 2 A102 - B102 + X27 + X7 + Y26 = -2

_C113: X27 + Y28 <= 2

_C114: - 2 A101 - B101 + X27 + Y28 = -2

_C115: X9 + Y28 <= 2

_C116: - 2 A100 - B100 + X9 + Y28 = -2

VARIABLES
0 <= A100 Integer
0 <= A101 Integer
0 <= A102 Integer
0 <= A103 Integer
0 <= A104 Integer
0 <= A105 Integer
0 <= A106 Integer
0 <= A107 Integer
0 <= A108 Integer
0 <= A109 Integer
0 <= A110 Integer
0 <= A111 Integer
0 <= A112 Integer
0 <= A113 Integer
0 <= A114 Integer
0 <= A115 Integer
0 <= A116 Integer
0 <= A117 Integer
0 <= A92 Integer
0 <= A93 Integer
0 <= A94 Integer
0 <= A95 Integer
0 <= A96 Integer
0 <= A97 Integer
0 <= A98 Integer
0 <= A99 Integer
0 <= B100 <= 1 Integer
0 <= B101 <= 1 Integer
0 <= B102 <= 1 Integer
0 <= B103 <= 1 Integer
0 <= B104 <= 1 Integer
0 <= B105 <= 1 Integer
0 <= B106 <= 1 Integer
0 <= B107 <= 1 Integer
0 <= B108 <= 1 Integer
0 <= B109 <= 1 Integer
0 <= B110 <= 1 Integer
0 <= B111 <= 1 Integer
0 <= B112 <= 1 Integer
0 <= B113 <= 1 Integer
0 <= B114 <= 1 Integer
0 <= B115 <= 1 Integer
0 <= B116 <= 1 Integer
0 <= B117 <= 1 Integer
0 <= B92 <= 1 Integer
0 <= B93 <= 1 Integer
0 <= B94 <= 1 Integer
0 <= B95 <= 1 Integer
0 <= B96 <= 1 Integer
0 <= B97 <= 1 Integer
0 <= B98 <= 1 Integer
0 <= B99 <= 1 Integer
0 <= T13 <= 1 Integer
0 <= T21 <= 1 Integer
0 <= T29 <= 1 Integer
0 <= T7 <= 1 Integer
0 <= T8 <= 1 Integer
0 <= X1 Integer
0 <= X11 Integer
0 <= X12 Integer
0 <= X13 Integer
0 <= X15 Integer
0 <= X17 Integer
0 <= X19 Integer
0 <= X21 Integer
0 <= X22 Integer
0 <= X24 Integer
0 <= X27 Integer
0 <= X29 Integer
0 <= X3 Integer
0 <= X5 Integer
0 <= X7 Integer
0 <= X8 Integer
0 <= X9 Integer
Y0 free Integer
Y10 free Integer
Y14 free Integer
Y16 free Integer
Y18 free Integer
Y2 free Integer
Y20 free Integer
Y23 free Integer
Y25 free Integer
Y26 free Integer
Y28 free Integer
Y4 free Integer
Y6 free Integer
Z0 free Integer
Z10 free Integer
Z14 free Integer
Z16 free Integer
Z18 free Integer
Z2 free Integer
Z20 free Integer
Z23 free Integer
Z25 free Integer
Z26 free Integer
Z28 free Integer
Z4 free Integer
Z6 free Integer

Optimal
[A100, A101, A102, A103, A104, A105, A106, A107, A108, A109, A110, A111, A112, A113, A114, A115, A116, A117, A92, A93, A94, A95, A96, A97, A98, A99, B100, B101, B102, B103, B104, B105, B106, B107, B108, B109, B110, B111, B112, B113, B114, B115, B116, B117, B92, B93, B94, B95, B96, B97, B98, B99, T13, T21, T29, T7, T8, X1, X11, X12, X13, X15, X17, X19, X21, X22, X24, X27, X29, X3, X5, X7, X8, X9, Y0, Y10, Y14, Y16, Y18, Y2, Y20, Y23, Y25, Y26, Y28, Y4, Y6, Z0, Z10, Z14, Z16, Z18, Z2, Z20, Z23, Z25, Z26, Z28, Z4, Z6]
93 94 2.0 R
103 104 2.0 R
105 106 2.0 R
105 107 0.0 SV
107 108 2.0 R
109 110 2.0 R
111 112 3.0 R
112 116 0.0 SV
113 114 2.0 R
115 116 2.0 R
101 102 2.0 R
109 109 0.0 SV
95 96 2.0 R
97 98 2.0 R
98 102 0.0 SV
99 104 0.0 SV
99 100 2.0 R
A100 = 2.0
A101 = 2.0
A102 = 2.0
A103 = 2.0
A104 = 2.0
A105 = 2.0
A106 = 2.0
A107 = 2.0
A108 = 2.0
A109 = 2.0
A110 = 2.0
A111 = 3.0
A112 = 3.0
A113 = 2.0
A114 = 2.0
A115 = 2.0
A116 = 2.0
A117 = 1.0
A92 = 1.0
A93 = 2.0
A94 = 1.0
A95 = 1.0
A96 = 2.0
A97 = 2.0
A98 = 2.0
A99 = 2.0
B100 = 0.0
B101 = 0.0
B102 = 0.0
B103 = 0.0
B104 = 0.0
B105 = 0.0
B106 = 0.0
B107 = 0.0
B108 = 0.0
B109 = 0.0
B110 = 1.0
B111 = 0.0
B112 = 0.0
B113 = 1.0
B114 = 0.0
B115 = 0.0
B116 = 0.0
B117 = 0.0
B92 = 0.0
B93 = 0.0
B94 = 0.0
B95 = 0.0
B96 = 0.0
B97 = 0.0
B98 = 0.0
B99 = 0.0
T13 = 0.0
T21 = 0.0
T29 = 0.0
T7 = 0.0
T8 = 0.0
X1 = 2.0
X11 = 2.0
X12 = 2.0
X13 = 0.0
X15 = 2.0
X17 = 2.0
X19 = 3.0
X21 = 0.0
X22 = 2.0
X24 = 2.0
X27 = 2.0
X29 = 0.0
X3 = 2.0
X5 = 2.0
X7 = 0.0
X8 = 0.0
X9 = 2.0
Y0 = 0.0
Y10 = 0.0
Y14 = 0.0
Y16 = 0.0
Y18 = 0.0
Y2 = -1.0
Y20 = 0.0
Y23 = 0.0
Y25 = 0.0
Y26 = 0.0
Y28 = 0.0
Y4 = 0.0
Y6 = 0.0
Z0 = 0.0
Z10 = 0.0
Z14 = 0.0
Z16 = 0.0
Z18 = 0.0
Z2 = 1.0
Z20 = 0.0
Z23 = 0.0
Z25 = 0.0
Z26 = 0.0
Z28 = 0.0
Z4 = 0.0
Z6 = 0.0
62.0 Objective Answer
Y0 (118, 119, 2, 'S')
X1 (119, 120, 0, 'R')
Y2 (120, 121, 0, 'S')
X3 (121, 122, 0, 'R')
Y4 (122, 123, 2, 'S')
A118 A118
B118 B118
A119 A119
B119 B119
A120 A120
B120 B120
A121 A121
B121 B121
A122 A122
B122 B122
A123 A123
B123 B123
obj -2*X1 - 2*X3 - 2*Y0 - 2*Y2 - 2*Y4 + 8
Sv_sum 0
CN_tune 44*Z0 + 12*Z2 + 36*Z4
obj B118 + B119 + B120 + B121 + B122 + B123 - 20*X1 - 20*X3 - 20*Y0 - 20*Y2 - 20*Y4 + 484*Z0 + 132*Z2 + 396*Z4 + 80
Problem:
MINIMIZE
1*B118 + 1*B119 + 1*B120 + 1*B121 + 1*B122 + 1*B123 + -20*X1 + -20*X3 + -20*Y0 + -20*Y2 + -20*Y4 + 484*Z0 + 132*Z2 + 396*Z4 + 80
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: Y2 + Z2 >= 0

_C6: - Y2 + Z2 >= 0

_C7: Z2 <= 1

_C8: X3 >= 1

_C9: Y4 + Z4 >= 0

_C10: - Y4 + Z4 >= 0

_C11: Z4 <= 1

_C12: - 2 A118 - B118 - Y0 = -2

_C13: X1 + Y0 <= 2

_C14: - 2 A119 - B119 + X1 + Y0 = -2

_C15: X1 + Y2 <= 0

_C16: - 2 A120 - B120 + X1 + Y2 = 0

_C17: X3 + Y2 <= 0

_C18: - 2 A121 - B121 + X3 + Y2 = 0

_C19: X3 + Y4 <= 2

_C20: - 2 A122 - B122 + X3 + Y4 = -2

_C21: - 2 A123 - B123 - Y4 = -2

VARIABLES
0 <= A118 Integer
0 <= A119 Integer
0 <= A120 Integer
0 <= A121 Integer
0 <= A122 Integer
0 <= A123 Integer
0 <= B118 <= 1 Integer
0 <= B119 <= 1 Integer
0 <= B120 <= 1 Integer
0 <= B121 <= 1 Integer
0 <= B122 <= 1 Integer
0 <= B123 <= 1 Integer
0 <= X1 Integer
0 <= X3 Integer
Y0 free Integer
Y2 free Integer
Y4 free Integer
Z0 free Integer
Z2 free Integer
Z4 free Integer

Optimal
[A118, A119, A120, A121, A122, A123, B118, B119, B120, B121, B122, B123, X1, X3, Y0, Y2, Y4, Z0, Z2, Z4]
119 120 1.0 R
121 122 1.0 R
A118 = 1.0
A119 = 1.0
A120 = 0.0
A121 = 0.0
A122 = 1.0
A123 = 1.0
B118 = 0.0
B119 = 1.0
B120 = 0.0
B121 = 0.0
B122 = 1.0
B123 = 0.0
X1 = 1.0
X3 = 1.0
Y0 = 0.0
Y2 = -1.0
Y4 = 0.0
Z0 = 0.0
Z2 = 1.0
Z4 = 0.0
194.0 Objective Answer
Y0 (124, 125, 2, 'S')
A124 A124
B124 B124
A125 A125
B125 B125
obj -2*Y0 + 4
Sv_sum 0
CN_tune 108*Z0
obj B124 + B125 - 20*Y0 + 1188*Z0 + 40
Problem:
MINIMIZE
1*B124 + 1*B125 + -20*Y0 + 1188*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A124 - B124 - Y0 = -2

_C5: - 2 A125 - B125 - Y0 = -2

VARIABLES
0 <= A124 Integer
0 <= A125 Integer
0 <= B124 <= 1 Integer
0 <= B125 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A124, A125, B124, B125, Y0, Z0]
A124 = 1.0
A125 = 1.0
B124 = 0.0
B125 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (126, 127, 2, 'S')
A126 A126
B126 B126
A127 A127
B127 B127
obj -2*Y0 + 4
Sv_sum 0
CN_tune 78*Z0
obj B126 + B127 - 20*Y0 + 858*Z0 + 40
Problem:
MINIMIZE
1*B126 + 1*B127 + -20*Y0 + 858*Z0 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A126 - B126 - Y0 = -2

_C5: - 2 A127 - B127 - Y0 = -2

VARIABLES
0 <= A126 Integer
0 <= A127 Integer
0 <= B126 <= 1 Integer
0 <= B127 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A126, A127, B126, B127, Y0, Z0]
A126 = 1.0
A127 = 1.0
B126 = 0.0
B127 = 0.0
Y0 = 0.0
Z0 = 0.0
40.0 Objective Answer
Y0 (129, 128, 2, 'S')
X1 (129, 130, 0, 'R')
X2 (129, 133, 0, 'SV')
Y3 (131, 130, 2, 'S')
X4 (131, 132, 0, 'R')
X5 (132, 136, 0, 'SV')
Y6 (133, 132, 2, 'S')
Y7 (136, 137, 2, 'S')
X8 (135, 136, 0, 'R')
Y9 (135, 134, 2, 'S')
X10 (133, 134, 0, 'R')
A128 A128
B128 B128
A129 A129
B129 B129
A130 A130
B130 B130
A131 A131
B131 B131
A132 A132
B132 B132
A136 A136
B136 B136
A137 A137
B137 B137
A135 A135
B135 B135
A134 A134
B134 B134
A133 A133
B133 B133
obj -2*X1 - 2*X10 - 2*X2 - 2*X4 - 2*X5 - 2*X8 - 2*Y0 - 2*Y3 - 2*Y6 - 2*Y7 - 2*Y9 + 20
Sv_sum T2 + T5
CN_tune 28*Z0 + 4*Z3 + 4*Z6 + 32*Z7 + 4*Z9
obj B128 + B129 + B130 + B131 + B132 + B133 + B134 + B135 + B136 + B137 - 10*T2 - 10*T5 - 20*X1 - 20*X10 - 20*X2 - 20*X4 - 20*X5 - 20*X8 - 20*Y0 - 20*Y3 - 20*Y6 - 20*Y7 - 20*Y9 + 308*Z0 + 44*Z3 + 44*Z6 + 352*Z7 + 44*Z9 + 200
Problem:
MINIMIZE
1*B128 + 1*B129 + 1*B130 + 1*B131 + 1*B132 + 1*B133 + 1*B134 + 1*B135 + 1*B136 + 1*B137 + -10*T2 + -10*T5 + -20*X1 + -20*X10 + -20*X2 + -20*X4 + -20*X5 + -20*X8 + -20*Y0 + -20*Y3 + -20*Y6 + -20*Y7 + -20*Y9 + 308*Z0 + 44*Z3 + 44*Z6 + 352*Z7 + 44*Z9 + 200
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: - 10 T2 + X2 <= 0

_C6: - T2 + X2 >= 0

_C7: X2 >= 0

_C8: Y3 + Z3 >= 0

_C9: - Y3 + Z3 >= 0

_C10: Z3 <= 1

_C11: X4 >= 1

_C12: - 10 T5 + X5 <= 0

_C13: - T5 + X5 >= 0

_C14: X5 >= 0

_C15: Y6 + Z6 >= 0

_C16: - Y6 + Z6 >= 0

_C17: Z6 <= 1

_C18: Y7 + Z7 >= 0

_C19: - Y7 + Z7 >= 0

_C20: Z7 <= 1

_C21: X8 >= 1

_C22: Y9 + Z9 >= 0

_C23: - Y9 + Z9 >= 0

_C24: Z9 <= 1

_C25: X10 >= 1

_C26: - 2 A128 - B128 - Y0 = -2

_C27: X1 + X2 + Y0 <= 2

_C28: - 2 A129 - B129 + X1 + X2 + Y0 = -2

_C29: X1 + Y3 <= 2

_C30: - 2 A130 - B130 + X1 + Y3 = -2

_C31: X4 + Y3 <= 2

_C32: - 2 A131 - B131 + X4 + Y3 = -2

_C33: X4 + X5 + Y6 <= 2

_C34: - 2 A132 - B132 + X4 + X5 + Y6 = -2

_C35: X5 + X8 + Y7 <= 2

_C36: - 2 A136 - B136 + X5 + X8 + Y7 = -2

_C37: - 2 A137 - B137 - Y7 = -2

_C38: X8 + Y9 <= 2

_C39: - 2 A135 - B135 + X8 + Y9 = -2

_C40: X10 + Y9 <= 2

_C41: - 2 A134 - B134 + X10 + Y9 = -2

_C42: X10 + X2 + Y6 <= 2

_C43: - 2 A133 - B133 + X10 + X2 + Y6 = -2

VARIABLES
0 <= A128 Integer
0 <= A129 Integer
0 <= A130 Integer
0 <= A131 Integer
0 <= A132 Integer
0 <= A133 Integer
0 <= A134 Integer
0 <= A135 Integer
0 <= A136 Integer
0 <= A137 Integer
0 <= B128 <= 1 Integer
0 <= B129 <= 1 Integer
0 <= B130 <= 1 Integer
0 <= B131 <= 1 Integer
0 <= B132 <= 1 Integer
0 <= B133 <= 1 Integer
0 <= B134 <= 1 Integer
0 <= B135 <= 1 Integer
0 <= B136 <= 1 Integer
0 <= B137 <= 1 Integer
0 <= T2 <= 1 Integer
0 <= T5 <= 1 Integer
0 <= X1 Integer
0 <= X10 Integer
0 <= X2 Integer
0 <= X4 Integer
0 <= X5 Integer
0 <= X8 Integer
Y0 free Integer
Y3 free Integer
Y6 free Integer
Y7 free Integer
Y9 free Integer
Z0 free Integer
Z3 free Integer
Z6 free Integer
Z7 free Integer
Z9 free Integer

Optimal
[A128, A129, A130, A131, A132, A133, A134, A135, A136, A137, B128, B129, B130, B131, B132, B133, B134, B135, B136, B137, T2, T5, X1, X10, X2, X4, X5, X8, Y0, Y3, Y6, Y7, Y9, Z0, Z3, Z6, Z7, Z9]
129 130 2.0 R
133 134 2.0 R
129 133 0.0 SV
131 132 2.0 R
132 136 0.0 SV
135 136 2.0 R
A128 = 1.0
A129 = 2.0
A130 = 2.0
A131 = 2.0
A132 = 2.0
A133 = 2.0
A134 = 2.0
A135 = 2.0
A136 = 2.0
A137 = 1.0
B128 = 0.0
B129 = 0.0
B130 = 0.0
B131 = 0.0
B132 = 0.0
B133 = 0.0
B134 = 0.0
B135 = 0.0
B136 = 0.0
B137 = 0.0
T2 = 0.0
T5 = 0.0
X1 = 2.0
X10 = 2.0
X2 = 0.0
X4 = 2.0
X5 = 0.0
X8 = 2.0
Y0 = 0.0
Y3 = 0.0
Y6 = 0.0
Y7 = 0.0
Y9 = 0.0
Z0 = 0.0
Z3 = 0.0
Z6 = 0.0
Z7 = 0.0
Z9 = 0.0
40.0 Objective Answer
Y0 (139, 138, 2, 'S')
X1 (139, 152, 0, 'SV')
X2 (139, 140, 0, 'R')
Y3 (153, 152, 2, 'S')
X4 (151, 152, 0, 'R')
X5 (153, 154, 0, 'R')
Y6 (154, 155, 2, 'S')
X7 (143, 154, 0, 'SV')
X8 (143, 144, 0, 'R')
Y9 (143, 142, 2, 'S')
Y10 (144, 145, 2, 'S')
X11 (145, 146, 0, 'R')
Y12 (146, 147, 1, 'S')
X13 (147, 148, 0, 'R')
Y14 (149, 148, 2, 'S')
X15 (149, 150, 0, 'R')
X16 (142, 150, 0, 'SV')
Y17 (151, 150, 2, 'S')
X18 (141, 142, 0, 'R')
Y19 (141, 140, 2, 'S')
A138 A138
B138 B138
A139 A139
B139 B139
A152 A152
B152 B152
A153 A153
B153 B153
A154 A154
B154 B154
A155 A155
B155 B155
A143 A143
B143 B143
A144 A144
B144 B144
A145 A145
B145 B145
A146 A146
B146 B146
A147 A147
B147 B147
A148 A148
B148 B148
A149 A149
B149 B149
A150 A150
B150 B150
A142 A142
B142 B142
A141 A141
B141 B141
A140 A140
B140 B140
A151 A151
B151 B151
obj -2*X1 - 2*X11 - 2*X13 - 2*X15 - 2*X16 - 2*X18 - 2*X2 - 2*X4 - 2*X5 - 2*X7 - 2*X8 - 2*Y0 - 2*Y10 - 2*Y12 - 2*Y14 - 2*Y17 - 2*Y19 - 2*Y3 - 2*Y6 - 2*Y9 + 34
Sv_sum T1 + T16 + T7
CN_tune 8*Z0 + 4*Z10 + 4*Z14 + 4*Z17 + 4*Z19 + 4*Z3 + 36*Z6 + 4*Z9
obj B138 + B139 + B140 + B141 + B142 + B143 + B144 + B145 + B146 + B147 + B148 + B149 + B150 + B151 + B152 + B153 + B154 + B155 - 10*T1 - 10*T16 - 10*T7 - 20*X1 - 20*X11 - 20*X13 - 20*X15 - 20*X16 - 20*X18 - 20*X2 - 20*X4 - 20*X5 - 20*X7 - 20*X8 - 20*Y0 - 20*Y10 - 20*Y12 - 20*Y14 - 20*Y17 - 20*Y19 - 20*Y3 - 20*Y6 - 20*Y9 + 88*Z0 + 44*Z10 + 44*Z14 + 44*Z17 + 44*Z19 + 44*Z3 + 396*Z6 + 44*Z9 + 340
Problem:
MINIMIZE
1*B138 + 1*B139 + 1*B140 + 1*B141 + 1*B142 + 1*B143 + 1*B144 + 1*B145 + 1*B146 + 1*B147 + 1*B148 + 1*B149 + 1*B150 + 1*B151 + 1*B152 + 1*B153 + 1*B154 + 1*B155 + -10*T1 + -10*T16 + -10*T7 + -20*X1 + -20*X11 + -20*X13 + -20*X15 + -20*X16 + -20*X18 + -20*X2 + -20*X4 + -20*X5 + -20*X7 + -20*X8 + -20*Y0 + -20*Y10 + -20*Y12 + -20*Y14 + -20*Y17 + -20*Y19 + -20*Y3 + -20*Y6 + -20*Y9 + 88*Z0 + 44*Z10 + 44*Z14 + 44*Z17 + 44*Z19 + 44*Z3 + 396*Z6 + 44*Z9 + 340
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 10 T1 + X1 <= 0

_C5: - T1 + X1 >= 0

_C6: X1 >= 0

_C7: X2 >= 1

_C8: Y3 + Z3 >= 0

_C9: - Y3 + Z3 >= 0

_C10: Z3 <= 1

_C11: X4 >= 1

_C12: X5 >= 1

_C13: Y6 + Z6 >= 0

_C14: - Y6 + Z6 >= 0

_C15: Z6 <= 1

_C16: - 10 T7 + X7 <= 0

_C17: - T7 + X7 >= 0

_C18: X7 >= 0

_C19: X8 >= 1

_C20: Y9 + Z9 >= 0

_C21: - Y9 + Z9 >= 0

_C22: Z9 <= 1

_C23: Y10 + Z10 >= 0

_C24: - Y10 + Z10 >= 0

_C25: Z10 <= 1

_C26: X11 >= 1

_C27: Y12 + Z12 >= 0

_C28: - Y12 + Z12 >= 0

_C29: Z12 <= 1

_C30: X13 >= 1

_C31: Y14 + Z14 >= 0

_C32: - Y14 + Z14 >= 0

_C33: Z14 <= 1

_C34: X15 >= 1

_C35: - 10 T16 + X16 <= 0

_C36: - T16 + X16 >= 0

_C37: X16 >= 0

_C38: Y17 + Z17 >= 0

_C39: - Y17 + Z17 >= 0

_C40: Z17 <= 1

_C41: X18 >= 1

_C42: Y19 + Z19 >= 0

_C43: - Y19 + Z19 >= 0

_C44: Z19 <= 1

_C45: - 2 A138 - B138 - Y0 = -2

_C46: X1 + X2 + Y0 <= 2

_C47: - 2 A139 - B139 + X1 + X2 + Y0 = -2

_C48: X1 + X4 + Y3 <= 2

_C49: - 2 A152 - B152 + X1 + X4 + Y3 = -2

_C50: X5 + Y3 <= 2

_C51: - 2 A153 - B153 + X5 + Y3 = -2

_C52: X5 + X7 + Y6 <= 2

_C53: - 2 A154 - B154 + X5 + X7 + Y6 = -2

_C54: - 2 A155 - B155 - Y6 = -2

_C55: X7 + X8 + Y9 <= 2

_C56: - 2 A143 - B143 + X7 + X8 + Y9 = -2

_C57: X8 + Y10 <= 2

_C58: - 2 A144 - B144 + X8 + Y10 = -2

_C59: X11 + Y10 <= 2

_C60: - 2 A145 - B145 + X11 + Y10 = -2

_C61: X11 + Y12 <= 1

_C62: - 2 A146 - B146 + X11 + Y12 = -1

_C63: X13 + Y12 <= 1

_C64: - 2 A147 - B147 + X13 + Y12 = -1

_C65: X13 + Y14 <= 2

_C66: - 2 A148 - B148 + X13 + Y14 = -2

_C67: X15 + Y14 <= 2

_C68: - 2 A149 - B149 + X15 + Y14 = -2

_C69: X15 + X16 + Y17 <= 2

_C70: - 2 A150 - B150 + X15 + X16 + Y17 = -2

_C71: X16 + X18 + Y9 <= 2

_C72: - 2 A142 - B142 + X16 + X18 + Y9 = -2

_C73: X18 + Y19 <= 2

_C74: - 2 A141 - B141 + X18 + Y19 = -2

_C75: X2 + Y19 <= 2

_C76: - 2 A140 - B140 + X2 + Y19 = -2

_C77: X4 + Y17 <= 2

_C78: - 2 A151 - B151 + X4 + Y17 = -2

VARIABLES
0 <= A138 Integer
0 <= A139 Integer
0 <= A140 Integer
0 <= A141 Integer
0 <= A142 Integer
0 <= A143 Integer
0 <= A144 Integer
0 <= A145 Integer
0 <= A146 Integer
0 <= A147 Integer
0 <= A148 Integer
0 <= A149 Integer
0 <= A150 Integer
0 <= A151 Integer
0 <= A152 Integer
0 <= A153 Integer
0 <= A154 Integer
0 <= A155 Integer
0 <= B138 <= 1 Integer
0 <= B139 <= 1 Integer
0 <= B140 <= 1 Integer
0 <= B141 <= 1 Integer
0 <= B142 <= 1 Integer
0 <= B143 <= 1 Integer
0 <= B144 <= 1 Integer
0 <= B145 <= 1 Integer
0 <= B146 <= 1 Integer
0 <= B147 <= 1 Integer
0 <= B148 <= 1 Integer
0 <= B149 <= 1 Integer
0 <= B150 <= 1 Integer
0 <= B151 <= 1 Integer
0 <= B152 <= 1 Integer
0 <= B153 <= 1 Integer
0 <= B154 <= 1 Integer
0 <= B155 <= 1 Integer
0 <= T1 <= 1 Integer
0 <= T16 <= 1 Integer
0 <= T7 <= 1 Integer
0 <= X1 Integer
0 <= X11 Integer
0 <= X13 Integer
0 <= X15 Integer
0 <= X16 Integer
0 <= X18 Integer
0 <= X2 Integer
0 <= X4 Integer
0 <= X5 Integer
0 <= X7 Integer
0 <= X8 Integer
Y0 free Integer
Y10 free Integer
Y12 free Integer
Y14 free Integer
Y17 free Integer
Y19 free Integer
Y3 free Integer
Y6 free Integer
Y9 free Integer
Z0 free Integer
Z10 free Integer
Z12 free Integer
Z14 free Integer
Z17 free Integer
Z19 free Integer
Z3 free Integer
Z6 free Integer
Z9 free Integer

Optimal
[A138, A139, A140, A141, A142, A143, A144, A145, A146, A147, A148, A149, A150, A151, A152, A153, A154, A155, B138, B139, B140, B141, B142, B143, B144, B145, B146, B147, B148, B149, B150, B151, B152, B153, B154, B155, T1, T16, T7, X1, X11, X13, X15, X16, X18, X2, X4, X5, X7, X8, Y0, Y10, Y12, Y14, Y17, Y19, Y3, Y6, Y9, Z0, Z10, Z12, Z14, Z17, Z19, Z3, Z6, Z9]
139 152 0.0 SV
145 146 2.0 R
147 148 2.0 R
149 150 2.0 R
142 150 0.0 SV
141 142 2.0 R
139 140 2.0 R
151 152 2.0 R
153 154 2.0 R
143 154 0.0 SV
143 144 2.0 R
A138 = 1.0
A139 = 2.0
A140 = 2.0
A141 = 2.0
A142 = 2.0
A143 = 2.0
A144 = 2.0
A145 = 2.0
A146 = 1.0
A147 = 1.0
A148 = 2.0
A149 = 2.0
A150 = 2.0
A151 = 2.0
A152 = 2.0
A153 = 2.0
A154 = 2.0
A155 = 1.0
B138 = 0.0
B139 = 0.0
B140 = 0.0
B141 = 0.0
B142 = 0.0
B143 = 0.0
B144 = 0.0
B145 = 0.0
B146 = 0.0
B147 = 0.0
B148 = 0.0
B149 = 0.0
B150 = 0.0
B151 = 0.0
B152 = 0.0
B153 = 0.0
B154 = 0.0
B155 = 0.0
T1 = 0.0
T16 = 0.0
T7 = 0.0
X1 = 0.0
X11 = 2.0
X13 = 2.0
X15 = 2.0
X16 = 0.0
X18 = 2.0
X2 = 2.0
X4 = 2.0
X5 = 2.0
X7 = 0.0
X8 = 2.0
Y0 = 0.0
Y10 = 0.0
Y12 = -1.0
Y14 = 0.0
Y17 = 0.0
Y19 = 0.0
Y3 = 0.0
Y6 = 0.0
Y9 = 0.0
Z0 = 0.0
Z10 = 0.0
Z12 = 1.0
Z14 = 0.0
Z17 = 0.0
Z19 = 0.0
Z3 = 0.0
Z6 = 0.0
Z9 = 0.0
40.0 Objective Answer
Y0 (157, 156, 2, 'S')
X1 (157, 158, 0, 'R')
X2 (157, 159, 0, 'SV')
Y3 (159, 158, 2, 'S')
X4 (159, 160, 0, 'R')
Y5 (161, 160, 2, 'S')
X6 (161, 169, 0, 'SV')
X7 (161, 162, 0, 'R')
Y8 (169, 168, 2, 'S')
X9 (169, 170, 0, 'R')
X10 (168, 170, 0, 'SV')
X11 (167, 168, 0, 'R')
Y12 (170, 171, 2, 'S')
X13 (166, 170, 0, 'SV')
X14 (165, 166, 0, 'R')
Y15 (167, 166, 2, 'S')
X16 (163, 165, 0, 'SV')
Y17 (164, 165, 1, 'S')
Y18 (162, 163, 2, 'S')
X19 (163, 164, 0, 'R')
A156 A156
B156 B156
A157 A157
B157 B157
A158 A158
B158 B158
A159 A159
B159 B159
A160 A160
B160 B160
A161 A161
B161 B161
A169 A169
B169 B169
A168 A168
B168 B168
A170 A170
B170 B170
A171 A171
B171 B171
A166 A166
B166 B166
A165 A165
B165 B165
A163 A163
B163 B163
A162 A162
B162 B162
A164 A164
B164 B164
A167 A167
B167 B167
obj -2*X1 - 2*X10 - 2*X11 - 2*X13 - 2*X14 - 2*X16 - 2*X19 - 2*X2 - 2*X4 - 2*X6 - 2*X7 - 2*X9 - 2*Y0 - 2*Y12 - 2*Y15 - 2*Y17 - 2*Y18 - 2*Y3 - 2*Y5 - 2*Y8 + 30
Sv_sum T10 + T13 + T16 + T2 + T6
CN_tune 8*Z0 + 28*Z12 + 12*Z17 + 4*Z3 + 6*Z5 + 4*Z8
obj B156 + B157 + B158 + B159 + B160 + B161 + B162 + B163 + B164 + B165 + B166 + B167 + B168 + B169 + B170 + B171 - 10*T10 - 10*T13 - 10*T16 - 10*T2 - 10*T6 - 20*X1 - 20*X10 - 20*X11 - 20*X13 - 20*X14 - 20*X16 - 20*X19 - 20*X2 - 20*X4 - 20*X6 - 20*X7 - 20*X9 - 20*Y0 - 20*Y12 - 20*Y15 - 20*Y17 - 20*Y18 - 20*Y3 - 20*Y5 - 20*Y8 + 88*Z0 + 308*Z12 + 132*Z17 + 44*Z3 + 66*Z5 + 44*Z8 + 300
Problem:
MINIMIZE
1*B156 + 1*B157 + 1*B158 + 1*B159 + 1*B160 + 1*B161 + 1*B162 + 1*B163 + 1*B164 + 1*B165 + 1*B166 + 1*B167 + 1*B168 + 1*B169 + 1*B170 + 1*B171 + -10*T10 + -10*T13 + -10*T16 + -10*T2 + -10*T6 + -20*X1 + -20*X10 + -20*X11 + -20*X13 + -20*X14 + -20*X16 + -20*X19 + -20*X2 + -20*X4 + -20*X6 + -20*X7 + -20*X9 + -20*Y0 + -20*Y12 + -20*Y15 + -20*Y17 + -20*Y18 + -20*Y3 + -20*Y5 + -20*Y8 + 88*Z0 + 308*Z12 + 132*Z17 + 44*Z3 + 66*Z5 + 44*Z8 + 300
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: - 10 T2 + X2 <= 0

_C6: - T2 + X2 >= 0

_C7: X2 >= 0

_C8: Y3 + Z3 >= 0

_C9: - Y3 + Z3 >= 0

_C10: Z3 <= 1

_C11: X4 >= 1

_C12: Y5 + Z5 >= 0

_C13: - Y5 + Z5 >= 0

_C14: Z5 <= 1

_C15: - 10 T6 + X6 <= 0

_C16: - T6 + X6 >= 0

_C17: X6 >= 0

_C18: X7 >= 1

_C19: Y8 + Z8 >= 0

_C20: - Y8 + Z8 >= 0

_C21: Z8 <= 1

_C22: X9 >= 1

_C23: - 10 T10 + X10 <= 0

_C24: - T10 + X10 >= 0

_C25: X10 >= 0

_C26: X11 >= 1

_C27: Y12 + Z12 >= 0

_C28: - Y12 + Z12 >= 0

_C29: Z12 <= 1

_C30: - 10 T13 + X13 <= 0

_C31: - T13 + X13 >= 0

_C32: X13 >= 0

_C33: X14 >= 1

_C34: Y15 + Z15 >= 0

_C35: - Y15 + Z15 >= 0

_C36: Z15 <= 1

_C37: - 10 T16 + X16 <= 0

_C38: - T16 + X16 >= 0

_C39: X16 >= 0

_C40: Y17 + Z17 >= 0

_C41: - Y17 + Z17 >= 0

_C42: Z17 <= 1

_C43: Y18 + Z18 >= 0

_C44: - Y18 + Z18 >= 0

_C45: Z18 <= 1

_C46: X19 >= 1

_C47: - 2 A156 - B156 - Y0 = -2

_C48: X1 + X2 + Y0 <= 2

_C49: - 2 A157 - B157 + X1 + X2 + Y0 = -2

_C50: X1 + Y3 <= 2

_C51: - 2 A158 - B158 + X1 + Y3 = -2

_C52: X2 + X4 + Y3 <= 2

_C53: - 2 A159 - B159 + X2 + X4 + Y3 = -2

_C54: X4 + Y5 <= 2

_C55: - 2 A160 - B160 + X4 + Y5 = -2

_C56: X6 + X7 + Y5 <= 2

_C57: - 2 A161 - B161 + X6 + X7 + Y5 = -2

_C58: X6 + X9 + Y8 <= 2

_C59: - 2 A169 - B169 + X6 + X9 + Y8 = -2

_C60: X10 + X11 + Y8 <= 2

_C61: - 2 A168 - B168 + X10 + X11 + Y8 = -2

_C62: X10 + X13 + X9 + Y12 <= 2

_C63: - 2 A170 - B170 + X10 + X13 + X9 + Y12 = -2

_C64: - 2 A171 - B171 - Y12 = -2

_C65: X13 + X14 + Y15 <= 2

_C66: - 2 A166 - B166 + X13 + X14 + Y15 = -2

_C67: X14 + X16 + Y17 <= 1

_C68: - 2 A165 - B165 + X14 + X16 + Y17 = -1

_C69: X16 + X19 + Y18 <= 2

_C70: - 2 A163 - B163 + X16 + X19 + Y18 = -2

_C71: X7 + Y18 <= 2

_C72: - 2 A162 - B162 + X7 + Y18 = -2

_C73: X19 + Y17 <= 1

_C74: - 2 A164 - B164 + X19 + Y17 = -1

_C75: X11 + Y15 <= 2

_C76: - 2 A167 - B167 + X11 + Y15 = -2

VARIABLES
0 <= A156 Integer
0 <= A157 Integer
0 <= A158 Integer
0 <= A159 Integer
0 <= A160 Integer
0 <= A161 Integer
0 <= A162 Integer
0 <= A163 Integer
0 <= A164 Integer
0 <= A165 Integer
0 <= A166 Integer
0 <= A167 Integer
0 <= A168 Integer
0 <= A169 Integer
0 <= A170 Integer
0 <= A171 Integer
0 <= B156 <= 1 Integer
0 <= B157 <= 1 Integer
0 <= B158 <= 1 Integer
0 <= B159 <= 1 Integer
0 <= B160 <= 1 Integer
0 <= B161 <= 1 Integer
0 <= B162 <= 1 Integer
0 <= B163 <= 1 Integer
0 <= B164 <= 1 Integer
0 <= B165 <= 1 Integer
0 <= B166 <= 1 Integer
0 <= B167 <= 1 Integer
0 <= B168 <= 1 Integer
0 <= B169 <= 1 Integer
0 <= B170 <= 1 Integer
0 <= B171 <= 1 Integer
0 <= T10 <= 1 Integer
0 <= T13 <= 1 Integer
0 <= T16 <= 1 Integer
0 <= T2 <= 1 Integer
0 <= T6 <= 1 Integer
0 <= X1 Integer
0 <= X10 Integer
0 <= X11 Integer
0 <= X13 Integer
0 <= X14 Integer
0 <= X16 Integer
0 <= X19 Integer
0 <= X2 Integer
0 <= X4 Integer
0 <= X6 Integer
0 <= X7 Integer
0 <= X9 Integer
Y0 free Integer
Y12 free Integer
Y15 free Integer
Y17 free Integer
Y18 free Integer
Y3 free Integer
Y5 free Integer
Y8 free Integer
Z0 free Integer
Z12 free Integer
Z15 free Integer
Z17 free Integer
Z18 free Integer
Z3 free Integer
Z5 free Integer
Z8 free Integer

Optimal
[A156, A157, A158, A159, A160, A161, A162, A163, A164, A165, A166, A167, A168, A169, A170, A171, B156, B157, B158, B159, B160, B161, B162, B163, B164, B165, B166, B167, B168, B169, B170, B171, T10, T13, T16, T2, T6, X1, X10, X11, X13, X14, X16, X19, X2, X4, X6, X7, X9, Y0, Y12, Y15, Y17, Y18, Y3, Y5, Y8, Z0, Z12, Z15, Z17, Z18, Z3, Z5, Z8]
157 158 2.0 R
168 170 1.0 SV
167 168 1.0 R
166 170 0.0 SV
165 166 1.0 R
163 165 0.0 SV
163 164 1.0 R
157 159 0.0 SV
159 160 2.0 R
161 169 1.0 SV
161 162 1.0 R
169 170 1.0 R
A156 = 1.0
A157 = 2.0
A158 = 2.0
A159 = 2.0
A160 = 2.0
A161 = 2.0
A162 = 2.0
A163 = 2.0
A164 = 1.0
A165 = 1.0
A166 = 2.0
A167 = 2.0
A168 = 2.0
A169 = 2.0
A170 = 2.0
A171 = 1.0
B156 = 0.0
B157 = 0.0
B158 = 0.0
B159 = 0.0
B160 = 0.0
B161 = 0.0
B162 = 0.0
B163 = 0.0
B164 = 0.0
B165 = 0.0
B166 = 0.0
B167 = 0.0
B168 = 0.0
B169 = 0.0
B170 = 0.0
B171 = 0.0
T10 = 1.0
T13 = 0.0
T16 = 0.0
T2 = 0.0
T6 = 1.0
X1 = 2.0
X10 = 1.0
X11 = 1.0
X13 = 0.0
X14 = 1.0
X16 = 0.0
X19 = 1.0
X2 = 0.0
X4 = 2.0
X6 = 1.0
X7 = 1.0
X9 = 1.0
Y0 = 0.0
Y12 = 0.0
Y15 = 1.0
Y17 = 0.0
Y18 = 1.0
Y3 = 0.0
Y5 = 0.0
Y8 = 0.0
Z0 = 0.0
Z12 = 0.0
Z15 = 1.0
Z17 = 0.0
Z18 = 1.0
Z3 = 0.0
Z5 = 0.0
Z8 = 0.0
20.0 Objective Answer
Y0 (172, 173, 1, 'S')
A172 A172
B172 B172
A173 A173
B173 B173
obj -2*Y0 + 2
Sv_sum 0
CN_tune 198*Z0
obj B172 + B173 - 20*Y0 + 2178*Z0 + 20
Problem:
MINIMIZE
1*B172 + 1*B173 + -20*Y0 + 2178*Z0 + 20
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: - 2 A172 - B172 - Y0 = -1

_C5: - 2 A173 - B173 - Y0 = -1

VARIABLES
0 <= A172 Integer
0 <= A173 Integer
0 <= B172 <= 1 Integer
0 <= B173 <= 1 Integer
Y0 free Integer
Z0 free Integer

Optimal
[A172, A173, B172, B173, Y0, Z0]
A172 = 0.0
A173 = 0.0
B172 = 1.0
B173 = 1.0
Y0 = 0.0
Z0 = 0.0
22.0 Objective Answer
Y0 (174, 175, 1, 'S')
X1 (175, 176, 0, 'R')
Y2 (176, 177, 0, 'S')
X3 (177, 178, 0, 'R')
Y4 (178, 179, 1, 'S')
A174 A174
B174 B174
A175 A175
B175 B175
A176 A176
B176 B176
A177 A177
B177 B177
A178 A178
B178 B178
A179 A179
B179 B179
obj -2*X1 - 2*X3 - 2*Y0 - 2*Y2 - 2*Y4 + 4
Sv_sum 0
CN_tune 36*Z0 + 12*Z2 + 54*Z4
obj B174 + B175 + B176 + B177 + B178 + B179 - 20*X1 - 20*X3 - 20*Y0 - 20*Y2 - 20*Y4 + 396*Z0 + 132*Z2 + 594*Z4 + 40
Problem:
MINIMIZE
1*B174 + 1*B175 + 1*B176 + 1*B177 + 1*B178 + 1*B179 + -20*X1 + -20*X3 + -20*Y0 + -20*Y2 + -20*Y4 + 396*Z0 + 132*Z2 + 594*Z4 + 40
SUBJECT TO
_C1: Y0 + Z0 >= 0

_C2: - Y0 + Z0 >= 0

_C3: Z0 <= 1

_C4: X1 >= 1

_C5: Y2 + Z2 >= 0

_C6: - Y2 + Z2 >= 0

_C7: Z2 <= 1

_C8: X3 >= 1

_C9: Y4 + Z4 >= 0

_C10: - Y4 + Z4 >= 0

_C11: Z4 <= 1

_C12: - 2 A174 - B174 - Y0 = -1

_C13: X1 + Y0 <= 1

_C14: - 2 A175 - B175 + X1 + Y0 = -1

_C15: X1 + Y2 <= 0

_C16: - 2 A176 - B176 + X1 + Y2 = 0

_C17: X3 + Y2 <= 0

_C18: - 2 A177 - B177 + X3 + Y2 = 0

_C19: X3 + Y4 <= 1

_C20: - 2 A178 - B178 + X3 + Y4 = -1

_C21: - 2 A179 - B179 - Y4 = -1

VARIABLES
0 <= A174 Integer
0 <= A175 Integer
0 <= A176 Integer
0 <= A177 Integer
0 <= A178 Integer
0 <= A179 Integer
0 <= B174 <= 1 Integer
0 <= B175 <= 1 Integer
0 <= B176 <= 1 Integer
0 <= B177 <= 1 Integer
0 <= B178 <= 1 Integer
0 <= B179 <= 1 Integer
0 <= X1 Integer
0 <= X3 Integer
Y0 free Integer
Y2 free Integer
Y4 free Integer
Z0 free Integer
Z2 free Integer
Z4 free Integer

Optimal
[A174, A175, A176, A177, A178, A179, B174, B175, B176, B177, B178, B179, X1, X3, Y0, Y2, Y4, Z0, Z2, Z4]
175 176 1.0 R
177 178 1.0 R
A174 = 0.0
A175 = 1.0
A176 = 0.0
A177 = 0.0
A178 = 1.0
A179 = 0.0
B174 = 1.0
B175 = 0.0
B176 = 0.0
B177 = 0.0
B178 = 0.0
B179 = 1.0
X1 = 1.0
X3 = 1.0
Y0 = 0.0
Y2 = -1.0
Y4 = 0.0
Z0 = 0.0
Z2 = 1.0
Z4 = 0.0
154.0 Objective Answer
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0x7f7ceb173ee0>, <scripts.objects.Vertices object at 0x7f7ceb173f10>, <scripts.objects.Vertices object at 0x7f7ceb173f40>, <scripts.objects.Vertices object at 0x7f7ceb173f70>, <scripts.objects.Vertices object at 0x7f7ceb173fa0>, <scripts.objects.Vertices object at 0x7f7ceb173fd0>, <scripts.objects.Vertices object at 0x7f7cde7fe040>, <scripts.objects.Vertices object at 0x7f7cde7fe070>, <scripts.objects.Vertices object at 0x7f7cde7fe0a0>, <scripts.objects.Vertices object at 0x7f7cde7fe0d0>, <scripts.objects.Vertices object at 0x7f7cde7fe100>, <scripts.objects.Vertices object at 0x7f7cde7fe130>, <scripts.objects.Vertices object at 0x7f7cde7fe160>, <scripts.objects.Vertices object at 0x7f7cde7fe190>, <scripts.objects.Vertices object at 0x7f7cde7fe1c0>, <scripts.objects.Vertices object at 0x7f7cde7fe1f0>, <scripts.objects.Vertices object at 0x7f7cde7fe220>, <scripts.objects.Vertices object at 0x7f7cde7fe250>, <scripts.objects.Vertices object at 0x7f7cde7fe280>, <scripts.objects.Vertices object at 0x7f7cde7fe2b0>, <scripts.objects.Vertices object at 0x7f7cde7fe2e0>, <scripts.objects.Vertices object at 0x7f7cde7fe310>, <scripts.objects.Vertices object at 0x7f7cde7fe340>, <scripts.objects.Vertices object at 0x7f7cde7fe370>, <scripts.objects.Vertices object at 0x7f7cde7fe3a0>, <scripts.objects.Vertices object at 0x7f7cde7fe3d0>, <scripts.objects.Vertices object at 0x7f7cde7fe400>, <scripts.objects.Vertices object at 0x7f7cde7fe430>, <scripts.objects.Vertices object at 0x7f7cde7fe460>, <scripts.objects.Vertices object at 0x7f7cde7fe490>, <scripts.objects.Vertices object at 0x7f7cde7fe4c0>, <scripts.objects.Vertices object at 0x7f7cde7fe4f0>, <scripts.objects.Vertices object at 0x7f7cde7fe520>, <scripts.objects.Vertices object at 0x7f7cde7fe550>, <scripts.objects.Vertices object at 0x7f7cde7fe580>, <scripts.objects.Vertices object at 0x7f7cde7fe5b0>, <scripts.objects.Vertices object at 0x7f7cde7fe5e0>, <scripts.objects.Vertices object at 0x7f7cde7fe610>, <scripts.objects.Vertices object at 0x7f7cde7fe640>, <scripts.objects.Vertices object at 0x7f7cde7fe670>, <scripts.objects.Vertices object at 0x7f7cde7fe6a0>, <scripts.objects.Vertices object at 0x7f7cde7fe6d0>, <scripts.objects.Vertices object at 0x7f7cde7fe700>, <scripts.objects.Vertices object at 0x7f7cde7fe730>, <scripts.objects.Vertices object at 0x7f7cde7fe760>, <scripts.objects.Vertices object at 0x7f7cde7fe790>, <scripts.objects.Vertices object at 0x7f7cde7fe7c0>, <scripts.objects.Vertices object at 0x7f7cde7fe7f0>, <scripts.objects.Vertices object at 0x7f7cde7fe820>, <scripts.objects.Vertices object at 0x7f7cde7fe850>, <scripts.objects.Vertices object at 0x7f7cde7fe880>, <scripts.objects.Vertices object at 0x7f7cde7fe8b0>, <scripts.objects.Vertices object at 0x7f7cde7fe8e0>, <scripts.objects.Vertices object at 0x7f7cde7fe910>, <scripts.objects.Vertices object at 0x7f7cde7fe940>, <scripts.objects.Vertices object at 0x7f7cde7fe970>, <scripts.objects.Vertices object at 0x7f7cde7fe9a0>, <scripts.objects.Vertices object at 0x7f7cde7fe9d0>, <scripts.objects.Vertices object at 0x7f7cde7fea00>, <scripts.objects.Vertices object at 0x7f7cde7fea30>, <scripts.objects.Vertices object at 0x7f7cde7fea60>, <scripts.objects.Vertices object at 0x7f7cde7fea90>, <scripts.objects.Vertices object at 0x7f7cde7feac0>, <scripts.objects.Vertices object at 0x7f7cde7feaf0>, <scripts.objects.Vertices object at 0x7f7cde7feb20>, <scripts.objects.Vertices object at 0x7f7cde7feb50>, <scripts.objects.Vertices object at 0x7f7cde7feb80>, <scripts.objects.Vertices object at 0x7f7cde7febb0>, <scripts.objects.Vertices object at 0x7f7cde7febe0>, <scripts.objects.Vertices object at 0x7f7cde7fec10>, <scripts.objects.Vertices object at 0x7f7cde7fec40>, <scripts.objects.Vertices object at 0x7f7cde7fec70>, <scripts.objects.Vertices object at 0x7f7cde7feca0>, <scripts.objects.Vertices object at 0x7f7cde7fecd0>, <scripts.objects.Vertices object at 0x7f7cde7fed00>, <scripts.objects.Vertices object at 0x7f7cde7fed30>, <scripts.objects.Vertices object at 0x7f7cde7fed60>, <scripts.objects.Vertices object at 0x7f7cde7fed90>, <scripts.objects.Vertices object at 0x7f7cde7fedc0>, <scripts.objects.Vertices object at 0x7f7cde7fedf0>, <scripts.objects.Vertices object at 0x7f7cde7fee20>, <scripts.objects.Vertices object at 0x7f7cde7fee50>, <scripts.objects.Vertices object at 0x7f7cde7fee80>, <scripts.objects.Vertices object at 0x7f7cde7feeb0>, <scripts.objects.Vertices object at 0x7f7cde7feee0>, <scripts.objects.Vertices object at 0x7f7cde7fef10>, <scripts.objects.Vertices object at 0x7f7cde7fef40>, <scripts.objects.Vertices object at 0x7f7cde7fef70>, <scripts.objects.Vertices object at 0x7f7cde7fefa0>, <scripts.objects.Vertices object at 0x7f7cde7fefd0>, <scripts.objects.Vertices object at 0x7f7cde804040>, <scripts.objects.Vertices object at 0x7f7cde804070>, <scripts.objects.Vertices object at 0x7f7cde8040a0>, <scripts.objects.Vertices object at 0x7f7cde8040d0>, <scripts.objects.Vertices object at 0x7f7cde804100>, <scripts.objects.Vertices object at 0x7f7cde804130>, <scripts.objects.Vertices object at 0x7f7cde804160>, <scripts.objects.Vertices object at 0x7f7cde804190>, <scripts.objects.Vertices object at 0x7f7cde8041c0>, <scripts.objects.Vertices object at 0x7f7cde8041f0>, <scripts.objects.Vertices object at 0x7f7cde804220>, <scripts.objects.Vertices object at 0x7f7cde804250>, <scripts.objects.Vertices object at 0x7f7cde804280>, <scripts.objects.Vertices object at 0x7f7cde8042b0>, <scripts.objects.Vertices object at 0x7f7cde8042e0>, <scripts.objects.Vertices object at 0x7f7cde804310>, <scripts.objects.Vertices object at 0x7f7cde804340>, <scripts.objects.Vertices object at 0x7f7cde804370>, <scripts.objects.Vertices object at 0x7f7cde8043a0>, <scripts.objects.Vertices object at 0x7f7cde8043d0>, <scripts.objects.Vertices object at 0x7f7cde804400>, <scripts.objects.Vertices object at 0x7f7cde804430>, <scripts.objects.Vertices object at 0x7f7cde804460>, <scripts.objects.Vertices object at 0x7f7cde804490>, <scripts.objects.Vertices object at 0x7f7cde8044c0>, <scripts.objects.Vertices object at 0x7f7cde8044f0>, <scripts.objects.Vertices object at 0x7f7cde804520>, <scripts.objects.Vertices object at 0x7f7cde804550>, <scripts.objects.Vertices object at 0x7f7cde804580>, <scripts.objects.Vertices object at 0x7f7cde8045b0>, <scripts.objects.Vertices object at 0x7f7cde8045e0>, <scripts.objects.Vertices object at 0x7f7cde804610>, <scripts.objects.Vertices object at 0x7f7cde804640>, <scripts.objects.Vertices object at 0x7f7cde804670>, <scripts.objects.Vertices object at 0x7f7cde8046a0>, <scripts.objects.Vertices object at 0x7f7cde8046d0>, <scripts.objects.Vertices object at 0x7f7cde804700>, <scripts.objects.Vertices object at 0x7f7cde804730>, <scripts.objects.Vertices object at 0x7f7cde804760>, <scripts.objects.Vertices object at 0x7f7cde804790>, <scripts.objects.Vertices object at 0x7f7cde8047c0>, <scripts.objects.Vertices object at 0x7f7cde8047f0>, <scripts.objects.Vertices object at 0x7f7cde804820>, <scripts.objects.Vertices object at 0x7f7cde804850>, <scripts.objects.Vertices object at 0x7f7cde804880>, <scripts.objects.Vertices object at 0x7f7cde8048b0>, <scripts.objects.Vertices object at 0x7f7cde8048e0>, <scripts.objects.Vertices object at 0x7f7cde804910>, <scripts.objects.Vertices object at 0x7f7cde804940>, <scripts.objects.Vertices object at 0x7f7cde804970>, <scripts.objects.Vertices object at 0x7f7cde8049a0>, <scripts.objects.Vertices object at 0x7f7cde8049d0>, <scripts.objects.Vertices object at 0x7f7cde804a00>, <scripts.objects.Vertices object at 0x7f7cde804a30>, <scripts.objects.Vertices object at 0x7f7cde804a60>, <scripts.objects.Vertices object at 0x7f7cde804a90>, <scripts.objects.Vertices object at 0x7f7cde804ac0>, <scripts.objects.Vertices object at 0x7f7cde804af0>, <scripts.objects.Vertices object at 0x7f7cde804b20>, <scripts.objects.Vertices object at 0x7f7cde804b50>, <scripts.objects.Vertices object at 0x7f7cde804b80>, <scripts.objects.Vertices object at 0x7f7cde804bb0>, <scripts.objects.Vertices object at 0x7f7cde804be0>, <scripts.objects.Vertices object at 0x7f7cde804c10>, <scripts.objects.Vertices object at 0x7f7cde804c40>, <scripts.objects.Vertices object at 0x7f7cde804c70>, <scripts.objects.Vertices object at 0x7f7cde804ca0>, <scripts.objects.Vertices object at 0x7f7cde804cd0>, <scripts.objects.Vertices object at 0x7f7cde804d00>, <scripts.objects.Vertices object at 0x7f7cde804d30>, <scripts.objects.Vertices object at 0x7f7cde804d60>, <scripts.objects.Vertices object at 0x7f7cde804d90>]
[0, 1]
[(0, 1, 2, 'S')]
Component [0, 1]
Component edges [(0, 1, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[0, 1]
paths_score 0 [[0, 1], [1, 0]]
paths_score 0 [[1, 0], [0, 1]]
all edges with dummy:  [(0, 1, 2, 'S')]
0 1 0 2 H [1]
1 1 248943333 2 T [0]
Answer [0, 1, 0]
[2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 75, 74, 73, 72, 71, 70, 76, 77, 12, 13]
[(2, 3, 2, 'S'), (3, 4, 2, 'R'), (4, 5, 2, 'S'), (5, 6, 2, 'R'), (6, 7, 2, 'S'), (7, 8, 2, 'R'), (8, 9, 3, 'S'), (9, 10, 2, 'R'), (11, 10, 2, 'S'), (11, 75, 1, 'SV'), (11, 12, 1, 'R'), (75, 74, 2, 'S'), (75, 76, 1, 'R'), (73, 74, 2, 'R'), (73, 72, 2, 'S'), (71, 72, 2, 'R'), (71, 70, 2, 'S'), (76, 77, 2, 'S'), (12, 13, 2, 'S')]
Component [2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 75, 74, 73, 72, 71, 70, 76, 77, 12, 13]
Component edges [(2, 3, 2, 'S'), (3, 4, 2, 'R'), (4, 5, 2, 'S'), (5, 6, 2, 'R'), (6, 7, 2, 'S'), (7, 8, 2, 'R'), (8, 9, 3, 'S'), (9, 10, 2, 'R'), (11, 10, 2, 'S'), (11, 75, 1, 'SV'), (11, 12, 1, 'R'), (75, 74, 2, 'S'), (75, 76, 1, 'R'), (73, 74, 2, 'R'), (73, 72, 2, 'S'), (71, 72, 2, 'R'), (71, 70, 2, 'S'), (76, 77, 2, 'S'), (12, 13, 2, 'S')]
RESIDUE vertices [(8, 1), (9, 1), (76, 1), (12, 1)]
RV not paired: {('2', 'H'): 2, ('2', 'T'): 1, ('14', 'H'): 1}
RESIDUE vertices (before self-edge):  [(8, 1), (9, 1), (76, 1), (12, 1)]
RESIDUE vertices (after self-edge):  [(8, 1), (9, 1), (76, 1), (12, 1)]
ODD vertices [8, 76]
[2, 13, 70, 77]
paths_score 20 [[2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13], [13, 12, 9, 8, 76, 77], [77, 76, 75, 74, 73, 72, 71, 70], [70, 71, 72, 73, 74, 75, 11, 10, 9, 8, 7, 6, 5, 4, 3, 2]]
paths_score 20 [[13, 12, 11, 10, 9, 8, 7, 6, 5, 4, 3, 2], [2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 75, 74, 73, 72, 71, 70], [70, 71, 72, 73, 74, 75, 76, 77], [77, 76, 8, 9, 12, 13]]
paths_score 20 [[70, 71, 72, 73, 74, 75, 76, 77], [77, 76, 8, 9, 10, 11, 12, 13], [13, 12, 9, 8, 7, 6, 5, 4, 3, 2], [2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 75, 74, 73, 72, 71, 70]]
paths_score 20 [[77, 76, 75, 74, 73, 72, 71, 70], [70, 71, 72, 73, 74, 75, 11, 10, 9, 8, 7, 6, 5, 4, 3, 2], [2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13], [13, 12, 9, 8, 76, 77]]
all edges with dummy:  [(2, 3, 2, 'S'), (3, 4, 2, 'R'), (4, 5, 2, 'S'), (5, 6, 2, 'R'), (6, 7, 2, 'S'), (7, 8, 2, 'R'), (8, 9, 3, 'S'), (9, 10, 2, 'R'), (11, 10, 2, 'S'), (11, 75, 1, 'SV'), (11, 12, 1, 'R'), (75, 74, 2, 'S'), (75, 76, 1, 'R'), (73, 74, 2, 'R'), (73, 72, 2, 'S'), (71, 72, 2, 'R'), (71, 70, 2, 'S'), (76, 77, 2, 'S'), (12, 13, 2, 'S'), (9, 12, 1, 'D'), (8, 76, 1, 'D')]
2 2 15925 2 H [3]
3 2 91434681.0 2 T [2, 4]
4 2 91434682.0 2 H [3, 5]
5 2 92093328.0 2 T [4, 6]
6 2 92093329 2 H [5, 7]
7 2 178043169.0 2 T [8, 6]
8 2 178043170.0 3 H [9, 76, 7]
9 2 221204993.0 3 T [8, 10, 12]
10 2 221204994 2 H [9, 11]
11 2 221284178.0 2 T [10, 75, 12]
75 14 105159387.0 2 T [74, 11, 76]
74 14 19620471.0 2 H [73, 75]
73 14 19620470.0 2 T [72, 74]
72 14 18898945.0 2 H [73, 71]
71 14 18898944.0 2 T [72, 70]
70 14 0 2 H [71]
76 14 105159388.0 2 H [8, 75, 77]
77 14 106873282 2 T [76]
12 2 221284179.0 2 H [9, 11, 13]
13 2 242181356 2 T [12]
Answer [2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 12, 9, 8, 76, 77, 76, 75, 74, 73, 72, 71, 70, 71, 72, 73, 74, 75, 11, 10, 9, 8, 7, 6, 5, 4, 3, 2]
[14, 15]
[(14, 15, 2, 'S')]
Component [14, 15]
Component edges [(14, 15, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[14, 15]
paths_score 0 [[14, 15], [15, 14]]
paths_score 0 [[15, 14], [14, 15]]
all edges with dummy:  [(14, 15, 2, 'S')]
14 3 0 2 H [15]
15 3 198230596 2 T [14]
Answer [14, 15, 14]
[16, 17]
[(16, 17, 2, 'S')]
Component [16, 17]
Component edges [(16, 17, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[16, 17]
paths_score 0 [[16, 17], [17, 16]]
paths_score 0 [[17, 16], [16, 17]]
all edges with dummy:  [(16, 17, 2, 'S')]
16 4 0 2 H [17]
17 4 190202564 2 T [16]
Answer [16, 17, 16]
[18, 19, 20, 21, 22, 23]
[(18, 19, 2, 'S'), (19, 20, 2, 'R'), (20, 21, 2, 'S'), (21, 22, 2, 'R'), (22, 23, 2, 'S')]
Component [18, 19, 20, 21, 22, 23]
Component edges [(18, 19, 2, 'S'), (19, 20, 2, 'R'), (20, 21, 2, 'S'), (21, 22, 2, 'R'), (22, 23, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[18, 23]
paths_score 0 [[18, 19, 20, 21, 22, 23], [23, 22, 21, 20, 19, 18]]
paths_score 0 [[23, 22, 21, 20, 19, 18], [18, 19, 20, 21, 22, 23]]
all edges with dummy:  [(18, 19, 2, 'S'), (19, 20, 2, 'R'), (20, 21, 2, 'S'), (21, 22, 2, 'R'), (22, 23, 2, 'S')]
18 5 19315 2 H [19]
19 5 207673.2 2 T [18, 20]
20 5 207674.2 1 H [19, 21]
21 5 216966.8 1 T [20, 22]
22 5 216967.8 2 H [21, 23]
23 5 181472713 2 T [22]
Answer [18, 19, 20, 21, 22, 23, 22, 21, 20, 19, 18]
[24, 25]
[(24, 25, 2, 'S')]
Component [24, 25]
Component edges [(24, 25, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[24, 25]
paths_score 0 [[24, 25], [25, 24]]
paths_score 0 [[25, 24], [24, 25]]
all edges with dummy:  [(24, 25, 2, 'S')]
24 6 0 2 H [25]
25 6 170739897 2 T [24]
Answer [24, 25, 24]
[26, 27]
[(26, 27, 2, 'S')]
Component [26, 27]
Component edges [(26, 27, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[26, 27]
paths_score 0 [[26, 27], [27, 26]]
paths_score 0 [[27, 26], [26, 27]]
all edges with dummy:  [(26, 27, 2, 'S')]
26 7 0 2 H [27]
27 7 159334984 2 T [26]
Answer [26, 27, 26]
[28, 29, 30, 31, 32, 33]
[(29, 28, 2, 'S'), (29, 30, 2, 'R'), (31, 30, 2, 'S'), (31, 32, 2, 'R'), (32, 33, 2, 'S')]
Component [28, 29, 30, 31, 32, 33]
Component edges [(29, 28, 2, 'S'), (29, 30, 2, 'R'), (31, 30, 2, 'S'), (31, 32, 2, 'R'), (32, 33, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[28, 33]
paths_score 0 [[28, 29, 30, 31, 32, 33], [33, 32, 31, 30, 29, 28]]
paths_score 0 [[33, 32, 31, 30, 29, 28], [28, 29, 30, 31, 32, 33]]
all edges with dummy:  [(29, 28, 2, 'S'), (29, 30, 2, 'R'), (31, 30, 2, 'S'), (31, 32, 2, 'R'), (32, 33, 2, 'S')]
28 8 0 2 H [29]
29 8 7938217.0 2 T [28, 30]
30 8 7938218.0 2 H [29, 31]
31 8 12402837.5 2 T [32, 30]
32 8 12402838.5 2 H [33, 31]
33 8 145076125 2 T [32]
Answer [28, 29, 30, 31, 32, 33, 32, 31, 30, 29, 28]
[34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49]
[(35, 34, 2, 'S'), (35, 36, 2, 'R'), (37, 36, 2, 'S'), (37, 38, 2, 'R'), (39, 38, 2, 'S'), (39, 40, 2, 'R'), (41, 40, 2, 'S'), (41, 42, 2, 'R'), (43, 42, 2, 'S'), (43, 44, 2, 'R'), (45, 44, 2, 'S'), (45, 46, 2, 'R'), (47, 46, 2, 'S'), (47, 48, 2, 'R'), (48, 49, 2, 'S')]
Component [34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49]
Component edges [(35, 34, 2, 'S'), (35, 36, 2, 'R'), (37, 36, 2, 'S'), (37, 38, 2, 'R'), (39, 38, 2, 'S'), (39, 40, 2, 'R'), (41, 40, 2, 'S'), (41, 42, 2, 'R'), (43, 42, 2, 'S'), (43, 44, 2, 'R'), (45, 44, 2, 'S'), (45, 46, 2, 'R'), (47, 46, 2, 'S'), (47, 48, 2, 'R'), (48, 49, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[34, 49]
paths_score 0 [[34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49], [49, 48, 47, 46, 45, 44, 43, 42, 41, 40, 39, 38, 37, 36, 35, 34]]
paths_score 0 [[49, 48, 47, 46, 45, 44, 43, 42, 41, 40, 39, 38, 37, 36, 35, 34], [34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49]]
all edges with dummy:  [(35, 34, 2, 'S'), (35, 36, 2, 'R'), (37, 36, 2, 'S'), (37, 38, 2, 'R'), (39, 38, 2, 'S'), (39, 40, 2, 'R'), (41, 40, 2, 'S'), (41, 42, 2, 'R'), (43, 42, 2, 'S'), (43, 44, 2, 'R'), (45, 44, 2, 'S'), (45, 46, 2, 'R'), (47, 46, 2, 'S'), (47, 48, 2, 'R'), (48, 49, 2, 'S')]
34 9 0 2 H [35]
35 9 39822667.0 2 T [34, 36]
36 9 39822668.0 2 H [35, 37]
37 9 41293385.0 2 T [36, 38]
38 9 41293386.0 2 H [37, 39]
39 9 61850024.0 2 T [40, 38]
40 9 61850025.0 2 H [41, 39]
41 9 62801168.0 2 T [40, 42]
42 9 62801169.0 2 H [41, 43]
43 9 62935061.0 2 T [42, 44]
44 9 62935062.0 2 H [43, 45]
45 9 65399230.0 2 T [44, 46]
46 9 65399231.0 2 H [45, 47]
47 9 65657315.0 2 T [48, 46]
48 9 65657316.0 2 H [49, 47]
49 9 138334464 2 T [48]
Answer [34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 48, 47, 46, 45, 44, 43, 42, 41, 40, 39, 38, 37, 36, 35, 34]
[50, 51, 52, 53, 54, 55, 56, 57, 58, 59]
[(50, 51, 2, 'S'), (51, 52, 2, 'R'), (52, 53, 2, 'S'), (53, 54, 2, 'R'), (55, 54, 2, 'S'), (55, 56, 2, 'R'), (57, 56, 2, 'S'), (57, 58, 2, 'R'), (58, 59, 2, 'S')]
Component [50, 51, 52, 53, 54, 55, 56, 57, 58, 59]
Component edges [(50, 51, 2, 'S'), (51, 52, 2, 'R'), (52, 53, 2, 'S'), (53, 54, 2, 'R'), (55, 54, 2, 'S'), (55, 56, 2, 'R'), (57, 56, 2, 'S'), (57, 58, 2, 'R'), (58, 59, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[50, 59]
paths_score 0 [[50, 51, 52, 53, 54, 55, 56, 57, 58, 59], [59, 58, 57, 56, 55, 54, 53, 52, 51, 50]]
paths_score 0 [[59, 58, 57, 56, 55, 54, 53, 52, 51, 50], [50, 51, 52, 53, 54, 55, 56, 57, 58, 59]]
all edges with dummy:  [(50, 51, 2, 'S'), (51, 52, 2, 'R'), (52, 53, 2, 'S'), (53, 54, 2, 'R'), (55, 54, 2, 'S'), (55, 56, 2, 'R'), (57, 56, 2, 'S'), (57, 58, 2, 'R'), (58, 59, 2, 'S')]
50 10 18515 2 H [51]
51 10 39180378.0 2 T [50, 52]
52 10 39180379.0 1 H [51, 53]
53 10 39201729.0 1 T [52, 54]
54 10 39201730 2 H [53, 55]
55 10 45888983.0 2 T [56, 54]
56 10 45888984.0 2 H [57, 55]
57 10 49960781.0 2 T [56, 58]
58 10 49960782.0 2 H [57, 59]
59 10 133785265 2 T [58]
Answer [50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 58, 57, 56, 55, 54, 53, 52, 51, 50]
[60, 61]
[(60, 61, 2, 'S')]
Component [60, 61]
Component edges [(60, 61, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[60, 61]
paths_score 0 [[60, 61], [61, 60]]
paths_score 0 [[61, 60], [60, 61]]
all edges with dummy:  [(60, 61, 2, 'S')]
60 11 0 2 H [61]
61 11 135069565 2 T [60]
Answer [60, 61, 60]
[62, 63, 64, 65, 66, 67]
[(62, 63, 2, 'S'), (63, 64, 1, 'R'), (64, 65, 1, 'S'), (65, 66, 1, 'R'), (66, 67, 2, 'S')]
Component [62, 63, 64, 65, 66, 67]
Component edges [(62, 63, 2, 'S'), (63, 64, 1, 'R'), (64, 65, 1, 'S'), (65, 66, 1, 'R'), (66, 67, 2, 'S')]
RESIDUE vertices [(63, 1), (66, 1)]
RV paired: {('12', 'T'): 1, ('12', 'H'): 1}
RESIDUE vertices (before self-edge):  [(63, 1), (66, 1)]
RESIDUE vertices (after self-edge):  [(63, 1), (66, 1)]
ODD vertices []
[62, 67]
paths_score 0 [[62, 63, 64, 65, 66, 67], [67, 66, 63, 62]]
paths_score 0 [[67, 66, 65, 64, 63, 62], [62, 63, 66, 67]]
all edges with dummy:  [(62, 63, 2, 'S'), (63, 64, 1, 'R'), (64, 65, 1, 'S'), (65, 66, 1, 'R'), (66, 67, 2, 'S'), (63, 66, 1, 'D')]
62 12 14569 2 H [63]
63 12 9476200.5 2 T [64, 66, 62]
64 12 9476201.5 1 H [65, 63]
65 12 9580571.0 1 T [64, 66]
66 12 9580572 2 H [65, 67, 63]
67 12 133263959 2 T [66]
Answer [62, 63, 64, 65, 66, 67, 66, 63, 62]
[68, 69]
[(68, 69, 2, 'S')]
Component [68, 69]
Component edges [(68, 69, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[68, 69]
paths_score 0 [[68, 69], [69, 68]]
paths_score 0 [[69, 68], [68, 69]]
all edges with dummy:  [(68, 69, 2, 'S')]
68 13 0 2 H [69]
69 13 114352102 2 T [68]
Answer [68, 69, 68]
[78, 79, 80, 81, 82, 83, 84, 85, 86, 87, 88, 89, 90, 91]
[(79, 78, 2, 'S'), (79, 80, 2, 'R'), (81, 80, 2, 'S'), (81, 82, 2, 'R'), (83, 82, 2, 'S'), (83, 84, 2, 'R'), (85, 84, 2, 'S'), (85, 86, 2, 'R'), (87, 86, 2, 'S'), (87, 88, 2, 'R'), (89, 88, 2, 'S'), (89, 90, 2, 'R'), (90, 91, 2, 'S')]
Component [78, 79, 80, 81, 82, 83, 84, 85, 86, 87, 88, 89, 90, 91]
Component edges [(79, 78, 2, 'S'), (79, 80, 2, 'R'), (81, 80, 2, 'S'), (81, 82, 2, 'R'), (83, 82, 2, 'S'), (83, 84, 2, 'R'), (85, 84, 2, 'S'), (85, 86, 2, 'R'), (87, 86, 2, 'S'), (87, 88, 2, 'R'), (89, 88, 2, 'S'), (89, 90, 2, 'R'), (90, 91, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[78, 91]
paths_score 0 [[78, 79, 80, 81, 82, 83, 84, 85, 86, 87, 88, 89, 90, 91], [91, 90, 89, 88, 87, 86, 85, 84, 83, 82, 81, 80, 79, 78]]
paths_score 0 [[91, 90, 89, 88, 87, 86, 85, 84, 83, 82, 81, 80, 79, 78], [78, 79, 80, 81, 82, 83, 84, 85, 86, 87, 88, 89, 90, 91]]
all edges with dummy:  [(79, 78, 2, 'S'), (79, 80, 2, 'R'), (81, 80, 2, 'S'), (81, 82, 2, 'R'), (83, 82, 2, 'S'), (83, 84, 2, 'R'), (85, 84, 2, 'S'), (85, 86, 2, 'R'), (87, 86, 2, 'S'), (87, 88, 2, 'R'), (89, 88, 2, 'S'), (89, 90, 2, 'R'), (90, 91, 2, 'S')]
78 15 0 2 H [79]
79 15 20425822.0 2 T [80, 78]
80 15 20425823.0 2 H [81, 79]
81 15 20994245.25 2 T [80, 82]
82 15 20994246.25 2 H [81, 83]
83 15 23220838.0 2 T [82, 84]
84 15 23220839.0 2 H [83, 85]
85 15 28424089.5 2 T [84, 86]
86 15 28424090.5 2 H [85, 87]
87 15 30531668.0 2 T [88, 86]
88 15 30531669.0 2 H [89, 87]
89 15 32595449.0 2 T [88, 90]
90 15 32595450.0 2 H [89, 91]
91 15 101976509 2 T [90]
Answer [78, 79, 80, 81, 82, 83, 84, 85, 86, 87, 88, 89, 90, 91, 90, 89, 88, 87, 86, 85, 84, 83, 82, 81, 80, 79, 78]
[92, 93, 94, 95, 96, 97, 98, 99, 100, 101, 102, 103, 104, 105, 106, 107, 108, 109, 110, 111, 112, 113, 114, 115, 116, 117]
[(92, 93, 2, 'S'), (93, 94, 2, 'R'), (94, 95, 2, 'S'), (95, 96, 2, 'R'), (97, 96, 2, 'S'), (97, 98, 2, 'R'), (99, 98, 2, 'S'), (99, 100, 2, 'R'), (101, 100, 2, 'S'), (101, 102, 2, 'R'), (103, 102, 2, 'S'), (103, 104, 2, 'R'), (105, 104, 2, 'S'), (105, 106, 2, 'R'), (107, 106, 2, 'S'), (107, 108, 2, 'R'), (108, 109, 2, 'S'), (109, 110, 2, 'R'), (111, 110, 3, 'S'), (111, 112, 3, 'R'), (112, 113, 3, 'S'), (113, 114, 2, 'R'), (115, 114, 2, 'S'), (115, 116, 2, 'R'), (116, 117, 2, 'S')]
Component [92, 93, 94, 95, 96, 97, 98, 99, 100, 101, 102, 103, 104, 105, 106, 107, 108, 109, 110, 111, 112, 113, 114, 115, 116, 117]
Component edges [(92, 93, 2, 'S'), (93, 94, 2, 'R'), (94, 95, 2, 'S'), (95, 96, 2, 'R'), (97, 96, 2, 'S'), (97, 98, 2, 'R'), (99, 98, 2, 'S'), (99, 100, 2, 'R'), (101, 100, 2, 'S'), (101, 102, 2, 'R'), (103, 102, 2, 'S'), (103, 104, 2, 'R'), (105, 104, 2, 'S'), (105, 106, 2, 'R'), (107, 106, 2, 'S'), (107, 108, 2, 'R'), (108, 109, 2, 'S'), (109, 110, 2, 'R'), (111, 110, 3, 'S'), (111, 112, 3, 'R'), (112, 113, 3, 'S'), (113, 114, 2, 'R'), (115, 114, 2, 'S'), (115, 116, 2, 'R'), (116, 117, 2, 'S')]
RESIDUE vertices [(110, 1), (113, 1)]
RV paired: {('16', 'H'): 1, ('16', 'T'): 1}
RESIDUE vertices (before self-edge):  [(110, 1), (113, 1)]
RESIDUE vertices (after self-edge):  [(110, 1), (113, 1)]
ODD vertices []
[92, 117]
paths_score 0 [[92, 93, 94, 95, 96, 97, 98, 99, 100, 101, 102, 103, 104, 105, 106, 107, 108, 109, 110, 111, 112, 113, 114, 115, 116, 117], [117, 116, 115, 114, 113, 112, 111, 110, 113, 112, 111, 110, 109, 108, 107, 106, 105, 104, 103, 102, 101, 100, 99, 98, 97, 96, 95, 94, 93, 92]]
paths_score 0 [[117, 116, 115, 114, 113, 112, 111, 110, 109, 108, 107, 106, 105, 104, 103, 102, 101, 100, 99, 98, 97, 96, 95, 94, 93, 92], [92, 93, 94, 95, 96, 97, 98, 99, 100, 101, 102, 103, 104, 105, 106, 107, 108, 109, 110, 111, 112, 113, 110, 111, 112, 113, 114, 115, 116, 117]]
all edges with dummy:  [(92, 93, 2, 'S'), (93, 94, 2, 'R'), (94, 95, 2, 'S'), (95, 96, 2, 'R'), (97, 96, 2, 'S'), (97, 98, 2, 'R'), (99, 98, 2, 'S'), (99, 100, 2, 'R'), (101, 100, 2, 'S'), (101, 102, 2, 'R'), (103, 102, 2, 'S'), (103, 104, 2, 'R'), (105, 104, 2, 'S'), (105, 106, 2, 'R'), (107, 106, 2, 'S'), (107, 108, 2, 'R'), (108, 109, 2, 'S'), (109, 110, 2, 'R'), (111, 110, 3, 'S'), (111, 112, 3, 'R'), (112, 113, 3, 'S'), (113, 114, 2, 'R'), (115, 114, 2, 'S'), (115, 116, 2, 'R'), (116, 117, 2, 'S'), (110, 113, 1, 'D')]
92 16 14135 2 H [93]
93 16 185279.0 2 T [92, 94]
94 16 185280.0 1 H [93, 95]
95 16 196388.5 1 T [96, 94]
96 16 196389.5 2 H [97, 95]
97 16 14806491.0 2 T [96, 98]
98 16 14806492.0 2 H [97, 99]
99 16 14905245.0 2 T [98, 100]
100 16 14905246.0 2 H [99, 101]
101 16 15322465.0 2 T [100, 102]
102 16 15322466.0 2 H [101, 103]
103 16 18490832.0 2 T [104, 102]
104 16 18490833.0 2 H [105, 103]
105 16 21557960.0 2 T [104, 106]
106 16 21557961.0 2 H [105, 107]
107 16 22690602.0 2 T [106, 108]
108 16 22690603.0 2 H [107, 109]
109 16 32264686.0 2 T [108, 110]
110 16 32264687.0 3 H [113, 109, 111]
111 16 32324883.0 3 T [112, 110]
112 16 32324884.0 3 H [113, 111]
113 16 32964090.0 3 T [112, 114, 110]
114 16 32964091 2 H [113, 115]
115 16 33499296.0 2 T [114, 116]
116 16 33499297.0 2 H [115, 117]
117 16 90224750 2 T [116]
Answer [92, 93, 94, 95, 96, 97, 98, 99, 100, 101, 102, 103, 104, 105, 106, 107, 108, 109, 110, 111, 112, 113, 114, 115, 116, 117, 116, 115, 114, 113, 112, 111, 110, 113, 112, 111, 110, 109, 108, 107, 106, 105, 104, 103, 102, 101, 100, 99, 98, 97, 96, 95, 94, 93, 92]
[118, 119, 120, 121, 122, 123]
[(118, 119, 2, 'S'), (119, 120, 1, 'R'), (120, 121, 1, 'S'), (121, 122, 1, 'R'), (122, 123, 2, 'S')]
Component [118, 119, 120, 121, 122, 123]
Component edges [(118, 119, 2, 'S'), (119, 120, 1, 'R'), (120, 121, 1, 'S'), (121, 122, 1, 'R'), (122, 123, 2, 'S')]
RESIDUE vertices [(119, 1), (122, 1)]
RV paired: {('17', 'T'): 1, ('17', 'H'): 1}
RESIDUE vertices (before self-edge):  [(119, 1), (122, 1)]
RESIDUE vertices (after self-edge):  [(119, 1), (122, 1)]
ODD vertices []
[118, 123]
paths_score 0 [[118, 119, 120, 121, 122, 123], [123, 122, 119, 118]]
paths_score 0 [[123, 122, 121, 120, 119, 118], [118, 119, 122, 123]]
all edges with dummy:  [(118, 119, 2, 'S'), (119, 120, 1, 'R'), (120, 121, 1, 'S'), (121, 122, 1, 'R'), (122, 123, 2, 'S'), (119, 122, 1, 'D')]
118 17 66654 2 H [119]
119 17 46284335.0 2 T [120, 122, 118]
120 17 46284336.0 0 H [121, 119]
121 17 46702870.0 0 T [120, 122]
122 17 46702871 2 H [121, 123, 119]
123 17 83246391 2 T [122]
Answer [118, 119, 120, 121, 122, 123, 122, 119, 118]
[124, 125]
[(124, 125, 2, 'S')]
Component [124, 125]
Component edges [(124, 125, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[124, 125]
paths_score 0 [[124, 125], [125, 124]]
paths_score 0 [[125, 124], [124, 125]]
all edges with dummy:  [(124, 125, 2, 'S')]
124 18 0 2 H [125]
125 18 80256374 2 T [124]
Answer [124, 125, 124]
[126, 127]
[(126, 127, 2, 'S')]
Component [126, 127]
Component edges [(126, 127, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[126, 127]
paths_score 0 [[126, 127], [127, 126]]
paths_score 0 [[127, 126], [126, 127]]
all edges with dummy:  [(126, 127, 2, 'S')]
126 19 0 2 H [127]
127 19 58605715 2 T [126]
Answer [126, 127, 126]
[128, 129, 130, 131, 132, 133, 134, 135, 136, 137]
[(129, 128, 2, 'S'), (129, 130, 2, 'R'), (131, 130, 2, 'S'), (131, 132, 2, 'R'), (133, 132, 2, 'S'), (133, 134, 2, 'R'), (135, 134, 2, 'S'), (135, 136, 2, 'R'), (136, 137, 2, 'S')]
Component [128, 129, 130, 131, 132, 133, 134, 135, 136, 137]
Component edges [(129, 128, 2, 'S'), (129, 130, 2, 'R'), (131, 130, 2, 'S'), (131, 132, 2, 'R'), (133, 132, 2, 'S'), (133, 134, 2, 'R'), (135, 134, 2, 'S'), (135, 136, 2, 'R'), (136, 137, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[128, 137]
paths_score 0 [[128, 129, 130, 131, 132, 133, 134, 135, 136, 137], [137, 136, 135, 134, 133, 132, 131, 130, 129, 128]]
paths_score 0 [[137, 136, 135, 134, 133, 132, 131, 130, 129, 128], [128, 129, 130, 131, 132, 133, 134, 135, 136, 137]]
all edges with dummy:  [(129, 128, 2, 'S'), (129, 130, 2, 'R'), (131, 130, 2, 'S'), (131, 132, 2, 'R'), (133, 132, 2, 'S'), (133, 134, 2, 'R'), (135, 134, 2, 'S'), (135, 136, 2, 'R'), (136, 137, 2, 'S')]
128 20 0 2 H [129]
129 20 29123897.0 2 T [128, 130]
130 20 29123898.0 2 H [129, 131]
131 20 29682542.0 2 T [130, 132]
132 20 29682543.0 2 H [131, 133]
133 20 29884548.0 2 T [132, 134]
134 20 29884549.0 2 H [133, 135]
135 20 30173892.0 2 T [136, 134]
136 20 30173893.0 2 H [137, 135]
137 20 64333718 2 T [136]
Answer [128, 129, 130, 131, 132, 133, 134, 135, 136, 137, 136, 135, 134, 133, 132, 131, 130, 129, 128]
[138, 139, 140, 141, 142, 143, 144, 145, 146, 147, 148, 149, 150, 151, 152, 153, 154, 155]
[(139, 138, 2, 'S'), (139, 140, 2, 'R'), (141, 140, 2, 'S'), (141, 142, 2, 'R'), (143, 142, 2, 'S'), (143, 144, 2, 'R'), (144, 145, 2, 'S'), (145, 146, 2, 'R'), (146, 147, 2, 'S'), (147, 148, 2, 'R'), (149, 148, 2, 'S'), (149, 150, 2, 'R'), (151, 150, 2, 'S'), (151, 152, 2, 'R'), (153, 152, 2, 'S'), (153, 154, 2, 'R'), (154, 155, 2, 'S')]
Component [138, 139, 140, 141, 142, 143, 144, 145, 146, 147, 148, 149, 150, 151, 152, 153, 154, 155]
Component edges [(139, 138, 2, 'S'), (139, 140, 2, 'R'), (141, 140, 2, 'S'), (141, 142, 2, 'R'), (143, 142, 2, 'S'), (143, 144, 2, 'R'), (144, 145, 2, 'S'), (145, 146, 2, 'R'), (146, 147, 2, 'S'), (147, 148, 2, 'R'), (149, 148, 2, 'S'), (149, 150, 2, 'R'), (151, 150, 2, 'S'), (151, 152, 2, 'R'), (153, 152, 2, 'S'), (153, 154, 2, 'R'), (154, 155, 2, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[138, 155]
paths_score 0 [[138, 139, 140, 141, 142, 143, 144, 145, 146, 147, 148, 149, 150, 151, 152, 153, 154, 155], [155, 154, 153, 152, 151, 150, 149, 148, 147, 146, 145, 144, 143, 142, 141, 140, 139, 138]]
paths_score 0 [[155, 154, 153, 152, 151, 150, 149, 148, 147, 146, 145, 144, 143, 142, 141, 140, 139, 138], [138, 139, 140, 141, 142, 143, 144, 145, 146, 147, 148, 149, 150, 151, 152, 153, 154, 155]]
all edges with dummy:  [(139, 138, 2, 'S'), (139, 140, 2, 'R'), (141, 140, 2, 'S'), (141, 142, 2, 'R'), (143, 142, 2, 'S'), (143, 144, 2, 'R'), (144, 145, 2, 'S'), (145, 146, 2, 'R'), (146, 147, 2, 'S'), (147, 148, 2, 'R'), (149, 148, 2, 'S'), (149, 150, 2, 'R'), (151, 150, 2, 'S'), (151, 152, 2, 'R'), (153, 152, 2, 'S'), (153, 154, 2, 'R'), (154, 155, 2, 'S')]
138 21 5010515 2 H [139]
139 21 5703412.0 2 T [138, 140]
140 21 5703413.0 2 H [139, 141]
141 21 6215576.0 2 T [140, 142]
142 21 6215577.0 2 H [141, 143]
143 21 6365040.75 2 T [144, 142]
144 21 6365041.75 2 H [145, 143]
145 21 7129982.0 2 T [144, 146]
146 21 7129983.0 1 H [145, 147]
147 21 7137617.0 1 T [146, 148]
148 21 7137618 2 H [147, 149]
149 21 8100606.0 2 T [148, 150]
150 21 8100607.0 2 H [149, 151]
151 21 8192569.0 2 T [152, 150]
152 21 8192570.0 2 H [153, 151]
153 21 8825989.0 2 T [152, 154]
154 21 8825990.0 2 H [153, 155]
155 21 46697229 2 T [154]
Answer [138, 139, 140, 141, 142, 143, 144, 145, 146, 147, 148, 149, 150, 151, 152, 153, 154, 155, 154, 153, 152, 151, 150, 149, 148, 147, 146, 145, 144, 143, 142, 141, 140, 139, 138]
[156, 157, 158, 159, 160, 161, 169, 168, 170, 171, 167, 166, 165, 164, 163, 162]
[(157, 156, 2, 'S'), (157, 158, 2, 'R'), (159, 158, 2, 'S'), (159, 160, 2, 'R'), (161, 160, 2, 'S'), (161, 169, 1, 'SV'), (161, 162, 1, 'R'), (169, 168, 2, 'S'), (169, 170, 1, 'R'), (168, 170, 1, 'SV'), (167, 168, 1, 'R'), (170, 171, 2, 'S'), (167, 166, 1, 'S'), (165, 166, 1, 'R'), (164, 165, 1, 'S'), (163, 164, 1, 'R'), (162, 163, 1, 'S')]
Component [156, 157, 158, 159, 160, 161, 169, 168, 170, 171, 167, 166, 165, 164, 163, 162]
Component edges [(157, 156, 2, 'S'), (157, 158, 2, 'R'), (159, 158, 2, 'S'), (159, 160, 2, 'R'), (161, 160, 2, 'S'), (161, 169, 1, 'SV'), (161, 162, 1, 'R'), (169, 168, 2, 'S'), (169, 170, 1, 'R'), (168, 170, 1, 'SV'), (167, 168, 1, 'R'), (170, 171, 2, 'S'), (167, 166, 1, 'S'), (165, 166, 1, 'R'), (164, 165, 1, 'S'), (163, 164, 1, 'R'), (162, 163, 1, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices []
[156, 171]
paths_score 0 [[156, 157, 158, 159, 160, 161, 162, 163, 164, 165, 166, 167, 168, 169, 170, 171], [171, 170, 168, 169, 161, 160, 159, 158, 157, 156]]
paths_score 0 [[171, 170, 169, 168, 167, 166, 165, 164, 163, 162, 161, 160, 159, 158, 157, 156], [156, 157, 158, 159, 160, 161, 169, 168, 170, 171]]
all edges with dummy:  [(157, 156, 2, 'S'), (157, 158, 2, 'R'), (159, 158, 2, 'S'), (159, 160, 2, 'R'), (161, 160, 2, 'S'), (161, 169, 1, 'SV'), (161, 162, 1, 'R'), (169, 168, 2, 'S'), (169, 170, 1, 'R'), (168, 170, 1, 'SV'), (167, 168, 1, 'R'), (170, 171, 2, 'S'), (167, 166, 1, 'S'), (165, 166, 1, 'R'), (164, 165, 1, 'S'), (163, 164, 1, 'R'), (162, 163, 1, 'S')]
156 22 10514804 2 H [157]
157 22 11370078.5 2 T [156, 158]
158 22 11370079.5 2 H [157, 159]
159 22 12641252.0 2 T [160, 158]
160 22 12641253.0 2 H [161, 159]
161 22 18181891.5 2 T [160, 169, 162]
169 22 21167061.75 2 T [168, 161, 170]
168 22 18921117.0 2 H [169, 170, 167]
170 22 21167062.75 2 H [168, 169, 171]
171 22 50805586 2 T [170]
167 22 18921116.0 2 T [168, 166]
166 22 18876659 2 H [165, 167]
165 22 18876658.0 1 T [164, 166]
164 22 18189403.0 1 H [163, 165]
163 22 18189402.0 2 T [162, 164]
162 22 18181892.5 2 H [161, 163]
Answer [156, 157, 158, 159, 160, 161, 162, 163, 164, 165, 166, 167, 168, 169, 170, 171, 170, 168, 169, 161, 160, 159, 158, 157, 156]
[172, 173]
[(172, 173, 1, 'S')]
Component [172, 173]
Component edges [(172, 173, 1, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices [172, 173]
[172, 173]
all edges with dummy:  [(172, 173, 1, 'S')]
172 23 0 1 H [173]
173 23 156025612 1 T [172]
Answer [172, 173]
[174, 175, 176, 177, 178, 179]
[(174, 175, 1, 'S'), (175, 176, 1, 'R'), (176, 177, 1, 'S'), (177, 178, 1, 'R'), (178, 179, 1, 'S')]
Component [174, 175, 176, 177, 178, 179]
Component edges [(174, 175, 1, 'S'), (175, 176, 1, 'R'), (176, 177, 1, 'S'), (177, 178, 1, 'R'), (178, 179, 1, 'S')]
RESIDUE vertices []
RV paired: {}
RESIDUE vertices (before self-edge):  []
RESIDUE vertices (after self-edge):  []
ODD vertices [174, 179]
[174, 179]
all edges with dummy:  [(174, 175, 1, 'S'), (175, 176, 1, 'R'), (176, 177, 1, 'S'), (177, 178, 1, 'R'), (178, 179, 1, 'S')]
174 24 11555 1 H [175]
175 24 20054894.0 1 T [176, 174]
176 24 20054895.0 0 H [177, 175]
177 24 20372129.0 0 T [176, 178]
178 24 20372130 1 H [177, 179]
179 24 57212131 1 T [178]
Answer [174, 175, 176, 177, 178, 179]
{(0, 1, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[0, 1], [1, 0]]
{(2, 3, 'S'): 2, (3, 4, 'R'): 2, (4, 5, 'S'): 2, (5, 6, 'R'): 2, (6, 7, 'S'): 2, (7, 8, 'R'): 2, (8, 9, 'S'): 3, (9, 10, 'R'): 2, (11, 10, 'S'): 2, (11, 75, 'SV'): 1, (11, 12, 'R'): 1, (75, 74, 'S'): 2, (75, 76, 'R'): 1, (73, 74, 'R'): 2, (73, 72, 'S'): 2, (71, 72, 'R'): 2, (71, 70, 'S'): 2, (76, 77, 'S'): 2, (12, 13, 'S'): 2, (9, 12, 'D'): 1, (8, 76, 'D'): 1}
split node indices:  [11, 16, 23]
debug paths separation:  [[2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13], [13, 12, 9, 8, 76, 77], [77, 76, 75, 74, 73, 72, 71, 70], [70, 71, 72, 73, 74, 75, 11, 10, 9, 8, 7, 6, 5, 4, 3, 2]]
{(14, 15, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[14, 15], [15, 14]]
{(16, 17, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[16, 17], [17, 16]]
{(18, 19, 'S'): 2, (19, 20, 'R'): 2, (20, 21, 'S'): 2, (21, 22, 'R'): 2, (22, 23, 'S'): 2}
split node indices:  [5]
debug paths separation:  [[18, 19, 20, 21, 22, 23], [23, 22, 21, 20, 19, 18]]
{(24, 25, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[24, 25], [25, 24]]
{(26, 27, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[26, 27], [27, 26]]
{(29, 28, 'S'): 2, (29, 30, 'R'): 2, (31, 30, 'S'): 2, (31, 32, 'R'): 2, (32, 33, 'S'): 2}
split node indices:  [5]
debug paths separation:  [[28, 29, 30, 31, 32, 33], [33, 32, 31, 30, 29, 28]]
{(35, 34, 'S'): 2, (35, 36, 'R'): 2, (37, 36, 'S'): 2, (37, 38, 'R'): 2, (39, 38, 'S'): 2, (39, 40, 'R'): 2, (41, 40, 'S'): 2, (41, 42, 'R'): 2, (43, 42, 'S'): 2, (43, 44, 'R'): 2, (45, 44, 'S'): 2, (45, 46, 'R'): 2, (47, 46, 'S'): 2, (47, 48, 'R'): 2, (48, 49, 'S'): 2}
split node indices:  [15]
debug paths separation:  [[34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49], [49, 48, 47, 46, 45, 44, 43, 42, 41, 40, 39, 38, 37, 36, 35, 34]]
{(50, 51, 'S'): 2, (51, 52, 'R'): 2, (52, 53, 'S'): 2, (53, 54, 'R'): 2, (55, 54, 'S'): 2, (55, 56, 'R'): 2, (57, 56, 'S'): 2, (57, 58, 'R'): 2, (58, 59, 'S'): 2}
split node indices:  [9]
debug paths separation:  [[50, 51, 52, 53, 54, 55, 56, 57, 58, 59], [59, 58, 57, 56, 55, 54, 53, 52, 51, 50]]
{(60, 61, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[60, 61], [61, 60]]
{(62, 63, 'S'): 2, (63, 64, 'R'): 1, (64, 65, 'S'): 1, (65, 66, 'R'): 1, (66, 67, 'S'): 2, (63, 66, 'D'): 1}
split node indices:  [5]
debug paths separation:  [[62, 63, 64, 65, 66, 67], [67, 66, 63, 62]]
{(68, 69, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[68, 69], [69, 68]]
{(79, 78, 'S'): 2, (79, 80, 'R'): 2, (81, 80, 'S'): 2, (81, 82, 'R'): 2, (83, 82, 'S'): 2, (83, 84, 'R'): 2, (85, 84, 'S'): 2, (85, 86, 'R'): 2, (87, 86, 'S'): 2, (87, 88, 'R'): 2, (89, 88, 'S'): 2, (89, 90, 'R'): 2, (90, 91, 'S'): 2}
split node indices:  [13]
debug paths separation:  [[78, 79, 80, 81, 82, 83, 84, 85, 86, 87, 88, 89, 90, 91], [91, 90, 89, 88, 87, 86, 85, 84, 83, 82, 81, 80, 79, 78]]
{(92, 93, 'S'): 2, (93, 94, 'R'): 2, (94, 95, 'S'): 2, (95, 96, 'R'): 2, (97, 96, 'S'): 2, (97, 98, 'R'): 2, (99, 98, 'S'): 2, (99, 100, 'R'): 2, (101, 100, 'S'): 2, (101, 102, 'R'): 2, (103, 102, 'S'): 2, (103, 104, 'R'): 2, (105, 104, 'S'): 2, (105, 106, 'R'): 2, (107, 106, 'S'): 2, (107, 108, 'R'): 2, (108, 109, 'S'): 2, (109, 110, 'R'): 2, (111, 110, 'S'): 3, (111, 112, 'R'): 3, (112, 113, 'S'): 3, (113, 114, 'R'): 2, (115, 114, 'S'): 2, (115, 116, 'R'): 2, (116, 117, 'S'): 2, (110, 113, 'D'): 1}
split node indices:  [25]
debug paths separation:  [[92, 93, 94, 95, 96, 97, 98, 99, 100, 101, 102, 103, 104, 105, 106, 107, 108, 109, 110, 111, 112, 113, 114, 115, 116, 117], [117, 116, 115, 114, 113, 112, 111, 110, 113, 112, 111, 110, 109, 108, 107, 106, 105, 104, 103, 102, 101, 100, 99, 98, 97, 96, 95, 94, 93, 92]]
{(118, 119, 'S'): 2, (119, 120, 'R'): 1, (120, 121, 'S'): 1, (121, 122, 'R'): 1, (122, 123, 'S'): 2, (119, 122, 'D'): 1}
split node indices:  [5]
debug paths separation:  [[118, 119, 120, 121, 122, 123], [123, 122, 119, 118]]
{(124, 125, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[124, 125], [125, 124]]
{(126, 127, 'S'): 2}
split node indices:  [1]
debug paths separation:  [[126, 127], [127, 126]]
{(129, 128, 'S'): 2, (129, 130, 'R'): 2, (131, 130, 'S'): 2, (131, 132, 'R'): 2, (133, 132, 'S'): 2, (133, 134, 'R'): 2, (135, 134, 'S'): 2, (135, 136, 'R'): 2, (136, 137, 'S'): 2}
split node indices:  [9]
debug paths separation:  [[128, 129, 130, 131, 132, 133, 134, 135, 136, 137], [137, 136, 135, 134, 133, 132, 131, 130, 129, 128]]
{(139, 138, 'S'): 2, (139, 140, 'R'): 2, (141, 140, 'S'): 2, (141, 142, 'R'): 2, (143, 142, 'S'): 2, (143, 144, 'R'): 2, (144, 145, 'S'): 2, (145, 146, 'R'): 2, (146, 147, 'S'): 2, (147, 148, 'R'): 2, (149, 148, 'S'): 2, (149, 150, 'R'): 2, (151, 150, 'S'): 2, (151, 152, 'R'): 2, (153, 152, 'S'): 2, (153, 154, 'R'): 2, (154, 155, 'S'): 2}
split node indices:  [17]
debug paths separation:  [[138, 139, 140, 141, 142, 143, 144, 145, 146, 147, 148, 149, 150, 151, 152, 153, 154, 155], [155, 154, 153, 152, 151, 150, 149, 148, 147, 146, 145, 144, 143, 142, 141, 140, 139, 138]]
{(157, 156, 'S'): 2, (157, 158, 'R'): 2, (159, 158, 'S'): 2, (159, 160, 'R'): 2, (161, 160, 'S'): 2, (161, 169, 'SV'): 1, (161, 162, 'R'): 1, (169, 168, 'S'): 2, (169, 170, 'R'): 1, (168, 170, 'SV'): 1, (167, 168, 'R'): 1, (170, 171, 'S'): 2, (167, 166, 'S'): 1, (165, 166, 'R'): 1, (164, 165, 'S'): 1, (163, 164, 'R'): 1, (162, 163, 'S'): 1}
split node indices:  [15]
debug paths separation:  [[156, 157, 158, 159, 160, 161, 162, 163, 164, 165, 166, 167, 168, 169, 170, 171], [171, 170, 168, 169, 161, 160, 159, 158, 157, 156]]
{(172, 173, 'S'): 1}
split node indices:  []
debug paths separation:  [[172, 173]]
{(174, 175, 'S'): 1, (175, 176, 'R'): 1, (176, 177, 'S'): 1, (177, 178, 'R'): 1, (178, 179, 'S'): 1}
split node indices:  []
debug paths separation:  [[174, 175, 176, 177, 178, 179]]
