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misp.mod @ 1:c445c931472f

Last change on this file since 1:c445c931472f was 1:c445c931472f, checked in by Alpar Juttner <alpar@…>, 13 years ago

Import glpk-4.45

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1	/* MISP, Maximum Independent Set Problem */
2
3	/* Written in GNU MathProg by Andrew Makhorin <mao@gnu.org> */
4
5	/* Let G = (V,E) be an undirected graph with vertex set V and edge set
6	E. Vertices u, v in V are non-adjacent if (u,v) not in E. A subset
7	of the vertices S within V is independent if all vertices in S are
8	pairwise non-adjacent. The Maximum Independent Set Problem (MISP) is
9	to find an independent set having the largest cardinality. */
10
11	param n, integer, > 0;
12	/* number of vertices */
13
14	set V := 1..n;
15	/* set of vertices */
16
17	set E within V cross V;
18	/* set of edges */
19
20	var x{i in V}, binary;
21	/* x[i] = 1 means vertex i belongs to independent set */
22
23	s.t. edge{(i,j) in E}: x[i] + x[j] <= 1;
24	/* if there is edge (i,j), vertices i and j cannot belong to the same
25	independent set */
26
27	maximize obj: sum{i in V} x[i];
28	/* the objective is to maximize the cardinality of independent set */
29
30	data;
31
32	/* These data corresponds to the test instance from:
33
34	M.G.C. Resende, T.A.Feo, S.H.Smith, "Algorithm 787 -- FORTRAN
35	subroutines for approximate solution of the maximum independent set
36	problem using GRASP," Trans. on Math. Softw., Vol. 24, No. 4,
37	December 1998, pp. 386-394. */
38
39	/* The optimal solution is 7 */
40
41	param n := 50;
42
43	set E :=
44	1 2
45	1 3
46	1 5
47	1 7
48	1 8
49	1 12
50	1 15
51	1 16
52	1 19
53	1 20
54	1 21
55	1 22
56	1 28
57	1 30
58	1 34
59	1 35
60	1 37
61	1 41
62	1 42
63	1 47
64	1 50
65	2 3
66	2 5
67	2 6
68	2 7
69	2 8
70	2 9
71	2 10
72	2 13
73	2 17
74	2 19
75	2 20
76	2 21
77	2 23
78	2 25
79	2 26
80	2 29
81	2 31
82	2 35
83	2 36
84	2 44
85	2 45
86	2 46
87	2 50
88	3 5
89	3 6
90	3 8
91	3 9
92	3 10
93	3 11
94	3 14
95	3 16
96	3 23
97	3 24
98	3 26
99	3 27
100	3 28
101	3 29
102	3 30
103	3 31
104	3 34
105	3 35
106	3 36
107	3 39
108	3 41
109	3 42
110	3 43
111	3 44
112	3 50
113	4 6
114	4 7
115	4 9
116	4 10
117	4 11
118	4 13
119	4 14
120	4 15
121	4 17
122	4 21
123	4 22
124	4 23
125	4 24
126	4 25
127	4 27
128	4 28
129	4 30
130	4 31
131	4 33
132	4 34
133	4 35
134	4 36
135	4 37
136	4 38
137	4 40
138	4 41
139	4 42
140	4 46
141	4 49
142	5 6
143	5 11
144	5 14
145	5 21
146	5 24
147	5 25
148	5 28
149	5 35
150	5 38
151	5 39
152	5 41
153	5 44
154	5 49
155	5 50
156	6 8
157	6 9
158	6 10
159	6 13
160	6 14
161	6 16
162	6 17
163	6 19
164	6 22
165	6 23
166	6 26
167	6 27
168	6 30
169	6 34
170	6 35
171	6 38
172	6 39
173	6 40
174	6 41
175	6 44
176	6 45
177	6 47
178	6 50
179	7 8
180	7 9
181	7 10
182	7 11
183	7 13
184	7 15
185	7 16
186	7 18
187	7 20
188	7 22
189	7 23
190	7 24
191	7 25
192	7 33
193	7 35
194	7 36
195	7 38
196	7 43
197	7 45
198	7 46
199	7 47
200	8 10
201	8 11
202	8 13
203	8 16
204	8 17
205	8 18
206	8 19
207	8 20
208	8 21
209	8 22
210	8 23
211	8 24
212	8 25
213	8 26
214	8 33
215	8 35
216	8 36
217	8 39
218	8 42
219	8 44
220	8 48
221	8 49
222	9 12
223	9 14
224	9 17
225	9 19
226	9 20
227	9 23
228	9 28
229	9 30
230	9 31
231	9 32
232	9 33
233	9 34
234	9 38
235	9 39
236	9 42
237	9 44
238	9 45
239	9 46
240	10 11
241	10 13
242	10 15
243	10 16
244	10 17
245	10 20
246	10 21
247	10 22
248	10 23
249	10 25
250	10 26
251	10 27
252	10 28
253	10 30
254	10 31
255	10 32
256	10 37
257	10 38
258	10 41
259	10 43
260	10 44
261	10 45
262	10 50
263	11 12
264	11 14
265	11 15
266	11 18
267	11 21
268	11 24
269	11 25
270	11 26
271	11 29
272	11 32
273	11 33
274	11 35
275	11 36
276	11 37
277	11 39
278	11 40
279	11 42
280	11 43
281	11 45
282	11 47
283	11 49
284	11 50
285	12 13
286	12 16
287	12 17
288	12 19
289	12 24
290	12 25
291	12 26
292	12 30
293	12 31
294	12 32
295	12 34
296	12 36
297	12 37
298	12 39
299	12 41
300	12 44
301	12 47
302	12 48
303	12 49
304	13 15
305	13 16
306	13 18
307	13 19
308	13 20
309	13 22
310	13 23
311	13 24
312	13 27
313	13 28
314	13 29
315	13 31
316	13 33
317	13 35
318	13 36
319	13 37
320	13 44
321	13 47
322	13 49
323	13 50
324	14 15
325	14 16
326	14 17
327	14 18
328	14 19
329	14 20
330	14 21
331	14 26
332	14 28
333	14 29
334	14 30
335	14 31
336	14 32
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338	14 35
339	14 36
340	14 38
341	14 39
342	14 41
343	14 44
344	14 46
345	14 47
346	14 48
347	15 18
348	15 21
349	15 22
350	15 23
351	15 25
352	15 28
353	15 29
354	15 30
355	15 33
356	15 34
357	15 36
358	15 37
359	15 38
360	15 39
361	15 40
362	15 43
363	15 44
364	15 46
365	15 50
366	16 17
367	16 19
368	16 20
369	16 25
370	16 26
371	16 29
372	16 35
373	16 38
374	16 39
375	16 40
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377	16 42
378	16 44
379	17 18
380	17 19
381	17 21
382	17 22
383	17 23
384	17 25
385	17 26
386	17 28
387	17 29
388	17 33
389	17 37
390	17 44
391	17 45
392	17 48
393	18 20
394	18 24
395	18 27
396	18 28
397	18 31
398	18 32
399	18 34
400	18 35
401	18 36
402	18 37
403	18 38
404	18 45
405	18 48
406	18 49
407	18 50
408	19 22
409	19 24
410	19 28
411	19 29
412	19 36
413	19 37
414	19 39
415	19 41
416	19 43
417	19 45
418	19 48
419	19 49
420	20 21
421	20 22
422	20 24
423	20 25
424	20 26
425	20 27
426	20 29
427	20 30
428	20 31
429	20 33
430	20 34
431	20 35
432	20 38
433	20 39
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435	20 42
436	20 43
437	20 44
438	20 45
439	20 46
440	20 48
441	20 49
442	21 22
443	21 23
444	21 29
445	21 31
446	21 35
447	21 38
448	21 42
449	21 46
450	21 47
451	22 23
452	22 26
453	22 27
454	22 28
455	22 29
456	22 30
457	22 39
458	22 40
459	22 41
460	22 42
461	22 44
462	22 45
463	22 46
464	22 47
465	22 49
466	22 50
467	23 28
468	23 31
469	23 32
470	23 33
471	23 34
472	23 35
473	23 36
474	23 39
475	23 40
476	23 41
477	23 42
478	23 44
479	23 45
480	23 48
481	23 49
482	23 50
483	24 25
484	24 27
485	24 29
486	24 30
487	24 31
488	24 33
489	24 34
490	24 38
491	24 42
492	24 43
493	24 44
494	24 49
495	24 50
496	25 26
497	25 27
498	25 29
499	25 30
500	25 33
501	25 34
502	25 36
503	25 38
504	25 40
505	25 41
506	25 42
507	25 44
508	25 46
509	25 47
510	25 48
511	25 49
512	26 28
513	26 31
514	26 32
515	26 33
516	26 37
517	26 38
518	26 39
519	26 40
520	26 41
521	26 42
522	26 45
523	26 47
524	26 48
525	26 49
526	27 29
527	27 30
528	27 33
529	27 34
530	27 35
531	27 39
532	27 40
533	27 46
534	27 48
535	28 29
536	28 37
537	28 40
538	28 42
539	28 44
540	28 46
541	28 47
542	28 50
543	29 35
544	29 38
545	29 39
546	29 41
547	29 42
548	29 48
549	30 31
550	30 32
551	30 35
552	30 37
553	30 38
554	30 40
555	30 43
556	30 45
557	30 46
558	30 47
559	30 48
560	31 33
561	31 35
562	31 38
563	31 40
564	31 41
565	31 42
566	31 44
567	31 46
568	31 47
569	31 50
570	32 33
571	32 35
572	32 39
573	32 40
574	32 46
575	32 49
576	32 50
577	33 34
578	33 36
579	33 37
580	33 40
581	33 42
582	33 43
583	33 44
584	33 45
585	33 50
586	34 35
587	34 36
588	34 37
589	34 38
590	34 40
591	34 43
592	34 44
593	34 49
594	34 50
595	35 36
596	35 38
597	35 41
598	35 42
599	35 43
600	35 45
601	35 46
602	35 47
603	35 49
604	35 50
605	36 37
606	36 39
607	36 40
608	36 41
609	36 42
610	36 43
611	36 48
612	36 50
613	37 38
614	37 41
615	37 43
616	37 46
617	37 47
618	37 48
619	37 49
620	37 50
621	38 41
622	38 45
623	38 46
624	38 48
625	38 49
626	38 50
627	39 43
628	39 46
629	39 47
630	39 48
631	39 49
632	40 43
633	40 45
634	40 48
635	40 50
636	41 42
637	41 43
638	41 44
639	41 45
640	41 46
641	41 48
642	41 49
643	42 43
644	42 44
645	42 46
646	42 48
647	42 49
648	43 45
649	43 46
650	43 48
651	43 50
652	44 45
653	44 48
654	45 46
655	45 47
656	45 48
657	46 49
658	47 49
659	47 50
660	48 49
661	48 50
662	49 50
663	;
664
665	end;

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source: glpk-cmake/examples/misp.mod @ 1:c445c931472f

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