Enumerative problem A₁₃₂₅A₂₃₁₆(W)³(Y)³ = 12 on Fl(2,4;6)

Experimental data

Related Problems

	Number of Real Solutions
Necklaces	0	2	4	6	8	10	12
BaaaAbbb	0	0	0	0	0	0	2500
BaaabAbb	0	0	0	0	355	990	1155
BaaAabbb	0	0	0	0	466	840	1194
BbaaaAbb	0	0	0	0	499	295	1706
BaaAbbba	0	0	0	0	688	434	1378
BaaAbabb	0	0	0	5	1109	942	444
BaabaAbb	0	0	0	9	1045	964	482
BbaaAabb	0	0	0	101	622	904	873
BaaAbbab	0	0	2	136	1059	1059	244
BaabAbba	0	0	2	139	725	969	665
BaAaabbb	0	0	3	155	802	1129	411
BabaaAbb	0	0	5	150	1044	936	365
BaaabbAb	0	0	6	117	652	1265	460
BabaAbba	0	0	8	245	691	856	700
BabAabba	0	0	10	178	623	1116	573
BbaAbaab	0	0	10	178	623	1116	573
BaabAabb	0	0	11	119	516	1116	738
BbaaAbab	0	0	15	236	689	977	583
BaAbabba	0	0	18	376	1023	853	230
BbAabaab	0	0	18	376	1023	853	230
BAaababb	0	0	21	396	1393	629	61
BAbbabaa	0	0	21	396	1393	629	61
BaabAbab	0	0	36	375	1012	820	257
BaAabbba	0	0	53	404	1008	382	653
BbAbaaab	0	0	53	404	1008	382	653
BabaAabb	0	0	60	355	1011	770	304
BabAaabb	0	0	64	243	757	831	605
BaabbAab	0	0	64	251	705	832	648
BbaAaabb	0	0	69	312	541	1070	508
BaabbAba	0	0	82	330	759	933	396
BaabbaAb	0	0	84	508	995	667	246
BaAbaabb	0	0	113	504	1088	599	196
BabbAaab	0	0	118	306	681	543	852
BAabaabb	0	0	125	486	1281	492	116
BAbabbaa	0	0	125	486	1281	492	116
BababaAb	0	0	244	732	1005	442	77
BAaaabbb	0	0	267	132	1344	483	274
BAbbbaaa	0	0	267	132	1344	483	274
BAaabbba	0	0	312	661	867	350	310
BAbbaaab	0	0	312	661	867	350	310
BaAbbbaa	0	0	397	450	826	494	333
BbAaaabb	0	0	397	450	826	494	333
BaAbbaba	0	0	430	412	821	714	123
BbAaabab	0	0	430	412	821	714	123
BAaabbab	0	0	532	955	742	231	40
BAbbaaba	0	0	532	955	742	231	40
BAabbbaa	0	0	759	786	820	102	33
BAbaaabb	0	0	759	786	820	102	33
BabAbaba	0	1	66	310	853	873	397
BbaAabab	0	1	66	310	853	873	397
BaAbabab	0	1	250	834	973	379	63
BaababAb	0	2	32	331	1098	806	231
BabaAbab	0	2	162	541	700	808	287
BAababab	0	3	284	1346	696	150	21
BAbababa	0	3	284	1346	696	150	21
BaAababb	0	6	56	379	1195	706	158
BaAabbab	0	8	193	729	1001	456	113
BAabbaba	0	8	656	877	783	145	31
BAbaabab	0	8	656	877	783	145	31
BabaabAb	0	9	180	647	947	488	229
BabAabab	0	11	83	513	1184	538	171
BababAab	0	16	88	503	1071	615	207
BaAbbaab	0	16	216	584	674	685	325
BabbaaAb	0	22	220	496	758	623	381
BAababba	0	23	201	961	945	300	70
BAbabaab	0	23	201	961	945	300	70
BAabbaab	1	132	527	1112	505	159	64
BAbaabba	1	132	527	1112	505	159	64
BabAbaab	2	112	237	627	638	497	387
BabbaAab	5	106	231	637	638	489	394

Problems fibred over A₁₃₂₅A₂₃₁₆(W)³(Y)³

Variety	Problem	#
Fl(2,3,4;6)	A₁₃₂₅(W)³X(Y)³	12

Key
Condition	Name	Symbol	Codimension
1325	A₁₃₂₅	A	2
2316	A₂₃₁₆	B	4
1324	W	a	1
1235	Y	b	1

Point Selection

Total time of computation: 608 967.74 GHz-seconds or 7.04 GHz-days on rcf1537-9

175 000 Polynomial systems solved

The coefficients of a typical eliminant had 216 digits.
The typical eliminant had size 2868 bytes.

This table automatically generated from the data in This File using This Maple Script

Created: Fri Jul 15 15:53:24 CDT 2005

Enumerative problem A1325A2316(W)3(Y)3 = 12 on Fl(2,4;6)

Enumerative problem A₁₃₂₅A₂₃₁₆(W)³(Y)³ = 12 on Fl(2,4;6)