Enumerative problem (A₁₃₂₅)²WW(Y)²Y = 15 on Fl(2,4;6)

Experimental data

	Number of Real Solutions
Necklaces	1	3	5	7	9	11	13	15
bAdccAa	0	0	0	0	0	0	0	1000
baAdccA	0	0	0	0	0	0	0	1000
bAcdcAa	0	0	0	0	0	0	0	1000
baAcdAc	0	0	0	0	0	112	553	335
baAdcAc	0	0	0	0	0	166	546	288
baAccAd	0	0	0	0	12	152	419	417
bAccAda	0	0	0	0	34	267	424	275
bAaAccd	0	0	0	0	48	143	175	634
bcdcAaA	0	0	0	0	52	155	206	587
bacdAcA	0	0	0	0	55	272	515	158
bcAaAcd	0	0	0	0	77	154	386	383
bAaAdcc	0	0	0	0	84	105	161	650
bacAdcA	0	0	0	0	93	383	206	318
bAccAad	0	0	0	0	125	368	242	265
bAadAcc	0	0	0	0	156	288	334	222
bcAaAdc	0	0	0	1	48	185	392	374
bAadcAc	0	0	0	2	45	315	484	154
bAdcAca	0	0	0	2	101	374	210	313
bAccaAd	0	0	0	5	110	458	263	164
baAcAcd	0	0	0	6	50	248	540	156
bAcAcda	0	0	0	7	54	341	459	139
bAadccA	0	0	0	9	141	181	350	319
bcAdAca	0	0	0	10	107	425	383	75
bccAadA	0	0	0	11	216	338	243	192
bccAaAd	0	0	0	13	47	118	431	391
bcAdcaA	0	0	0	15	94	354	400	137
bAdcacA	0	0	0	15	279	459	196	51
baAcAdc	0	0	0	16	99	247	446	192
bAdAcca	0	0	0	19	152	313	404	112
bAacdcA	0	0	0	20	239	317	191	233
baccAAd	0	0	0	22	173	464	252	89
baAdAcc	0	0	0	27	96	233	380	264
bAdcaAc	0	0	0	27	179	387	271	136
bcAadcA	0	0	0	28	194	387	274	117
bAcadcA	0	0	0	31	294	388	234	53
bAcAadc	0	0	0	34	196	323	299	148
bccadAA	0	0	0	34	387	364	157	58
badAAcc	0	0	0	37	264	473	197	29
bAaccAd	0	0	0	41	187	364	274	134
bacAcAd	0	0	0	41	219	279	291	170
bAcAcad	0	0	0	42	190	362	238	168
bAcacAd	0	0	0	45	160	325	314	156
bAcAacd	0	0	0	66	255	266	200	213
bAdccaA	0	0	0	66	288	263	100	283
bcAadAc	0	0	0	73	274	304	251	98
bcaAdcA	0	0	0	97	89	241	250	323
bcadcAA	0	0	0	104	358	329	159	50
bAdcAac	0	0	0	113	139	234	248	266
bcAAdca	0	0	0	143	306	312	161	78
bAAdcac	0	0	0	168	256	336	187	53
bacAAdc	0	0	0	322	243	263	131	41
bcaAcAd	0	0	1	45	156	348	279	171
bAdAacc	0	0	1	65	306	342	175	111
bAAccda	0	0	1	293	196	214	117	179
bAAdcca	0	0	1	335	173	250	149	92
bcAacAd	0	0	2	44	213	328	272	141
bcAcAad	0	0	3	26	137	384	292	158
bAcaAdc	0	0	3	27	122	305	340	203
badAcAc	0	0	3	54	232	368	244	99
bAacAdc	0	0	3	90	177	288	206	236
bAdAcac	0	0	4	58	267	388	210	73
bAccadA	0	0	5	38	253	461	161	82
bAcaAcd	0	0	6	26	126	354	285	203
bcAcaAd	0	0	7	63	158	308	294	170
bAacAcd	0	0	7	80	195	257	225	236
bdAAcac	0	0	7	86	419	223	184	81
bcadAAc	0	0	7	153	442	266	119	13
bacAAcd	0	0	7	263	335	186	160	49
bAAcacd	0	0	9	169	260	206	258	98
badcAAc	0	0	9	184	338	310	117	42
bcadAcA	0	0	11	78	286	332	220	73
bacdcAA	0	0	12	326	267	142	174	79
bAcadAc	0	0	16	145	279	298	180	82
bccAAad	0	0	19	253	245	198	162	123
bAAcadc	0	0	22	182	331	231	132	102
bcaAdAc	0	0	24	128	209	322	245	72
bcAcadA	0	0	24	156	311	289	151	69
bcAAadc	0	0	26	250	320	158	146	100
bccaAAd	0	0	27	335	267	146	118	107
bAAccad	0	0	48	153	305	277	179	38
bcAAacd	0	0	63	354	265	98	124	96
bAAadcc	0	0	107	239	233	145	96	180
bcdcaAA	0	0	198	309	190	48	71	184
baAAdcc	0	0	206	147	84	318	144	101
baAAccd	0	0	210	146	134	175	240	95
bcdcAAa	0	0	256	143	85	276	145	95
bAAaccd	0	0	279	288	142	40	48	203
bcAAcad	0	5	36	136	394	260	112	57
bcaAAdc	0	8	145	259	197	173	134	84
bcaAAcd	0	24	163	259	157	146	127	124

Key
Condition	Name	Symbol	Codimension
1325	A₁₃₂₅	A	2
1324	W	a	1
1523	W	b	3
1235	Y	c	1
1245	Y	d	2

Point Selection

Total time of computation: 1 674 514.64 GHz-seconds or 19.38 GHz-days on Pieri

90 000 Polynomial systems solved

The coefficients of a typical eliminant had 133 digits.
The typical eliminant had size 2211 bytes.

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

Created: Fri Jul 15 15:54:00 CDT 2005

Enumerative problem (A1325)2WW(Y)2Y = 15 on Fl(2,4;6)

Enumerative problem (A₁₃₂₅)²WW(Y)²Y = 15 on Fl(2,4;6)