Strongly regular graphs

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v k λ μ r^f s^g comments

- 1101 550 274 275 16.091⁵⁵⁰ –17.091⁵⁵⁰ Conf

+ 1105 80 15 5 15²⁷² –5⁸³² U(4,4) polar graph; GQ(16,4)

1024 948 960 4⁸³² –16²⁷²

? 1105 138 11 18 8⁷¹⁴ –15³⁹⁰

966 845 840 14³⁹⁰ –9⁷¹⁴

? 1105 208 39 39 13⁵⁴⁴ –13⁵⁶⁰ pg(16,12,3)?

896 726 728 12⁵⁶⁰ –14⁵⁴⁴

? 1105 336 95 105 11⁷¹⁴ –21³⁹⁰ pg(16,20,5)?

768 536 528 20³⁹⁰ –12⁷¹⁴

? 1105 378 135 126 21³⁹⁰ –12⁷¹⁴

726 473 484 11⁷¹⁴ –22³⁹⁰ S(2,22,715)?

? 1105 552 275 276 16.121⁵⁵² –17.121⁵⁵² 2-graph\*?

? 1106 340 114 100 24³¹⁵ –10⁷⁹⁰ S(2,10,316)?

765 524 540 9⁷⁹⁰ –25³¹⁵

? 1106 403 132 155 8⁸⁶⁸ –31²³⁷ pg(13,30,5)?

702 453 432 30²³⁷ –9⁸⁶⁸

? 1106 465 208 186 31²³⁷ –9⁸⁶⁸

640 360 384 8⁸⁶⁸ –32²³⁷

+ 1107 378 117 135 9⁸¹⁹ –27²⁸⁷ NO^–(8,3)

728 484 468 26²⁸⁷ –10⁸¹⁹

+ 1109 554 276 277 16.151⁵⁵⁴ –17.151⁵⁵⁴ Paley(1109); 2-graph\*

? 1111 110 9 11 9⁶⁰⁵ –11⁵⁰⁵

1000 900 900 10⁵⁰⁵ –10⁶⁰⁵

? 1112 396 135 144 12⁶⁹⁵ –21⁴¹⁶

715 462 455 20⁴¹⁶ –13⁶⁹⁵

- 1113 556 277 278 16.181⁵⁵⁶ –17.181⁵⁵⁶ Conf

+ 1116 245 70 49 28²¹⁶ –7⁸⁹⁹ S(2,7,217)

870 673 696 6⁸⁹⁹ –29²¹⁶ pg(30,28,24)?

+ 1117 558 278 279 16.211⁵⁵⁸ –17.211⁵⁵⁸ Paley(1117); 2-graph\*

? 1120 363 110 121 11⁷³⁵ –22³⁸⁴

756 513 504 21³⁸⁴ –12⁷³⁵

+ 1120 390 146 130 26³⁰⁰ –10⁸¹⁹ O⁺(8,3)

729 468 486 9⁸¹⁹ –27³⁰⁰ pg(27,26,18) - Mathon

- 1121 560 279 280 16.241⁵⁶⁰ –17.241⁵⁶⁰ Conf

? 1122 209 16 44 5⁹⁶⁸ –33¹⁵³

912 746 720 32¹⁵³ –6⁹⁶⁸

- 1125 228 3 57 3¹⁰⁶⁴ –57⁶⁰ Krein2

896 724 672 56⁶⁰ –4¹⁰⁶⁴ Krein1

? 1125 288 78 72 18⁴⁴⁰ –12⁶⁸⁴ pg(24,11,6)?

836 619 627 11⁶⁸⁴ –19⁴⁴⁰

? 1125 308 103 77 33¹⁸⁹ –7⁹³⁵

816 584 612 6⁹³⁵ –34¹⁸⁹ pg(24,33,18)?

? 1125 562 280 281 16.271⁵⁶² –17.271⁵⁶² 2-graph\*?

- 1127 486 165 243 3¹⁰⁸⁰ –81⁴⁶ Makhnev

640 396 320 80⁴⁶ –4¹⁰⁸⁰

! 1128 92 46 4 44⁴⁷ –2¹⁰⁸⁰ Triangular graph T(48)

1035 946 990 1¹⁰⁸⁰ –45⁴⁷ pg(23,44,22)?

? 1128 196 24 36 8⁷⁹⁸ –20³²⁹

931 770 760 19³²⁹ –9⁷⁹⁸

? 1128 245 28 60 5⁹⁸⁷ –37¹⁴⁰

882 696 666 36¹⁴⁰ –6⁹⁸⁷

? 1128 322 116 82 40¹⁴⁰ –6⁹⁸⁷

805 564 600 5⁹⁸⁷ –41¹⁴⁰

- 1128 483 162 240 3¹⁰⁸¹ –81⁴⁶ Krein2; Absolute bound

644 400 324 80⁴⁶ –4¹⁰⁸¹ Krein1; Absolute bound

- 1128 560 316 240 80⁴⁷ –4¹⁰⁸⁰

567 246 324 3¹⁰⁸⁰ –81⁴⁷ no 2-graph\*

+ 1129 564 281 282 16.300⁵⁶⁴ –17.300⁵⁶⁴ Paley(1129); 2-graph\*

? 1131 320 76 96 8⁸⁷⁰ –28²⁶⁰

810 585 567 27²⁶⁰ –9⁸⁷⁰

- 1133 566 282 283 16.330⁵⁶⁶ –17.330⁵⁶⁶ Conf

? 1134 198 27 36 9⁷⁴⁸ –18³⁸⁵ pg(11,17,2)?

935 772 765 17³⁸⁵ –10⁷⁴⁸

? 1134 206 43 36 17⁴¹² –10⁷²¹

927 756 765 9⁷²¹ –18⁴¹²

? 1134 275 40 75 5¹⁰⁰¹ –40¹³²

858 657 624 39¹³² –6¹⁰⁰¹

? 1134 308 82 84 14⁵⁹⁴ –16⁵³⁹

825 600 600 15⁵³⁹ –15⁵⁹⁴

? 1134 385 112 140 7⁹³⁵ –35¹⁹⁸

748 502 476 34¹⁹⁸ –8⁹³⁵

? 1134 412 166 140 34²⁰⁶ –8⁹²⁷

721 448 476 7⁹²⁷ –35²⁰⁶

? 1134 418 157 152 19⁴⁶⁸ –14⁶⁶⁵

715 448 455 13⁶⁶⁵ –20⁴⁶⁸

? 1134 528 252 240 24³⁶³ –12⁷⁷⁰

605 316 330 11⁷⁷⁰ –25³⁶³

? 1135 216 45 40 16⁴⁵⁴ –11⁶⁸⁰

918 741 748 10⁶⁸⁰ –17⁴⁵⁴

? 1135 238 45 51 11⁶⁸⁰ –17⁴⁵⁴

896 708 704 16⁴⁵⁴ –12⁶⁸⁰

? 1136 280 108 56 56⁷¹ –4¹⁰⁶⁴

855 630 684 3¹⁰⁶⁴ –57⁷¹ pg(15,56,12)?

- 1137 568 283 284 16.360⁵⁶⁸ –17.360⁵⁶⁸ Conf

? 1140 306 60 90 6⁹⁶⁹ –36¹⁷⁰

833 616 588 35¹⁷⁰ –7⁹⁶⁹

? 1140 391 126 138 11⁷⁵⁹ –23³⁸⁰

748 494 484 22³⁸⁰ –12⁷⁵⁹

? 1140 469 158 217 4¹⁰⁶⁴ –63⁷⁵

670 417 360 62⁷⁵ –5¹⁰⁶⁴

? 1140 476 202 196 20⁴⁵⁵ –14⁶⁸⁴ S(2,14,456)?

663 382 390 13⁶⁸⁴ –21⁴⁵⁵

? 1140 544 228 288 4¹⁰⁶⁴ –64⁷⁵

595 338 280 63⁷⁵ –5¹⁰⁶⁴

- 1141 570 284 285 16.389⁵⁷⁰ –17.389⁵⁷⁰ Conf

? 1144 243 42 54 9⁷⁹² –21³⁵¹

900 710 700 20³⁵¹ –10⁷⁹²

? 1144 408 162 136 34²⁰⁸ –8⁹³⁵

735 462 490 7⁹³⁵ –35²⁰⁸ pg(21,34,14)?

? 1144 495 206 220 11⁷⁸⁰ –25³⁶³

648 372 360 24³⁶³ –12⁷⁸⁰

? 1145 572 285 286 16.419⁵⁷² –17.419⁵⁷² 2-graph\*?

+ 1147 216 60 36 30¹⁸⁵ –6⁹⁶¹ S(2,6,186)

930 749 775 5⁹⁶¹ –31¹⁸⁵ pg(30,30,25)?

? 1148 481 210 195 26³²⁸ –11⁸¹⁹

666 379 396 10⁸¹⁹ –27³²⁸

- 1149 574 286 287 16.448⁵⁷⁴ –17.448⁵⁷⁴ Conf

? 1150 351 84 117 6⁹⁸⁸ –39¹⁶¹ pg(9,38,3)?

798 563 532 38¹⁶¹ –7⁹⁸⁸

	v	k	λ	μ	r^f	s^g	comments
-	1101	550	274	275	16.091⁵⁵⁰	–17.091⁵⁵⁰	Conf
+	1105	80	15	5	15²⁷²	–5⁸³²	U(4,4) polar graph; GQ(16,4)
		1024	948	960	4⁸³²	–16²⁷²
?	1105	138	11	18	8⁷¹⁴	–15³⁹⁰
		966	845	840	14³⁹⁰	–9⁷¹⁴
?	1105	208	39	39	13⁵⁴⁴	–13⁵⁶⁰	pg(16,12,3)?
		896	726	728	12⁵⁶⁰	–14⁵⁴⁴
?	1105	336	95	105	11⁷¹⁴	–21³⁹⁰	pg(16,20,5)?
		768	536	528	20³⁹⁰	–12⁷¹⁴
?	1105	378	135	126	21³⁹⁰	–12⁷¹⁴
		726	473	484	11⁷¹⁴	–22³⁹⁰	S(2,22,715)?
?	1105	552	275	276	16.121⁵⁵²	–17.121⁵⁵²	2-graph\*?
?	1106	340	114	100	24³¹⁵	–10⁷⁹⁰	S(2,10,316)?
		765	524	540	9⁷⁹⁰	–25³¹⁵
?	1106	403	132	155	8⁸⁶⁸	–31²³⁷	pg(13,30,5)?
		702	453	432	30²³⁷	–9⁸⁶⁸
?	1106	465	208	186	31²³⁷	–9⁸⁶⁸
		640	360	384	8⁸⁶⁸	–32²³⁷
+	1107	378	117	135	9⁸¹⁹	–27²⁸⁷	NO^–(8,3)
		728	484	468	26²⁸⁷	–10⁸¹⁹
+	1109	554	276	277	16.151⁵⁵⁴	–17.151⁵⁵⁴	Paley(1109); 2-graph\*
?	1111	110	9	11	9⁶⁰⁵	–11⁵⁰⁵
		1000	900	900	10⁵⁰⁵	–10⁶⁰⁵
?	1112	396	135	144	12⁶⁹⁵	–21⁴¹⁶
		715	462	455	20⁴¹⁶	–13⁶⁹⁵
-	1113	556	277	278	16.181⁵⁵⁶	–17.181⁵⁵⁶	Conf
+	1116	245	70	49	28²¹⁶	–7⁸⁹⁹	S(2,7,217)
		870	673	696	6⁸⁹⁹	–29²¹⁶	pg(30,28,24)?
+	1117	558	278	279	16.211⁵⁵⁸	–17.211⁵⁵⁸	Paley(1117); 2-graph\*
?	1120	363	110	121	11⁷³⁵	–22³⁸⁴
		756	513	504	21³⁸⁴	–12⁷³⁵
+	1120	390	146	130	26³⁰⁰	–10⁸¹⁹	O⁺(8,3)
		729	468	486	9⁸¹⁹	–27³⁰⁰	pg(27,26,18) - Mathon
-	1121	560	279	280	16.241⁵⁶⁰	–17.241⁵⁶⁰	Conf
?	1122	209	16	44	5⁹⁶⁸	–33¹⁵³
		912	746	720	32¹⁵³	–6⁹⁶⁸
-	1125	228	3	57	3¹⁰⁶⁴	–57⁶⁰	Krein2
		896	724	672	56⁶⁰	–4¹⁰⁶⁴	Krein1
?	1125	288	78	72	18⁴⁴⁰	–12⁶⁸⁴	pg(24,11,6)?
		836	619	627	11⁶⁸⁴	–19⁴⁴⁰
?	1125	308	103	77	33¹⁸⁹	–7⁹³⁵
		816	584	612	6⁹³⁵	–34¹⁸⁹	pg(24,33,18)?
?	1125	562	280	281	16.271⁵⁶²	–17.271⁵⁶²	2-graph\*?
-	1127	486	165	243	3¹⁰⁸⁰	–81⁴⁶	Makhnev
		640	396	320	80⁴⁶	–4¹⁰⁸⁰
!	1128	92	46	4	44⁴⁷	–2¹⁰⁸⁰	Triangular graph T(48)
		1035	946	990	1¹⁰⁸⁰	–45⁴⁷	pg(23,44,22)?
?	1128	196	24	36	8⁷⁹⁸	–20³²⁹
		931	770	760	19³²⁹	–9⁷⁹⁸
?	1128	245	28	60	5⁹⁸⁷	–37¹⁴⁰
		882	696	666	36¹⁴⁰	–6⁹⁸⁷
?	1128	322	116	82	40¹⁴⁰	–6⁹⁸⁷
		805	564	600	5⁹⁸⁷	–41¹⁴⁰
-	1128	483	162	240	3¹⁰⁸¹	–81⁴⁶	Krein2; Absolute bound
		644	400	324	80⁴⁶	–4¹⁰⁸¹	Krein1; Absolute bound
-	1128	560	316	240	80⁴⁷	–4¹⁰⁸⁰
		567	246	324	3¹⁰⁸⁰	–81⁴⁷	no 2-graph\*
+	1129	564	281	282	16.300⁵⁶⁴	–17.300⁵⁶⁴	Paley(1129); 2-graph\*
?	1131	320	76	96	8⁸⁷⁰	–28²⁶⁰
		810	585	567	27²⁶⁰	–9⁸⁷⁰
-	1133	566	282	283	16.330⁵⁶⁶	–17.330⁵⁶⁶	Conf
?	1134	198	27	36	9⁷⁴⁸	–18³⁸⁵	pg(11,17,2)?
		935	772	765	17³⁸⁵	–10⁷⁴⁸
?	1134	206	43	36	17⁴¹²	–10⁷²¹
		927	756	765	9⁷²¹	–18⁴¹²
?	1134	275	40	75	5¹⁰⁰¹	–40¹³²
		858	657	624	39¹³²	–6¹⁰⁰¹
?	1134	308	82	84	14⁵⁹⁴	–16⁵³⁹
		825	600	600	15⁵³⁹	–15⁵⁹⁴
?	1134	385	112	140	7⁹³⁵	–35¹⁹⁸
		748	502	476	34¹⁹⁸	–8⁹³⁵
?	1134	412	166	140	34²⁰⁶	–8⁹²⁷
		721	448	476	7⁹²⁷	–35²⁰⁶
?	1134	418	157	152	19⁴⁶⁸	–14⁶⁶⁵
		715	448	455	13⁶⁶⁵	–20⁴⁶⁸
?	1134	528	252	240	24³⁶³	–12⁷⁷⁰
		605	316	330	11⁷⁷⁰	–25³⁶³
?	1135	216	45	40	16⁴⁵⁴	–11⁶⁸⁰
		918	741	748	10⁶⁸⁰	–17⁴⁵⁴
?	1135	238	45	51	11⁶⁸⁰	–17⁴⁵⁴
		896	708	704	16⁴⁵⁴	–12⁶⁸⁰
?	1136	280	108	56	56⁷¹	–4¹⁰⁶⁴
		855	630	684	3¹⁰⁶⁴	–57⁷¹	pg(15,56,12)?
-	1137	568	283	284	16.360⁵⁶⁸	–17.360⁵⁶⁸	Conf
?	1140	306	60	90	6⁹⁶⁹	–36¹⁷⁰
		833	616	588	35¹⁷⁰	–7⁹⁶⁹
?	1140	391	126	138	11⁷⁵⁹	–23³⁸⁰
		748	494	484	22³⁸⁰	–12⁷⁵⁹
?	1140	469	158	217	4¹⁰⁶⁴	–63⁷⁵
		670	417	360	62⁷⁵	–5¹⁰⁶⁴
?	1140	476	202	196	20⁴⁵⁵	–14⁶⁸⁴	S(2,14,456)?
		663	382	390	13⁶⁸⁴	–21⁴⁵⁵
?	1140	544	228	288	4¹⁰⁶⁴	–64⁷⁵
		595	338	280	63⁷⁵	–5¹⁰⁶⁴
-	1141	570	284	285	16.389⁵⁷⁰	–17.389⁵⁷⁰	Conf
?	1144	243	42	54	9⁷⁹²	–21³⁵¹
		900	710	700	20³⁵¹	–10⁷⁹²
?	1144	408	162	136	34²⁰⁸	–8⁹³⁵
		735	462	490	7⁹³⁵	–35²⁰⁸	pg(21,34,14)?
?	1144	495	206	220	11⁷⁸⁰	–25³⁶³
		648	372	360	24³⁶³	–12⁷⁸⁰
?	1145	572	285	286	16.419⁵⁷²	–17.419⁵⁷²	2-graph\*?
+	1147	216	60	36	30¹⁸⁵	–6⁹⁶¹	S(2,6,186)
		930	749	775	5⁹⁶¹	–31¹⁸⁵	pg(30,30,25)?
?	1148	481	210	195	26³²⁸	–11⁸¹⁹
		666	379	396	10⁸¹⁹	–27³²⁸
-	1149	574	286	287	16.448⁵⁷⁴	–17.448⁵⁷⁴	Conf
?	1150	351	84	117	6⁹⁸⁸	–39¹⁶¹	pg(9,38,3)?
		798	563	532	38¹⁶¹	–7⁹⁸⁸

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