Strongly regular graphs

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v k λ μ r^f s^g comments

? 451 130 33 39 7²⁸⁶ –13¹⁶⁴ pg(10,12,3)?

320 228 224 12¹⁶⁴ –8²⁸⁶

? 451 156 57 52 13¹⁶⁴ –8²⁸⁶

294 189 196 7²⁸⁶ –14¹⁶⁴ S(2,14,287)?

- 453 226 112 113 10.142²²⁶ –11.142²²⁶ Conf

- 456 35 10 2 11⁹⁵ –3³⁶⁰ μ=2 (Brouwer-Neumaier)

420 386 396 2³⁶⁰ –12⁹⁵

? 456 65 10 9 8²⁰⁸ –7²⁴⁷

390 333 336 6²⁴⁷ –9²⁰⁸

? 456 80 4 16 4³⁶⁰ –16⁹⁵

375 310 300 15⁹⁵ –5³⁶⁰

- 456 91 2 22 3³⁹⁹ –23⁵⁶ Krein2

364 294 276 22⁵⁶ –4³⁹⁹ Krein1

? 456 104 22 24 8²⁴⁷ –10²⁰⁸

351 270 270 9²⁰⁸ –9²⁴⁷

? 456 130 24 42 4³⁸⁰ –22⁷⁵

325 236 220 21⁷⁵ –5³⁸⁰

? 456 140 40 44 8²⁶⁶ –12¹⁸⁹

315 218 216 11¹⁸⁹ –9²⁶⁶

? 456 140 58 36 26⁵⁶ –4³⁹⁹

315 210 234 3³⁹⁹ –27⁵⁶

? 456 175 78 60 23⁷⁵ –5³⁸⁰

280 164 184 4³⁸⁰ –24⁷⁵

? 456 182 73 72 11²⁰⁸ –10²⁴⁷

273 162 165 9²⁴⁷ –12²⁰⁸

? 456 195 74 90 5³⁶⁰ –21⁹⁵

260 154 140 20⁹⁵ –6³⁶⁰

+ 457 228 113 114 10.189²²⁸ –11.189²²⁸ Paley(457); 2-graph\*

? 459 208 82 104 4³⁹⁰ –26⁶⁸ pg(8,25,4)?; 2-graph\*?

250 145 125 25⁶⁸ –5³⁹⁰ 2-graph\*?

? 460 85 18 15 10¹⁸⁴ –7²⁷⁵

374 303 308 6²⁷⁵ –11¹⁸⁴

? 460 99 18 22 7²⁷⁵ –11¹⁸⁴ pg(9,10,2)?

360 282 280 10¹⁸⁴ –8²⁷⁵

? 460 147 42 49 7²⁹⁹ –14¹⁶⁰

312 213 208 13¹⁶⁰ –8²⁹⁹

- 460 153 32 60 3⁴¹⁴ –31⁴⁵ Bondarenko et al.

306 212 186 30⁴⁵ –4⁴¹⁴

? 460 204 78 100 4³⁹¹ –26⁶⁸ 2-graph?

255 150 130 25⁶⁸ –5³⁹¹ 2-graph?

? 460 216 116 88 32⁴⁵ –4⁴¹⁴

243 114 144 3⁴¹⁴ –33⁴⁵

? 460 225 120 100 25⁶⁹ –5³⁹⁰ 2-graph?

234 108 130 4³⁹⁰ –26⁶⁹ pg(9,25,5)?; 2-graph?

+ 461 230 114 115 10.235²³⁰ –11.235²³⁰ Paley(461); 2-graph\*

! 465 58 29 4 27³⁰ –2⁴³⁴ Triangular graph T(31)

406 351 378 1⁴³⁴ –28³⁰

? 465 144 43 45 9²⁴⁸ –11²¹⁶

320 220 220 10²¹⁶ –10²⁴⁸

? 465 192 72 84 6³⁴⁰ –18¹²⁴

272 163 153 17¹²⁴ –7³⁴⁰

- 465 232 115 116 10.282²³² –11.282²³² Conf

- 469 234 116 117 10.328²³⁴ –11.328²³⁴ Conf

? 470 126 27 36 6³²⁹ –15¹⁴⁰

343 252 245 14¹⁴⁰ –7³²⁹

- 473 236 117 118 10.374²³⁶ –11.374²³⁶ Conf

? 474 165 52 60 7³¹⁵ –15¹⁵⁸

308 202 196 14¹⁵⁸ –8³¹⁵

? 475 90 25 15 15¹¹⁴ –5³⁶⁰ pg(18,4,3) does not exist (Absolute bound for line graph)

384 308 320 4³⁶⁰ –16¹¹⁴

+ 475 96 32 16 20⁷⁵ –4³⁹⁹ S(2,4,76)

378 297 315 3³⁹⁹ –21⁷⁵ pg(18,20,15)?

? 476 133 42 35 14¹⁵² –7³²³

342 243 252 6³²³ –15¹⁵²

? 476 133 60 28 35³⁴ –3⁴⁴¹

342 236 270 2⁴⁴¹ –36³⁴

? 477 140 31 45 5³⁷¹ –19¹⁰⁵

336 240 228 18¹⁰⁵ –6³⁷¹

? 477 168 57 60 9²⁶⁴ –12²¹²

308 199 198 11²¹² –10²⁶⁴

? 477 238 118 119 10.420²³⁸ –11.420²³⁸ 2-graph\*?

? 481 240 119 120 10.466²⁴⁰ –11.466²⁴⁰ 2-graph\*?

? 483 240 118 120 10²⁵² –12²³⁰ pg(20,11,10)?; 2-graph\*?

242 121 121 11²³⁰ –11²⁵² S(2,11,231)?; 2-graph\*?

! 484 42 20 2 20⁴² –2⁴⁴¹ 22²

441 400 420 1⁴⁴¹ –21⁴² OA(22,21)?

+ 484 63 22 6 19⁶³ –3⁴²⁰ OA(22,3)

420 362 380 2⁴²⁰ –20⁶³ OA(22,20)?

+ 484 84 26 12 18⁸⁴ –4³⁹⁹ OA(22,4)

399 326 342 3³⁹⁹ –19⁸⁴ OA(22,19)?

? 484 92 6 20 4³⁹¹ –18⁹²

391 318 306 17⁹² –5³⁹¹

? 484 105 14 25 5³⁶³ –16¹²⁰

378 297 288 15¹²⁰ –6³⁶³

+ 484 105 32 20 17¹⁰⁵ –5³⁷⁸ OA(22,5)

378 292 306 4³⁷⁸ –18¹⁰⁵ OA(22,18)?

? 484 115 18 30 5³⁶⁸ –17¹¹⁵

368 282 272 16¹¹⁵ –6³⁶⁸

? 484 126 40 30 16¹²⁶ –6³⁵⁷ OA(22,6)?

357 260 272 5³⁵⁷ –17¹²⁶ OA(22,17)?

- 484 135 18 45 3⁴³⁵ –30⁴⁸ Krein2

348 257 232 29⁴⁸ –4⁴³⁵ Krein1

? 484 138 32 42 6³⁴⁵ –16¹³⁸

345 248 240 15¹³⁸ –7³⁴⁵

+ 484 138 47 36 17¹²⁰ –6³⁶³ S(2,6,121)

345 242 255 5³⁶³ –18¹²⁰

? 484 147 50 42 15¹⁴⁷ –7³³⁶ OA(22,7)?

336 230 240 6³³⁶ –16¹⁴⁷ OA(22,16)?

? 484 161 48 56 7³²² –15¹⁶¹

322 216 210 14¹⁶¹ –8³²²

? 484 168 62 56 14¹⁶⁸ –8³¹⁵ OA(22,8)?

315 202 210 7³¹⁵ –15¹⁶⁸ OA(22,15)?

? 484 184 66 72 8²⁹⁹ –14¹⁸⁴

299 186 182 13¹⁸⁴ –9²⁹⁹

? 484 189 76 72 13¹⁸⁹ –9²⁹⁴ OA(22,9)?

294 176 182 8²⁹⁴ –14¹⁸⁹ OA(22,14)?

? 484 207 86 90 9²⁷⁶ –13²⁰⁷

276 158 156 12²⁰⁷ –10²⁷⁶

? 484 210 92 90 12²¹⁰ –10²⁷³ OA(22,10)?

273 152 156 9²⁷³ –13²¹⁰ OA(22,13)?

? 484 230 108 110 10²⁵³ –12²³⁰ RSHCD^–?; 2-graph?

253 132 132 11²³⁰ –11²⁵³ 2-graph?

? 484 231 110 110 11²³¹ –11²⁵² OA(22,11)?; RSHCD⁺?; 2-graph?

252 130 132 10²⁵² –12²³¹ OA(22,12)?; 2-graph?

? 485 242 120 121 10.511²⁴² –11.511²⁴² 2-graph\*?

? 486 97 16 20 7²⁹¹ –11¹⁹⁴

388 310 308 10¹⁹⁴ –8²⁹¹

? 486 100 22 20 10²¹⁰ –8²⁷⁵

385 304 308 7²⁷⁵ –11²¹⁰

- 486 165 36 66 3⁴⁴⁰ –33⁴⁵ Makhnev

320 220 192 32⁴⁵ –4⁴⁴⁰

? 486 194 67 84 5³⁸⁸ –22⁹⁷

291 180 165 21⁹⁷ –6³⁸⁸

? 486 210 99 84 21¹⁰⁰ –6³⁸⁵

275 148 165 5³⁸⁵ –22¹⁰⁰

- 489 244 121 122 10.557²⁴⁴ –11.557²⁴⁴ Conf

? 490 144 28 48 4⁴¹⁴ –24⁷⁵ pg(6,23,2)?

345 248 230 23⁷⁵ –5⁴¹⁴

? 490 165 56 55 11²²⁵ –10²⁶⁴

324 213 216 9²⁶⁴ –12²²⁵

? 490 192 92 64 32⁴⁹ –4⁴⁴⁰

297 168 198 3⁴⁴⁰ –33⁴⁹ pg(9,32,6)?

? 493 246 122 123 10.602²⁴⁶ –11.602²⁴⁶ 2-graph\*?

? 494 85 12 15 7²⁸⁵ –10²⁰⁸

408 337 336 9²⁰⁸ –8²⁸⁵

? 495 38 1 3 5²⁸⁵ –7²⁰⁹

456 420 420 6²⁰⁹ –6²⁸⁵

+ 495 78 29 9 23⁵⁴ –3⁴⁴⁰ S(2,3,55)

416 346 368 2⁴⁴⁰ –24⁵⁴

? 495 104 28 20 14¹⁴³ –6³⁵¹

390 305 315 5³⁵¹ –15¹⁴³

? 495 190 53 85 3⁴⁵⁰ –35⁴⁴

304 198 168 34⁴⁴ –4⁴⁵⁰

? 495 190 85 65 25⁷⁶ –5⁴¹⁸

304 178 200 4⁴¹⁸ –26⁷⁶

? 495 208 86 88 10²⁶⁰ –12²³⁴

286 165 165 11²³⁴ –11²⁶⁰

- 495 208 130 56 76¹⁰ –2⁴⁸⁴ Absolute bound

286 133 209 1⁴⁸⁴ –77¹⁰ Absolute bound

? 495 234 93 126 3⁴⁵⁰ –36⁴⁴

260 151 120 35⁴⁴ –4⁴⁵⁰

+ 495 238 109 119 7³⁴⁰ –17¹⁵⁴ dist. 2 or 4 in J(12,4) - Mathon; O^–(10,2) polar graph; pg(14,16,7)?; 2-graph\*

256 136 128 16¹⁵⁴ –8³⁴⁰ 2-graph\*

? 496 54 4 6 6²⁷⁹ –8²¹⁶

441 392 392 7²¹⁶ –7²⁷⁹

! 496 60 30 4 28³¹ –2⁴⁶⁴ Triangular graph T(32)

435 378 406 1⁴⁶⁴ –29³¹ pg(15,28,14)?

? 496 110 18 26 6³⁴¹ –14¹⁵⁴

385 300 294 13¹⁵⁴ –7³⁴¹

? 496 135 38 36 11²¹⁶ –9²⁷⁹ pg(15,8,4)?

360 260 264 8²⁷⁹ –12²¹⁶

- 496 165 80 42 41³⁰ –3⁴⁶⁵ Absolute bound

330 206 246 2⁴⁶⁵ –42³⁰ Absolute bound

? 496 198 80 78 12²¹⁶ –10²⁷⁹

297 176 180 9²⁷⁹ –13²¹⁶

? 496 231 102 112 7³⁴¹ –17¹⁵⁴ 2-graph?

264 144 136 16¹⁵⁴ –8³⁴¹ 2-graph?

+ 496 240 120 112 16¹⁵⁵ –8³⁴⁰ Wallis (AR(2,4)+S(2,3,31)); 2-graph

255 126 136 7³⁴⁰ –17¹⁵⁵ NO⁺(10,2); Goethals-Seidel(3,15); pg(15,16,8)?; 2-graph

? 497 186 55 78 4⁴²⁶ –27⁷⁰

310 201 180 26⁷⁰ –5⁴²⁶

? 497 240 127 105 27⁷⁰ –5⁴²⁶

256 120 144 4⁴²⁶ –28⁷⁰

- 497 248 123 124 10.647²⁴⁸ –11.647²⁴⁸ Conf

? 498 161 64 46 23⁸³ –5⁴¹⁴

336 220 240 4⁴¹⁴ –24⁸³

	v	k	λ	μ	r^f	s^g	comments
?	451	130	33	39	7²⁸⁶	–13¹⁶⁴	pg(10,12,3)?
		320	228	224	12¹⁶⁴	–8²⁸⁶
?	451	156	57	52	13¹⁶⁴	–8²⁸⁶
		294	189	196	7²⁸⁶	–14¹⁶⁴	S(2,14,287)?
-	453	226	112	113	10.142²²⁶	–11.142²²⁶	Conf
-	456	35	10	2	11⁹⁵	–3³⁶⁰	μ=2 (Brouwer-Neumaier)
		420	386	396	2³⁶⁰	–12⁹⁵
?	456	65	10	9	8²⁰⁸	–7²⁴⁷
		390	333	336	6²⁴⁷	–9²⁰⁸
?	456	80	4	16	4³⁶⁰	–16⁹⁵
		375	310	300	15⁹⁵	–5³⁶⁰
-	456	91	2	22	3³⁹⁹	–23⁵⁶	Krein2
		364	294	276	22⁵⁶	–4³⁹⁹	Krein1
?	456	104	22	24	8²⁴⁷	–10²⁰⁸
		351	270	270	9²⁰⁸	–9²⁴⁷
?	456	130	24	42	4³⁸⁰	–22⁷⁵
		325	236	220	21⁷⁵	–5³⁸⁰
?	456	140	40	44	8²⁶⁶	–12¹⁸⁹
		315	218	216	11¹⁸⁹	–9²⁶⁶
?	456	140	58	36	26⁵⁶	–4³⁹⁹
		315	210	234	3³⁹⁹	–27⁵⁶
?	456	175	78	60	23⁷⁵	–5³⁸⁰
		280	164	184	4³⁸⁰	–24⁷⁵
?	456	182	73	72	11²⁰⁸	–10²⁴⁷
		273	162	165	9²⁴⁷	–12²⁰⁸
?	456	195	74	90	5³⁶⁰	–21⁹⁵
		260	154	140	20⁹⁵	–6³⁶⁰
+	457	228	113	114	10.189²²⁸	–11.189²²⁸	Paley(457); 2-graph\*
?	459	208	82	104	4³⁹⁰	–26⁶⁸	pg(8,25,4)?; 2-graph\*?
		250	145	125	25⁶⁸	–5³⁹⁰	2-graph\*?
?	460	85	18	15	10¹⁸⁴	–7²⁷⁵
		374	303	308	6²⁷⁵	–11¹⁸⁴
?	460	99	18	22	7²⁷⁵	–11¹⁸⁴	pg(9,10,2)?
		360	282	280	10¹⁸⁴	–8²⁷⁵
?	460	147	42	49	7²⁹⁹	–14¹⁶⁰
		312	213	208	13¹⁶⁰	–8²⁹⁹
-	460	153	32	60	3⁴¹⁴	–31⁴⁵	Bondarenko et al.
		306	212	186	30⁴⁵	–4⁴¹⁴
?	460	204	78	100	4³⁹¹	–26⁶⁸	2-graph?
		255	150	130	25⁶⁸	–5³⁹¹	2-graph?
?	460	216	116	88	32⁴⁵	–4⁴¹⁴
		243	114	144	3⁴¹⁴	–33⁴⁵
?	460	225	120	100	25⁶⁹	–5³⁹⁰	2-graph?
		234	108	130	4³⁹⁰	–26⁶⁹	pg(9,25,5)?; 2-graph?
+	461	230	114	115	10.235²³⁰	–11.235²³⁰	Paley(461); 2-graph\*
!	465	58	29	4	27³⁰	–2⁴³⁴	Triangular graph T(31)
		406	351	378	1⁴³⁴	–28³⁰
?	465	144	43	45	9²⁴⁸	–11²¹⁶
		320	220	220	10²¹⁶	–10²⁴⁸
?	465	192	72	84	6³⁴⁰	–18¹²⁴
		272	163	153	17¹²⁴	–7³⁴⁰
-	465	232	115	116	10.282²³²	–11.282²³²	Conf
-	469	234	116	117	10.328²³⁴	–11.328²³⁴	Conf
?	470	126	27	36	6³²⁹	–15¹⁴⁰
		343	252	245	14¹⁴⁰	–7³²⁹
-	473	236	117	118	10.374²³⁶	–11.374²³⁶	Conf
?	474	165	52	60	7³¹⁵	–15¹⁵⁸
		308	202	196	14¹⁵⁸	–8³¹⁵
?	475	90	25	15	15¹¹⁴	–5³⁶⁰	pg(18,4,3) does not exist (Absolute bound for line graph)
		384	308	320	4³⁶⁰	–16¹¹⁴
+	475	96	32	16	20⁷⁵	–4³⁹⁹	S(2,4,76)
		378	297	315	3³⁹⁹	–21⁷⁵	pg(18,20,15)?
?	476	133	42	35	14¹⁵²	–7³²³
		342	243	252	6³²³	–15¹⁵²
?	476	133	60	28	35³⁴	–3⁴⁴¹
		342	236	270	2⁴⁴¹	–36³⁴
?	477	140	31	45	5³⁷¹	–19¹⁰⁵
		336	240	228	18¹⁰⁵	–6³⁷¹
?	477	168	57	60	9²⁶⁴	–12²¹²
		308	199	198	11²¹²	–10²⁶⁴
?	477	238	118	119	10.420²³⁸	–11.420²³⁸	2-graph\*?
?	481	240	119	120	10.466²⁴⁰	–11.466²⁴⁰	2-graph\*?
?	483	240	118	120	10²⁵²	–12²³⁰	pg(20,11,10)?; 2-graph\*?
		242	121	121	11²³⁰	–11²⁵²	S(2,11,231)?; 2-graph\*?
!	484	42	20	2	20⁴²	–2⁴⁴¹	22²
		441	400	420	1⁴⁴¹	–21⁴²	OA(22,21)?
+	484	63	22	6	19⁶³	–3⁴²⁰	OA(22,3)
		420	362	380	2⁴²⁰	–20⁶³	OA(22,20)?
+	484	84	26	12	18⁸⁴	–4³⁹⁹	OA(22,4)
		399	326	342	3³⁹⁹	–19⁸⁴	OA(22,19)?
?	484	92	6	20	4³⁹¹	–18⁹²
		391	318	306	17⁹²	–5³⁹¹
?	484	105	14	25	5³⁶³	–16¹²⁰
		378	297	288	15¹²⁰	–6³⁶³
+	484	105	32	20	17¹⁰⁵	–5³⁷⁸	OA(22,5)
		378	292	306	4³⁷⁸	–18¹⁰⁵	OA(22,18)?
?	484	115	18	30	5³⁶⁸	–17¹¹⁵
		368	282	272	16¹¹⁵	–6³⁶⁸
?	484	126	40	30	16¹²⁶	–6³⁵⁷	OA(22,6)?
		357	260	272	5³⁵⁷	–17¹²⁶	OA(22,17)?
-	484	135	18	45	3⁴³⁵	–30⁴⁸	Krein2
		348	257	232	29⁴⁸	–4⁴³⁵	Krein1
?	484	138	32	42	6³⁴⁵	–16¹³⁸
		345	248	240	15¹³⁸	–7³⁴⁵
+	484	138	47	36	17¹²⁰	–6³⁶³	S(2,6,121)
		345	242	255	5³⁶³	–18¹²⁰
?	484	147	50	42	15¹⁴⁷	–7³³⁶	OA(22,7)?
		336	230	240	6³³⁶	–16¹⁴⁷	OA(22,16)?
?	484	161	48	56	7³²²	–15¹⁶¹
		322	216	210	14¹⁶¹	–8³²²
?	484	168	62	56	14¹⁶⁸	–8³¹⁵	OA(22,8)?
		315	202	210	7³¹⁵	–15¹⁶⁸	OA(22,15)?
?	484	184	66	72	8²⁹⁹	–14¹⁸⁴
		299	186	182	13¹⁸⁴	–9²⁹⁹
?	484	189	76	72	13¹⁸⁹	–9²⁹⁴	OA(22,9)?
		294	176	182	8²⁹⁴	–14¹⁸⁹	OA(22,14)?
?	484	207	86	90	9²⁷⁶	–13²⁰⁷
		276	158	156	12²⁰⁷	–10²⁷⁶
?	484	210	92	90	12²¹⁰	–10²⁷³	OA(22,10)?
		273	152	156	9²⁷³	–13²¹⁰	OA(22,13)?
?	484	230	108	110	10²⁵³	–12²³⁰	RSHCD^–?; 2-graph?
		253	132	132	11²³⁰	–11²⁵³	2-graph?
?	484	231	110	110	11²³¹	–11²⁵²	OA(22,11)?; RSHCD⁺?; 2-graph?
		252	130	132	10²⁵²	–12²³¹	OA(22,12)?; 2-graph?
?	485	242	120	121	10.511²⁴²	–11.511²⁴²	2-graph\*?
?	486	97	16	20	7²⁹¹	–11¹⁹⁴
		388	310	308	10¹⁹⁴	–8²⁹¹
?	486	100	22	20	10²¹⁰	–8²⁷⁵
		385	304	308	7²⁷⁵	–11²¹⁰
-	486	165	36	66	3⁴⁴⁰	–33⁴⁵	Makhnev
		320	220	192	32⁴⁵	–4⁴⁴⁰
?	486	194	67	84	5³⁸⁸	–22⁹⁷
		291	180	165	21⁹⁷	–6³⁸⁸
?	486	210	99	84	21¹⁰⁰	–6³⁸⁵
		275	148	165	5³⁸⁵	–22¹⁰⁰
-	489	244	121	122	10.557²⁴⁴	–11.557²⁴⁴	Conf
?	490	144	28	48	4⁴¹⁴	–24⁷⁵	pg(6,23,2)?
		345	248	230	23⁷⁵	–5⁴¹⁴
?	490	165	56	55	11²²⁵	–10²⁶⁴
		324	213	216	9²⁶⁴	–12²²⁵
?	490	192	92	64	32⁴⁹	–4⁴⁴⁰
		297	168	198	3⁴⁴⁰	–33⁴⁹	pg(9,32,6)?
?	493	246	122	123	10.602²⁴⁶	–11.602²⁴⁶	2-graph\*?
?	494	85	12	15	7²⁸⁵	–10²⁰⁸
		408	337	336	9²⁰⁸	–8²⁸⁵
?	495	38	1	3	5²⁸⁵	–7²⁰⁹
		456	420	420	6²⁰⁹	–6²⁸⁵
+	495	78	29	9	23⁵⁴	–3⁴⁴⁰	S(2,3,55)
		416	346	368	2⁴⁴⁰	–24⁵⁴
?	495	104	28	20	14¹⁴³	–6³⁵¹
		390	305	315	5³⁵¹	–15¹⁴³
?	495	190	53	85	3⁴⁵⁰	–35⁴⁴
		304	198	168	34⁴⁴	–4⁴⁵⁰
?	495	190	85	65	25⁷⁶	–5⁴¹⁸
		304	178	200	4⁴¹⁸	–26⁷⁶
?	495	208	86	88	10²⁶⁰	–12²³⁴
		286	165	165	11²³⁴	–11²⁶⁰
-	495	208	130	56	76¹⁰	–2⁴⁸⁴	Absolute bound
		286	133	209	1⁴⁸⁴	–77¹⁰	Absolute bound
?	495	234	93	126	3⁴⁵⁰	–36⁴⁴
		260	151	120	35⁴⁴	–4⁴⁵⁰
+	495	238	109	119	7³⁴⁰	–17¹⁵⁴	dist. 2 or 4 in J(12,4) - Mathon; O^–(10,2) polar graph; pg(14,16,7)?; 2-graph\*
		256	136	128	16¹⁵⁴	–8³⁴⁰	2-graph\*
?	496	54	4	6	6²⁷⁹	–8²¹⁶
		441	392	392	7²¹⁶	–7²⁷⁹
!	496	60	30	4	28³¹	–2⁴⁶⁴	Triangular graph T(32)
		435	378	406	1⁴⁶⁴	–29³¹	pg(15,28,14)?
?	496	110	18	26	6³⁴¹	–14¹⁵⁴
		385	300	294	13¹⁵⁴	–7³⁴¹
?	496	135	38	36	11²¹⁶	–9²⁷⁹	pg(15,8,4)?
		360	260	264	8²⁷⁹	–12²¹⁶
-	496	165	80	42	41³⁰	–3⁴⁶⁵	Absolute bound
		330	206	246	2⁴⁶⁵	–42³⁰	Absolute bound
?	496	198	80	78	12²¹⁶	–10²⁷⁹
		297	176	180	9²⁷⁹	–13²¹⁶
?	496	231	102	112	7³⁴¹	–17¹⁵⁴	2-graph?
		264	144	136	16¹⁵⁴	–8³⁴¹	2-graph?
+	496	240	120	112	16¹⁵⁵	–8³⁴⁰	Wallis (AR(2,4)+S(2,3,31)); 2-graph
		255	126	136	7³⁴⁰	–17¹⁵⁵	NO⁺(10,2); Goethals-Seidel(3,15); pg(15,16,8)?; 2-graph
?	497	186	55	78	4⁴²⁶	–27⁷⁰
		310	201	180	26⁷⁰	–5⁴²⁶
?	497	240	127	105	27⁷⁰	–5⁴²⁶
		256	120	144	4⁴²⁶	–28⁷⁰
-	497	248	123	124	10.647²⁴⁸	–11.647²⁴⁸	Conf
?	498	161	64	46	23⁸³	–5⁴¹⁴
		336	220	240	4⁴¹⁴	–24⁸³

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