K-Tuple Permissible Patterns

( A gift from my wife )

K-TUPLE

Permissible Patterns

"Mathematicians have tried in vain to this day to discover some order in the sequence of prime numbers, and we have no reason to believe that it is a mystery into which the mind will ever penetrate." Leonhard Euler

"A mathematician is a machine for turning coffee into theorems." Paul Erdös

findings using an exhaustive search
last update : 12-Sep-09

by : Thomas J Engelsma
Send comments, suggestions, or requests to
tom(at)opertech.com

Special thanks to Prof. Joerg Waldvogel and Mischa Kenn

"A mathematician is a blind man in a dark room looking for a black cat which isn't there." Charles Darwin

Tables and information concerning the Hardy-Littlewood conjecture that
p(x+y) - p(x) <= p (y)

This conjecture fails if the k-tuple conjecture is true with a value of y = 3159.
An admissible k-tuple of 447 primes can be created in an interval of 3159 integers,
while p(3159) = 446.

Exhaustive searching has verified the Hardy-Littlewood conjecture is true for intervals up to 2529.
Exhaustive searching has identified all maximum density k-tuple patterns in intervals of 3 to 2331.

2529 < y <= 3159

lower bound of 2529 < y (Apr 09)
upper bound of y <= 3159 (Feb 05)

Verified as maximum density
p(x+1417) - p(x) = p(1417) = 223
p(x+2529) - p(x) = p(2529) = 369
p(x+2655) - p(x) = p(2655) = 384

Patterns exist - not verified as maximum
p(x+3153) - p(x) = p(3153) = 446
p(x+3157) - p(x) = p(3157) = 446

List of residues for the 447-tuples of width 3159.
Calculations on the first occurrence of 447-tuples of width 3159.

Plot of k-p(w) versus width
Plot of k/p(w/2) versus ln(w)
Trophy Case - Table of first known widths for super-dense constellations
Linked Summary of k-tuple information up to width of 42741
Also, Summary as an entire text document (734k)

Papers on the
K-Tuples
Conjecture

-
-
-

Permissible Patterns of Primes (Sep 2009)
Primes in a Fixed Interval
Entropy of the Primes

Other K-tuple information:

Dense Admissible Sets by Daniel M. Gordon and Gene Rodemich
Admissible Prime Constellations by Tomas Oliveira e Silva
Primes in Tuples I by D.A. Goldston, J. Pintz, and Y. Yildirim
Prime Constellation Records by Jens Kruse Anderen
Definition of k-tuple entry from Prime Pages.
Definition of k-tuple entry from World of Mathematics.

Sequence ID A020497 from On-Line Encyclopedia of Integer Sequences.

Problem #47 on the Prime Puzzle and Problems page.
List of residues for 50-tuples, 100-tuples, 150-tuples, and 200-tuples.

Using an exhaustive search program, written in assembler, ALL minimum
width k-tuple variations have been identified for k-values of 1 through 342.
These k-values correspond to widths of 3 through 2331.
For k-values of 343 and larger, one or more variations of the listed k-tuple exist.

K-tuple patterns found

Current number of variations : 1,722,826 (widths of 1 to 5000)
Update History

Patterns from exhaustive search
thru width of 2331

Patterns known to exist
'a' initial pattern by Ralph Gasser/Prof. Joerg Waldvogel
'b' initial patterns by Mischa Kenn

k	w	k-p(w)	vars.
2	3	0	1
3	7	-1	2
4	9	0	1
5	13	-1	2
6	17	-1	1
7	21	-1	2
8	27	-1	3
9	31	-2	4
10	33	-1	2
11	37	-1	2
12	43	-2	2
13	49	-2	6
14	51	-1	2
15	57	-1	4
16	61	-2	2
17	67	-2	4
18	71	-2	2
19	77	-2	4
20	81	-2	2
21	85	-2	2
22	91	-2	4
23	95	-1	2
24	101	-2	4
25	111	-4	18
26	115	-4	2
27	121	-3	8
28	127	-3	10
29	131	-3	2
30	137	-3	2
31	141	-3	2
32	147	-2	4
33	153	-3	14
34	157	-3	20
35	159	-2	2
36	163	-2	2
37	169	-2	2
38	177	-2	6
39	183	-3	26
40	187	-2	26
41	189	-1	8
42	197	-3	2
43	201	-3	6
44	211	-3	18
45	213	-2	4
46	217	-1	4
47	227	-2	4
48	237	-3	2
49	241	-4	2
50	247	-3	22
51	253	-3	22
52	255	-2	2
53	265	-3	2
54	271	-4	26
55	273	-3	6
56	279	-3	6
57	283	-4	2
58	289	-3	2
59	301	-3	4
60	305	-2	2
61	311	-3	2
62	321	-4	6
63	325	-3	2
64	331	-3	2
65	337	-3	2
66	343	-2	2
67	351	-3	18
68	357	-3	2
69	367	-4	20
70	371	-3	2
71	379	-4	2
72	385	-4	2
73	391	-4	10
74	393	-3	2
75	399	-3	14
76	411	-4	14
77	421	-5	40
78	423	-4	8
79	427	-3	2
80	433	-4	14
81	439	-4	14
82	447	-4	16
83	451	-4	4
84	453	-3	2
85	463	-5	2
86	471	-5	60
87	477	-4	50
88	483	-4	2
89	487	-4	2
90	495	-4	2
91	505	-5	16
92	507	-4	2
93	513	-4	18
94	517	-3	12
95	519	-2	4
96	531	-3	4
97	537	-2	4
98	547	-3	4
99	553	-2	4
100	559	-2	4
101	573	-4	32
102	577	-4	8
103	579	-3	2
104	591	-3	46
105	601	-5	486
106	603	-4	50
107	607	-4	18
108	613	-4	24
109	617	-4	2
110	629	-4	6
111	635	-4	2
112	641	-4	4
113	647	-5	4
114	655	-5	10
115	657	-4	2
116	663	-5	4
117	673	-5	2
118	681	-5	4
119	687	-5	2
120	693	-5	2
121	703	-5	2
122	709	-5	4
123	715	-4	2
124	723	-4	2
125	733	-5	16
126	741	-5	26
127	747	-5	28
128	751	-5	6
129	761	-6	6
130	769	-6	2
131	775	-6	16
132	781	-5	30
133	785	-4	6
134	795	-4	2
135	805	-4	22
136	809	-4	4
137	813	-4	20
138	817	-3	18
139	819	-2	8
140	829	-5	6
141	841	-5	12
142	843	-4	6
143	849	-3	6
144	857	-4	24
145	865	-5	12
146	873	-4	2
147	879	-4	34
148	883	-5	18
149	893	-5	18
150	903	-4	22
151	909	-4	12
152	913	-4	10
153	927	-4	4
154	931	-4	8
155	935	-3	4
156	947	-5	10
157	953	-5	2
158	961	-4	2
159	971	-5	22
160	975	-4	20
161	987	-5	38
162	991	-5	14
163	999	-5	6
164	1003	-4	6
165	1013	-5	2
166	1023	-6	20
167	1027	-5	2
168	1033	-6	4
169	1037	-5	2
170	1045	-5	2
171	1051	-6	2
172	1059	-5	6

k	w	k-p(w)	vars.
173	1067	-6	6
174	1071	-6	6
175	1075	-5	6
176	1083	-4	14
177	1087	-4	14
178	1105	-7	6
179	1111	-7	6
180	1121	-7	4
181	1125	-7	6
182	1131	-7	6
183	1143	-6	8
184	1147	-5	4
185	1151	-5	2
186	1163	-6	2
187	1169	-5	2
188	1177	-5	24
189	1183	-5	6
190	1189	-5	4
191	1195	-5	8
192	1201	-5	12
193	1205	-4	4
194	1211	-3	4
195	1219	-4	4
196	1231	-6	26
197	1239	-6	408
198	1259	-7	24
199	1263	-6	16
200	1267	-5	8
201	1275	-4	14
202	1281	-5	8
203	1291	-7	8
204	1303	-9	30
205	1309	-9	2
206	1317	-8	108
207	1321	-9	88
208	1329	-9	4
209	1333	-8	2
210	1339	-7	4
211	1345	-6	6
212	1351	-5	10
213	1353	-4	2
214	1359	-3	2
215	1365	-3	4
216	1371	-3	4
217	1375	-3	2
218	1381	-3	2
219	1387	-2	2
220	1393	-1	2
221	1405	-1	8
222	1413	-1	10
223	1417	0	8
224	1433	-3	8
225	1441	-3	4
226	1449	-3	4
227	1457	-4	20
228	1463	-4	16
229	1471	-4	12
230	1477	-3	2
231	1483	-4	8
232	1487	-4	2
233	1495	-5	2
234	1509	-5	4
235	1513	-5	2
236	1523	-5	2
237	1531	-5	2
238	1537	-4	4
239	1553	-6	14
240	1561	-6	114
241	1565	-5	20
242	1571	-6	12
243	1581	-6	2
244	1591	-6	16
245	1597	-6	6
246	1605	-6	12
247	1611	-7	8
248	1621	-9	6
249	1631	-9	12
250	1637	-9	10
251	1645	-8	10
252	1651	-7	6
253	1657	-7	24
254	1667	-8	72
255	1673	-8	46
256	1681	-7	152
257	1687	-6	92
258	1693	-6	46
259	1701	-7	92
260	1707	-6	46
261	1717	-6	88
262	1721	-6	6
263	1729	-6	20
264	1737	-6	10
265	1747	-7	12
266	1753	-7	50
267	1761	-7	38
268	1765	-6	12
269	1773	-5	68
270	1783	-6	96
271	1791	-7	50
272	1797	-6	4
273	1803	-6	4
274	1813	-6	44
275	1823	-6	28
276	1827	-5	4
277	1837	-5	32
278	1843	-4	56
279	1849	-4	24
280	1855	-3	8
281	1863	-3	8
282	1871	-4	12
283	1877	-5	12
284	1883	-5	12
285	1891	-5	20
286	1895	-4	8
287	1901	-4	8
288	1915	-5	8
289	1921	-4	8
290	1927	-3	8
291	1933	-4	16
292	1941	-3	16
293	1945	-2	16
294	1963	-3	8
295	1967	-2	2
296	1981	-3	58
297	1987	-3	34
298	1993	-3	98
299	2001	-4	80
300	2011	-5	258
301	2017	-5	24
302	2023	-4	158
303	2027	-4	6
304	2035	-4	6
305	2047	-4	20
306	2051	-3	4
307	2061	-3	4
308	2065	-3	4
309	2073	-3	6
310	2077	-2	6
311	2087	-4	4
312	2101	-5	36
313	2103	-4	2
314	2109	-3	2
315	2125	-4	2
316	2133	-5	1892
317 a	2137	-5	8
318	2145	-6	1182
319	2149	-5	724
320	2155	-5	632
321	2167	-5	174
322	2175	-4	2
323	2179	-4	2
324	2191	-3	260
325	2201	-2	170
326	2205	-2	66
327	2211	-2	66
328 a	2221	-3	6
329	2227	-2	292
330	2231	-1	146
331	2245	-3	770
332	2253	-3	506
333	2257	-2	48
334	2263	-1	1326
335	2267	-1	358
336	2271	-1	150
337	2287	-3	168
338	2299	-4	7940
339	2301	-3	40
340	2311	-4	40
341	2323	-3	2932
342	2329	-2	16

k	w	k-p(w)	vars.
343	2341	-4	98
344	2343	-3	40
345	2355	-4	142
346	2359	-4	142
347	2365	-3	38
348	2377	-4	54
349	2383	-5	16
350	2389	-5	10
351 a	2395	-5	2
352	2401	-5	20
353	2407	-4	24
354	2411	-4	8
355	2419	-4	8
356	2441	-6	92
357	2445	-5	2
358	2453	-5	44
359	2461	-5	44
360	2475	-6	18
361	2481	-6	36
362	2485	-5	12
363	2491	-4	18
364	2497	-3	12
365	2503	-3	18
366	2517	-2	24
367	2521	-2	12
368	2523	-1	6
369 a	2529	0	10
370	2545	-2	12
371	2551	-3	28
372	2557	-3	16
373 a	2583	-3	18
374	2587	-2	18
375	2593	-3	12
376	2601	-2	76
377	2611	-2	156
378	2613	-1	52
379	2619	-1	40
380	2631	-1	38
381	2643	-1	38
382	2653	-1	74
383 a	2655	0	18
384	2661	-1	6
385	2675	-2	396
386	2685	-3	138
387	2691	-4	120
388	2703	-5	96
389	2707	-5	70
390	2713	-6	26
391	2719	-6	6
392	2731	-7	84
393	2733	-6	4
394 a	2737	-5	4
395	2751	-6	6
396 a	2757	-6	2
397	2763	-5	8
398	2773	-5	8
399	2787	-5	14
400	2791	-6	14
401	2797	-6	6
402	2807	-7	2
403	2819	-7	2
404	2823	-6	4
405 b	2827	-5	2
406	2841	-6	6
407	2849	-6	2
408	2855	-6	2
409	2861	-7	90
410	2865	-6	4
411 b	2869	-5	2
412	2887	-6	40
413	2891	-5	20
414 b	2901	-5	2
415 b	2907	-5	2
416	2917	-6	212
417	2925	-5	2
418 a	2929	-5	2
419	2939	-5	2
420	2951	-4	24
421 b	2957	-5	22
422	2967	-5	74
423	2973	-6	56
424	2977	-5	32
425 a	2991	-4	44
426	2995	-3	2
427	3001	-4	2
428	3017	-4	58
429	3025	-5	50
430 a	3031	-4	80
431 b	3035	-3	32
432 b	3039	-3	24
433 b	3043	-3	24
434 b	3053	-3	24
435	3073	-4	6318
436	3081	-4	88
437	3087	-4	88
438	3093	-4	82
439	3099	-3	70
440	3103	-2	70
441	3111	-2	314
442	3123	-3	48
443	3127	-2	48
444	3129	-1	22
445	3139	-1	22
446	3153	0	320
447	3159	1	12
448	3169	-1	20
449	3171	0	10
450	3177	1	10
451	3187	0	10
452	3193	0	10
453	3201	1	66
454	3211	0	132
455	3213	1	66
456	3219	1	66
457	3223	1	58
458	3237	1	116
459	3241	2	116
460	3243	3	58
461	3277	-1	58
462	3289	0	58
463	3303	-1	130
464	3307	-1	102
465	3309	0	40
466	3319	-1	82
467	3321	0	34
468	3327	0	24
469	3337	-1	24
470	3349	-2	24
471	3363	-3	24
472	3369	-2	2
473	3377	-3	10
474	3383	-2	10
475	3397	-3	256
476	3403	-2	228
477	3409	-2	200
478	3421	-2	288
479	3423	-1	126
480	3429	0	126
481	3433	0	126
482	3445	1	1024
483	3451	1	1024
484	3463	-1	1536
485	3469	-2	442
486	3481	-1	460
487	3489	0	14
488	3493	0	2
489	3501	0	12
490	3507	1	12
491	3515	1	2
492	3531	-1	2784
493	3535	-1	2046
494	3547	-3	424
495	3557	-3	424
496	3565	-3	216
497	3571	-3	2046
498	3583	-4	388
499	3587	-3	24
500	3595	-3	96
501	3605	-2	40
502	3613	-3	40
503	3623	-4	22
504	3631	-4	16
505	3641	-4	16
506	3649	-4	16
507	3655	-3	2

k	w	k-p(w)	vars.
508	3661	-3	10
509	3667	-2	4
510	3671	-2	2
511	3685	-3	100
512	3691	-3	358
513	3697	-3	542
514	3701	-3	90
515	3707	-2	90
516	3723	-3	42
517	3727	-3	22
518	3739	-4	224
519	3741	-3	40
520	3751	-2	40
521	3763	-2	544
522	3771	-3	40
523	3781	-3	528
524	3787	-2	644
525	3789	-1	40
526	3811	-3	160
527	3813	-2	24
528	3817	-1	18
529	3837	-3	26
530	3841	-2	4
531	3843	-1	2
532	3865	-4	90
533	3873	-3	2
534	3879	-3	28
535	3883	-3	2
536	3897	-3	26
537	3901	-2	26
538	3911	-3	26
539	3919	-4	16
540	3921	-3	2
541	3927	-3	2
542	3939	-4	14
543	3949	-5	16
544	3951	-4	2
545	3957	-3	2
546	3961	-2	2
547	3969	-2	208
548	3979	-1	208
549	3997	-1	6
550	4003	-2	26
551	4015	-3	68
552	4021	-4	40
553	4025	-3	20
554	4037	-3	4
555	4043	-2	4
556	4051	-3	94
557	4053	-2	44
558	4059	-2	4
559	4063	-1	4
560	4083	-2	480
561	4089	-1	480
562	4093	-2	480
563	4099	-2	234
564	4111	-2	422
565 a	4113	-1	210
566	4117	0	2
567	4137	-2	2
568	4153	-3	1098
569	4161	-4	1260
570	4167	-3	1114
571	4177	-3	1110
572	4183	-2	20078
573	4189	-1	3136
574	4191	0	1504
575 a	4197	1	1504
576	4209	1	1502
577	4221	-1	1372
578	4237	-2	6576
579	4239	-1	2680
580	4249	-2	2724
581	4257	-2	2760
582	4261	-3	2750
583	4263	-2	36
584	4281	-3	32
585	4287	-3	32
586	4293	-3	8
587	4303	-3	40
588	4311	-2	2
589	4317	-1	2
590	4323	0	2
591	4327	0	2
592	4333	1	2
593	4341	0	4
594	4347	1	4
595	4351	1	4
596	4353	2	2
597	4363	1	2
598	4369	2	2
599	4377	2	34
600	4381	3	32
601	4399	2	32
602	4417	2	2
603	4423	1	32
604	4429	2	32
605	4441	2	34
606	4451	1	34
607	4457	1	2
608	4465	1	66
609	4469	2	32
610	4483	1	32
611	4493	1	34
612	4501	2	64
613	4505	3	30
614	4519	0	346
615	4527	0	316
616	4533	1	284
617	4547	1	2
618	4553	1	2
619	4557	2	2
620	4561	2	2
621	4571	2	2
622	4577	3	2
623	4585	3	62
624	4589	4	30
625	4603	2	30
626	4627	2	42
627	4639	1	30
628	4645	1	28
629	4651	0	28
630	4661	0	28
631	4669	0	218
632	4681	-1	426
633	4687	0	92
634	4693	0	4
635	4697	1	2
636	4705	1	2
637	4711	2	2
638	4723	1	2
639	4735	0	1048
640	4743	1	4
641	4747	2	4
642	4763	1	2010
643	4767	2	4
644	4775	3	1798
645	4789	1	1580
646	4799	0	400
647	4805	0	400
648	4813	0	376
649	4821	0	2
650	4831	0	28
651	4837	1	2
652	4843	2	24
653	4849	3	24
654	4857	4	2
655	4861	4	2
656	4871	4	2
657	4875	5	2
658	4885	5	28
659	4891	5	2
660	4899	6	24
661	4915	5	24
662	4925	5	6722
663	4933	4	2
664	4941	4	4
665	4945	4	2
666	4953	4	2
667	4957	4	2
668	4967	4	682
669	4973	3	2
670	4981	4	22
671	4991	4	2
672	4999	3	24