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This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.

A084299 Smallest primes such that the subsequent terms of consecutive prime differences (A001223) modulo 6 (A054763) displays repeatedly n times a {0,2,4} pattern of remainders of differences.

Original entry on oeis.org

83, 2903, 5897, 319499, 346943, 7974179, 15262433, 33954251, 5521833683, 83993232497, 848099080883, 1293322433639
Offset: 1

Views

Author

Labos Elemer, Jun 02 2003

Keywords

Examples

			For n=1: a(1) = 83 is followed by [6,8,4].
For n=2: a(2) = 2903 is followed by [6,2,4,18,2,4].
For n=3: a(3) = 5897 is followed by [6,20,4,12,14,28,6,20,4].
For n=4: a(4) = 319499 is followed by [12,8,22,6,20,10,12,2,10,6,32,34].
For n=5: a(5) = 346943 is followed by [18,2,40,....,30,2,10] differences corresponding to n "wavelet" of [0,2,4] remainders modulo 6.

Crossrefs

Cf. A001223, A054763, A016045.

Programs

  • Mathematica
    (* generates a(5) *) d[x_] := Prime[x+1]-Prime[x]; md[x_] := Mod[Prime[x+1]-Prime[x], 6]; h={k1=0, k2=2, k3=4}; k=0; Do[If[Equal[md[n], k1]&&Equal[md[n+1], k2]&& Equal[md[n+2], k3]&&Equal[md[n+3], k1]&&Equal[md[n+4], k2]&&Equal[md[n+5], k3] &&Equal[md[n+6], k1]&&Equal[md[n+7], k2]&&Equal[md[n+8], k3] &&Equal[md[n+9], k1]&&Equal[md[n+10], k2]&&Equal[md[n+11], k3]&& Equal[md[n+12], k1]&&Equal[md[n+13], k2]&&Equal[md[n+14], k3], k=k+1; Print[{k, n, Prime[n], Table[md[n+j], {j, -1, 15}], Table[d[n+j], {j, -1, 15}]}]], {n, 2, 10000000}]
  • PARI
    lista(pmax) = {my(rec = 0, m = 0, c = 0, prv = 2, p0 = 0, d); forprime(p = 3, pmax, d = (p-prv)%6; if(d == 0 && m == 0, p0 = prv); if(d == c, m++; c = (c+2)%6; if(!(m%3) && m/3 > rec, print1(p0, ", "); rec++; m = 0), if(d == 0, p0 = prv; c = 2; m = 1, c = 0; m = 0)); prv = p);} \\ Amiram Eldar, Nov 04 2024

Extensions

a(9)-a(12) from Amiram Eldar, Nov 04 2024

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