OFFSET
1,1
COMMENTS
Conjecture: For any integer m > 0, there are infinitely many positive integers n such that all the gaps prime(n+i+1) - prime(n+i) (i = 0, ..., m-1) are triangular numbers.
LINKS
Zhi-Wei Sun, Table of n, a(n) for n = 1..2600
EXAMPLE
a(1) = 73262 with prime(73263) - prime(73262) = 927007 - 927001 = 3*4/2, prime(73264) - prime(73263) = 927013 - 927007 = 3*4/2, prime(73265) - prime(73264) = 927049 - 927013 = 8*9/2, prime(73266) - prime(73265) = 927077 - 927049 = 7*8/2 and prime(73267) - prime(73266) = 927083 - 927077 = 3*4/2.
MATHEMATICA
TQ[n_]:=IntegerQ[Sqrt[8n+1]]
m=0; Do[Do[If[TQ[Prime[n+i+1]-Prime[n+i]]==False, Goto[aa]], {i, 0, 5}]; m=m+1; Print[m, " ", n]; Label[aa]; Continue, {n, 1, 3692292}]
CROSSREFS
KEYWORD
nonn
AUTHOR
Zhi-Wei Sun, Jun 24 2014
STATUS
approved
