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%I #14 Apr 29 2023 14:09:36
%S 0,10,12,24,28,30,34,42,48,52,54,64,70,72,78,82,90,94,100,112,114,118,
%T 120,124,132,138,148,154,168,174,178,180,184,190,192,202,204,208,220,
%U 222,232,234,250,252,258,262,264,268,280,288,294,300,310,322,324,328,330,334,342,352,358,360,364,372,378,384,390,394,400,402,408,412,418,420,430,432,442,444,450,454,462,468,472,478,484,490,492,498,504,510,528,532,534,538,544,558,562,570,574,580,582,588,594,598,600
%N Small gaps between primes - refinement of the GPY sieve method.
%C The work of Maynard represents an improvement over Yitang Zhang's estimate for prime pairs relating to the GPY sieve method.
%C The list is finite with 105 terms.
%H James Maynard, <a href="https://arxiv.org/abs/1311.4600">Small gaps between primes</a>, arXiv:1311.4600 [math.NT], 2013-2019. See p. 6.
%e 3 succeeds because 3 + 0 and 3 + 10 are both prime
%K nonn,fini,full
%O 0,2
%A _Gary W. Adamson_ and _N. J. A. Sloane_, Jan 13 2014