%I A119402
%S A119402 576791,3361517,9433859,10460719,11630503,11707537,12080027,19743677,
%T A119402 28716287,33384517,34961923,36627659,37776967,38087983,40794049,
%U A119402 45650359,49152757
%N A119402 Primes p=prime(i) of level (1,11), i.e., such that A118534(i)=prime(i-11).
%C A119402 This subsequence of A125830 and of A162174 gives primes of level (1,11):
If the i-th prime p(i) has level 1 in A117563 and 2 p(i) - p(i+1)
= p(i-k), then we say that p(i) has level (1,k).
%C A119402 Primes of level (1,1) form the sequence A006562
%e A119402 prime(240963)-prime(240962)=prime(240962)-prime(240962-11),
%e A119402 prime(240963)-prime(240962)=prime(240962)-prime(240951),
%e A119402 3361601-3361517=3361517-3361433=84=6*14,
%e A119402 prime(240962) has a level 1 in A117563,
%e A119402 prime(240962)=3361517 has a level(1,11).
%Y A119402 Cf. A117078, A117563, A006562, A117876, A118464, A118467.
%K A119402 nonn,more,new
%O A119402 1,1
%A A119402 Remi Eismann and Fabien Sibenaler (reismann(AT)free.fr), Jul 25 2006
%E A119402 More terms from Fabien Sibenaler (fabien.sibenaler(AT)club-internet.fr),
Oct 20 2006
%E A119402 Definition and comment reworded following suggestions from the authors.
- M. F. Hasler (mhasler(AT)univ-ag.fr), Nov 30 2009
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