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A196674
Numbers n such that c(n) = p_{2n}, where c(n) is the n-th Chebyshev prime and p_{2n} the 2n-th prime.
1
510, 10271, 11259, 11987, 14730, 18772, 18884, 21845, 24083, 33723, 46789
OFFSET
1,1
COMMENTS
The Chebyshev primes (of index 1) are such odd primes that satisfy li[psi(p)]-li[psi(p-1)]<1 (sequence A196667), where li(x) is the logarithmic integral and psi(x) is the Chebyshev's psi function.
THe present sequence lists the zeros of the function c(n)-p_{2n}, where c(n) is the n-th Chebyshev prime and p_{2n} the 2n-th prime.
See A196675 for the Chebyshev primes satisfying a(n)=p_{2n}.
LINKS
M. Planat and P. Solé, Efficient prime counting and the Chebyshev primes arXiv:1109.6489 [math.NT]
CROSSREFS
Sequence in context: A202595 A252882 A252883 * A260598 A255179 A144768
KEYWORD
nonn
AUTHOR
Michel Planat, Oct 05 2011
STATUS
approved