Thinned Wallis-type prime products in residue classes modulo 2m
Abstract
For odd primes p we consider the factors \[ A(p)=p-4(p)p+4(p), 4(p)= cases 1,&p 1 4, \\ -1,&p 3 4, cases \] and study products of A(p) restricted to unions of residue classes modulo 2m. We give a simple criterion for the existence of a finite nonzero limit, prove a logarithmic asymptotic in the general case, and express the limiting constant in terms of Mertens-type constants in arithmetic progressions (hence in terms of Dirichlet L-values).
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