Value distribution for the derivatives of the logarithm of L-functions from the Selberg class in the half-plane of absolute convergence

Abstract

In the present paper, we show that, for every δ>0, the function ( L(s))(m), where m∈ N \ 0\ and L (s) := Σn=1∞ a(n) n-s is an element of the Selberg class S, takes any value infinitely often in any strip 1<(s) <1+δ, provided Σp≤ x |a (p)|2 π(x) for some >0. In particular, L (s) takes any non-zero value infinitely often in the strip 1<(s)<1+δ, and the first derivative of L (s) vanishes infinitely often.