Special values of derivatives of certain L-functions

Abstract

In this paper we address the question of non-vanishing of L'(0,f) where f is an algebraic valued periodic function. In 2011, Gun, Murty and Rath studied the nature of special values of the derivatives of even Dirichlet-type functions and proved that it can be either zero or transcendental. Here for some special cases we characterize the set of functions for which L'(0,f) is zero or transcendental. Using a theorem of Ramachandra about multiplicative independence of cyclotomic units we also provide some non-trivial examples of functions where L'(0,f) is zero. Finally, assuming Schanuel's conjecture we derive the algebraic independence of special values of derivatives of L-functions.