On Euler-Kronecker constants and the generalized Brauer-Siegel conjecture

Abstract

As a natural generalization of the Euler-Mascheroni constant γ, Y. Ihara introduced the Euler-Kronecker constant γK attached to any number field K. In this paper, we prove that a certain bound on γK in a tower of number fields K implies the generalized Brauer-Siegel conjecture for K as formulated by Tsfasman and Vladut. Moreover, we use known bounds on γK for cyclotomic fields to obtain a finer estimate for the number of zeros of the Dedekind zeta-function ζK(s) in the critical strip.