Distribution of zeros and zero-density estimates for the derivatives of L-functions attached to cusp forms
Abstract
Let f be a holomorphic cusp form of weight k with respect to SL2(Z) which is a normalized Hecke eigenform, Lf(s) the L-function attached to the form f. In this paper, we shall give the relation of the number of zeros of Lf(s) and the derivatives of Lf(s) using Berndt's method, and an estimate of zero-density of the derivatives of Lf(s) based on Littlewood's method.
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