ZERO-DENSITY ESTIMATES FOR L-FUNCTIONS ATTACHED TO CUSP FORMS
Let be the space of holomorphic cusp forms of weight k with respect to Let be a normalized Hecke eigenform, the L-function attached to the form f. In this paper, we consider the distribution of zeros of in the strip for fixed with respect to the imaginary part. We study the estimates of
for and large Using the methods of Karatsuba and Voronin [13], we shall give another proof for Ivić’s method.
cusp forms, L-functions, zero-density.