Zero-density estimates for L-functions attached to cusp forms

Abstract: Let $S_k$ be the space of holomorphic cusp forms of weight $k$ with respect to $SL_2(\mathbb{Z})$. Let $f \in S_k$ be a normalized Hecke eigenform, $L_f(s)$ the $L$-function attached to the form $f$. In this paper we consider the distribution of zeros of $L_f(s)$ in the strip $\sigma \leq \Re s \leq 1$ for fixed $\sigma>1/2$ with respect to the imaginary part. We study estimates of [ N_f(\sigma,T) = #{\rho\in\mathbb{C} \mid L_f(\rho)=0, \sigma\ leq \Re\rho \leq 1, 0 \leq \Im\rho \leq T} ] for $1/2 \leq \sigma \leq1$ and large $T>0$. Using the methods of Karatsuba and Voronin we shall give another proof for Ivi\'{c}'s method.