Grand Zero Density Estimates of L-functions Associated with Cusp Forms

In this paper a zero-density estimate of the large sieve type is given for the automorphic L-function L f (s,χ),where f is a holomorphic cusp form and χ a Dirichlet character of mod q.

A Zero Density Estimate for Automorphic L-functions

1 Introduction Let f be a holomorphic cusp form for the group F = SL2（Z） of even integral weight k, with Fourier coefficients af （n）.

Zero density of L-functions related to Maass forms

Let f（z） be a Hecke-Maass cusp form for SL2（Z）, and let L（s, f） be the corresponding automorphic L-function associated to f. For sufficiently large T, let N（σ, T） be the number of zeros p =β ＋ iγ of L（s, f） with ｜γ｜ ≤T, β〉 σ, the zeros being counted according to multiplicity. In this paper, we get that for 3/4≤ σ≤ 1 - ε, there exists a constant C = C（ε） such that N（σ, T） 〈〈 T2（1-σ）/σ（log T）c, which improves the previous results.

Zero-density Estimates for Automorphic L-functions

In this paper we prove zero-density estimates of the large sieve type for the automorphic L-function L（s, f × χ）, where f is a holomorphic cusp form and χ（mod q） is a primitive character.

尖点形式L函数的零点密度估计(Ⅱ)

设k为一正偶数,T是充分大的正数,s=σ+it,3≤Q=T,q为一正整数,χ是模q的特征,f(z)=∞∑n=1a(n)e2πinz为Γ=SL2(z)的权为k的全纯尖点形式.设Nf(σ0,T,χ)表示函数Lf(s,χ)=∞∑n=1χ(n)a(n)n-s在带形区域k/2+(l/(log(Q2T))≤σ0≤σ≤((k+1)/2),|t|≤T内的零点个数.当k/2+1/3≤σ0≤((k+1)/2)时,由Dirichlet多项式理论得出了∑q≤Q∑χmodqNf(σ0,T,χ)的一个上界.

一类自守L-函数的零点密度估计（英文）

考虑了带特征的Mass形式的自守L函数的零点密度估计问题.证明了L(s,f×χ)的零点密度估计具有下面的形式:∑xN(σ,T,x)《(qT)A(σ)(1-σ)+ε.

尖点形式L函数的零点密度估计

设k为一正偶数,T是充分大的正数,s=σ+it,3≤Q<<T,q为一正整数,χ是模q的特征,f(z)=∑∞n=1a(n)e2πinz为Γ=SL2(z)的权为k的全纯尖点形式.设Nf(σ0,T,χ)表示函数Lf(s,χ)=∑∞n=1χ(n)a(n)n-S在带形区域k/2+1/log(Q2T)≤σ0≤σ≤(k+1)/2,t≤T内的零点个数,由Dirichlet多项式理论得出∑q≤Q∑χmodq*Nf(σ0,T,χ)的一个上界,这里∑χmodq*表示对q的全体原特征求和.