Nonvanishing and Central Critical Values of Twisted L-functions of Cusp Forms on Average

Abstract

Let f be a holomorphic cusp form of integral weight k ≥ 3 for 0(N) with nebentypus character . Generalising work of Kohnen and Raghuram we construct a kernel function for the L-function L(f,,s) of f twisted by a primitive Dirichlet character and use it to show that the average Σf ∈ Sk(N,)L(f,,s)<f,f>af(1) over an orthogonal basis of Sk(N,) does not vanish on certain line segments inside the critical strip if the weight k or the level N is big enough. As another application of the kernel function we prove an averaged version of Waldspurger's theorem relating the central critical value of the D-th twist (D < 0 a fundamental discriminant) of the L-function of a cusp form f of even weight 2k to the square of the |D|-th Fourier coefficient of a form of half-integral weight k+1/2 associated to f under the Shimura correspondence.