Low-lying zeros in families of holomorphic cusp forms: the weight aspect

Abstract

We study low-lying zeros of L-functions attached to holomorphic cusp forms of level 1 and large weight. In this family, the Katz--Sarnak heuristic with orthogonal symmetry type was established in the work of Iwaniec, Luo and Sarnak for test functions φ satisfying the condition supp( φ) ⊂(-2,2). We refine their density result by uncovering lower-order terms that exhibit a sharp transition when the support of φ reaches the point 1. In particular the first of these terms involves the quantity φ(1) which appeared in previous work of Fouvry--Iwaniec and Rudnick in symplectic families. Our approach involves a careful analysis of the Petersson formula and circumvents the assumption of GRH for GL(2) automorphic L-functions. Finally, when supp( φ)⊂ (-1,1) we obtain an unconditional estimate which is significantly more precise than the prediction of the L-functions Ratios Conjecture.