Spectral average of central values of automorphic L-functions for holomorphic cusp forms on SO0(m,2) II

Abstract

Given a maximal even-integral lattice of signature (m+, 2-) with an odd m≥ 3, we consider the holomorphic cusp forms F of weight l on the bounded symmetric domain of type IV of dimension m with respect to the discriminant subgroup of the orthogonal group O() defined by . Under a non-negativity assumption on the central L-values, we prove an equidistribution result of Satake parameters in an ensemble constructed from the central values of standard L-functions and the square of the Whittaker-Bessel periods.