Contribution of symmetric power transfers to the cuspidal cohomology of GLn

Abstract

Let π be a cuspidal automorphic representation of GL2(AQ). Newton and Thorne have proved that for every n≥ 1, the symmetric power lifting symn(π) is automorphic if π is attached to a non-CM Hecke eigenform. In this article, we establish an asymptotic estimate of the number of cuspidal automorphic representations of GLn+1(AQ) which contribute to the cuspidal cohomology of GLn+1 and are obtained by symmetric nth transfer of cuspidal representations of GL2(AQ). Here we fix the weight and vary the level. This generalises the previous works done for GL3 and GL4.