Conjectural decomposition of symmetric powers of automorphic representations for GL(n)

Abstract

Let π be a cuspidal automorphic representation for GL(n) over a number field. We establish a conditional upper bound on the number of cuspidal isobaric summands in the symmetric k-th power lift of π, assuming that the symmetric m-th power lift of π is automorphic and cuspidal for all m ≤ k-1, along with other specified Langlands functoriality conjectures. For sufficiently large k, the resulting bound is independent of the specific value of k. We further extend our study to cases in which the cuspidality assumptions on the symmetric power lifts are relaxed.