Remarks on the symmetric powers of cusp forms on GL(2)
Abstract
In this paper we prove the following conditional result: Let F be a number field, and pi a cusp form on GL(2)/F which is not solvable polyhedral. Assume that all the symmetric powers symm(pi) are modular, i.e., define automorphic forms on GL(m+1)/F. If sym6(pi) is cuspidal, then all the symmetric powers are cuspidal, for all m. Moreover, sym6(pi) is Eisenteinian iff sym5(pi) is an abelian twist of the functorial product of pi with the symmetric square of a cusp form pi' on GL(2)/F.
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