Automorphy of Symm5(GL(2)) and base change

Abstract

We prove that for any Hecke eigenform f of level 1 and arbitrary weight there is a self-dual cuspidal automorphic form π of GL6() corresponding to 5 (f), i.e., such that the system of Galois representations attached to π agrees with the 5-th symmetric power of the one attached to f. We also improve the base change result that we obtained in a previous work: for any newform f, and any totally real number field F (no extra assumptions on f or F), we prove the existence of base change relative to the extension F/. Finally, we combine the previous results to deduce that base change also holds for 5(f): for any Hecke eigenform f of level 1 and any totally real number field F, the automorphic form corresponding to 5 (f) can be base changed to F.