On certain period relations for cusp forms on GLn

Abstract

Let π be a regular algebraic cuspidal automorphic representation of GLn( AF) for a number field F. We consider certain periods attached to π. These periods were originally defined by Harder when n=2, and later by Mahnkopf when F = Q. In the first part of the paper we analyze the behaviour of these periods upon twisting π by algebraic Hecke characters. In the latter part of the paper we consider Shimura's periods associated to a modular form. If φ is the cusp form associated to a character of a quadratic extension, then we relate the periods of φn to those of φ, and as a consequence give another proof of Deligne's conjecture on the critical values of symmetric power L-functions associated to dihedral modular forms. Finally, we make some remarks on the symmetric fourth power L-functions.