Real quadratic base changes for GL3 and integral periods relations
Abstract
We prove a p-adic divisibility between the automorphic periods of a cuspidal automorphic representation of GL3(Q) and the periods of its Arthur-Clozel's base change to some real quadratic field E. This generalizes earlier works of Tilouine-Urban and of Hida in the case of classical modular forms. The divisibility we prove involves a new kind of automorphic periods, defined using the middle degree of the cuspidal cohomology of GL3(E), instead of the top or bottom degrees. We also investigate the Rogawski's stable base change from the quasi-split unitary group UE associated with E to GL3(E). In this situation, we also obtain some results toward a p-adic divisibility of automorphic periods.
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