Transfer of automorphic representations between inner forms II
Presenter
February 11, 2015
Abstract
Sug Woo Shin
University of California, Berkeley (UC Berkeley)
The Jacquet-Langlands correspondence tells us how to transfer automorphic representations between inner forms of a general linear group over a global field. I will explain how this should generalize in light of the conjectural description of the automorphic spectrum in terms of Langlands/Arthur parameters. Applying this idea I will try to answer the following question when G1
and G2 are unitary groups. Question: Let G1 and G2
be reductive groups over a number field which are inner forms of each other such that their adelic groups are isomorphic as topological groups. When are their automorphic spectra isomorphic as modules over the adelic group?