Quotient branching laws and Gan-Gross-Prasad relevance for general linear groups
Abstract
This paper proves the branching laws for the full class of unitarizable representations of general linear groups in non-Archimedean local fields, extending the original notion of Gan-Gross-Prasad relevant pair for Arthur-type representations GGP2, Gur, Chacrelle. Further, we provide an explicit computable algorithm to determine the generalized GGP relevant pair, as developed in Chaqbl. In particular, we show that if π and π' are any irreducible smooth representations of GLn+1(F) and GLn(F) respectively, and their Langlands data or Zelevinsky data are given in terms of multisegments, then through an algorithmic process we can determine whether the space HomGLn(F)(π, π') is non-zero. Finally, when one of the represntations π and π' is a generalized Speh representation, we give a complete classification for the other one for which the Hom space is non-zero.
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