Multiplicity One Theorem for General Spin Groups: The Archimedean Case
Abstract
Let (V) (resp. (V)) be a general spin group (resp. a general Pin group) associated with a nondegenerate quadratic space V of dimension n over an Archimedean local field F. For a nondegenerate quadratic space W of dimension n-1 over F, we also consider (W) and (W). We prove the multiplicity-at-most-one theorem in the Archimedean case for a pair of groups ((V), (W)) and also for a pair of groups ((V), (W)); namely, we prove that the restriction to (W) (resp. (W)) of an irreducible Casselman-Wallach representation of (V) (resp. (V)) is multiplicity free.
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