English

Multiplicity One Theorem for General Spin Groups: The Archimedean Case

Representation Theory 2026-01-14 v1 Number Theory

Abstract

Let \GSpin(V)\GSpin(V) (resp. \GPin(V)\GPin(V)) be a general spin group (resp. a general Pin group) associated with a nondegenerate quadratic space VV of dimension nn over an Archimedean local field FF. For a nondegenerate quadratic space WW of dimension n1n-1 over FF, we also consider \GSpin(W)\GSpin(W) and \GPin(W)\GPin(W). We prove the multiplicity-at-most-one theorem in the Archimedean case for a pair of groups (\GSpin(V),\GSpin(W)\GSpin(V), \GSpin(W)) and also for a pair of groups (\GPin(V),\GPin(W)\GPin(V), \GPin(W)); namely, we prove that the restriction to \GSpin(W)\GSpin(W) (resp. \GPin(W)\GPin(W)) of an irreducible Casselman-Wallach representation of \GSpin(V)\GSpin(V) (resp. \GPin(V)\GPin(V)) is multiplicity free.

Cite

@article{arxiv.2409.09320,
  title  = {Multiplicity One Theorem for General Spin Groups: The Archimedean Case},
  author = {Melissa Emory and Yeansu Kim and Ayan Maiti},
  journal= {arXiv preprint arXiv:2409.09320},
  year   = {2026}
}
R2 v1 2026-06-28T18:44:33.578Z