English

Induced representations of infinite-dimensional groups

Representation Theory 2012-07-03 v1 Group Theory

Abstract

The induced representation IndHGS{\rm Ind}_H^GS of a locally compact group GG is the unitary representation of the group GG associated with unitary representation S:HU(V)S:H\rightarrow U(V) of a subgroup HH of the group GG. Our aim is to develop the concept of induced representations for infinite-dimensional groups. The induced representations for infinite-dimensional groups in not unique, as in the case of a locally compact groups. It depends on two completions H~\tilde H and G~\tilde G of the subgroup HH and the group GG, on an extension S~:H~U(V)\tilde S:\tilde H\rightarrow U(V) of the representation S:HU(V)S:H\rightarrow U(V) and on a choice of the GG-quasi-invariant measure μ\mu on an appropriate completion X~=H~\G~\tilde X=\tilde H\backslash \tilde G of the space H\GH\backslash G. As the illustration we consider the "nilpotent" group B0ZB_0^{\mathbb Z} of infinite in both directions upper triangular matrices and the induced representation corresponding to the so-called generic

Keywords

Cite

@article{arxiv.1207.0076,
  title  = {Induced representations of infinite-dimensional groups},
  author = {Alexandre Kosyak},
  journal= {arXiv preprint arXiv:1207.0076},
  year   = {2012}
}
R2 v1 2026-06-21T21:28:29.356Z