A Note on Group Representations, Determinantal Hypersurfaces and Their Quantizations

Igor Klep, Jurij Volčič

Research output: Chapter in Book/Report/Conference proceedingChapterpeer-review

3 Scopus citations

Abstract

Recently, there have been exciting developments on the interplay between representation theory of finite groups and determinantal hypersurfaces. For example, a finite Coxeter group is determined by the determinantal hypersurface described by its natural generators under the regular representation. This short note solves three problems about extending this result in the negative. On the affirmative side, it is shown that a quantization of a determinantal hypersurface, the so-called free locus, correlates well with representation theory. If A1, …, A∈ GL d(ℂ) generate a finite group G, then the family of hypersurfaces { X∈ M n(ℂ) d: det (I+ A1⊗ X1+ ⋯ + A⊗ X) = 0 } for n∈ ℕ determines G up to isomorphism.

Original languageEnglish
Title of host publicationOperator Theory
Subtitle of host publicationAdvances and Applications
PublisherSpringer Science and Business Media Deutschland GmbH
Pages393-402
Number of pages10
DOIs
StatePublished - 1 Jan 2021
Externally publishedYes

Publication series

NameOperator Theory: Advances and Applications
Volume282
ISSN (Print)0255-0156
ISSN (Electronic)2296-4878

Keywords

  • Determinantal hypersurface
  • Free locus
  • Group representation
  • Linear pencil

ASJC Scopus subject areas

  • Analysis

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