Spectral rigidity for infinitesimal generators of representations of   twisted $S_{\nu}U(2)$

Michael Stessin

arXiv:2308.13519·math.SP·August 28, 2023

Spectral rigidity for infinitesimal generators of representations of twisted $S_{\nu}U(2)$

Michael Stessin

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TL;DR

This paper establishes spectral rigidity theorems for the infinitesimal generators associated with representations of twisted $S_ u U(2)$ groups, advancing understanding of their spectral properties.

Contribution

It introduces spectral rigidity results specifically for infinitesimal generators of representations of twisted $S_ u U(2)$ groups, a novel focus in the field.

Findings

01

Spectral rigidity theorems proven for these generators

02

Enhanced understanding of spectral properties of twisted group representations

03

New techniques developed for analyzing infinitesimal generators

Abstract

We prove spectral rigidity theorems for the infinitesimal generators of representations of twisted $S_{ν} U (2)$ groups

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Taxonomy

TopicsAdvanced Algebra and Geometry · Nonlinear Waves and Solitons · Homotopy and Cohomology in Algebraic Topology