On reducibility of mapping class group representations: the SU(N) case

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Abstract

We review and extend the results of [1] that gives a condition for reducibility of quantum representations of mapping class groups constructed from Reshetikhin-Turaev type topological quantum field theories based on modular categories. This criterion is derived using methods developed to describe rational conformal field theories, making use of Frobenius algebras and their representations in modular categories. Given a modular category C, a rational conformal field theory can be constructed from a Frobenius algebra A in C. We show that if C contains a symmetric special Frobenius algebra A such that the torus partition function Z(A) of the corresponding conformal field theory is non-trivial, implying reducibility of the genus 1 representation of the modular group, then the representation of the genus g mapping class group constructed from C is reducible for every g\geq 1. We also extend the number of examples where we can show reducibility significantly by establishing the existence of algebras with the required properties using methods developed by Fuchs, Runkel and Schweigert. As a result we show that the quantum representations are reducible in the SU(N) case, N>2, for all levels k\in \mathbb{N}. The SU(2) case was treated explicitly in [1], showing reducibility for even levels k\geq 4.
Original languageEnglish
Title of host publicationNoncommutative structures in mathematics and physics
EditorsStefaan Caenepeel, Jürgen Fuchs, Simone Gutt, Christophe Schweigert, Alexander Stolin, Freddy Van Oystaeyen
Number of pages19
Place of PublicationBrussels
PublisherKoninklijke Vlaamse Academie van Belgie voor Wetenschappen en Kunsten (KVAB)
Publication date2010
Pages27-45
ISBN (Print)978-90-6569-061-6
Publication statusPublished - 2010
Externally publishedYes
EventNoncommutative Structures in Mathematics and Physics - Brussels, Belgium
Duration: 22. Jul 200822. Jul 2008

Conference

ConferenceNoncommutative Structures in Mathematics and Physics
Country/TerritoryBelgium
CityBrussels
Period22/07/200822/07/2008

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