On quantum WZNW monodromy matrix - factorization, diagonalization, and   determinant

Ludmil Hadjiivanov; Paolo Furlan

arXiv:1112.6274·math-ph·December 30, 2011

On quantum WZNW monodromy matrix - factorization, diagonalization, and determinant

Ludmil Hadjiivanov, Paolo Furlan

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TL;DR

This paper reviews the algebraic properties of the quantum monodromy matrix in the context of the quantized chiral SU(n)_k Wess-Zumino-Novikov-Witten model, focusing on factorization, diagonalization, and determinant aspects.

Contribution

It provides a comprehensive review of the algebraic structure and properties of the quantum monodromy matrix in the WZNW model with quantum group symmetry.

Findings

01

Detailed analysis of monodromy matrix properties

02

Insights into factorization and diagonalization techniques

03

Clarification of determinant calculations in quantum group context

Abstract

We review the basic algebraic properties of the quantum monodromy matrix M in the canonically quantized chiral SU(n)_k Wess-Zumino-Novikov-Witten model with a quantum group symmetry.

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Taxonomy

TopicsMolecular spectroscopy and chirality · Algebraic structures and combinatorial models · Advanced Topics in Algebra