Representation of the quantum algebra $SU_q(2)$ in the basis with   diagonal $"J_x"$ generator

A. N. Leznov

arXiv:math-ph/9908014·math-ph·May 23, 2007

Representation of the quantum algebra $SU_q(2)$ in the basis with diagonal $"J_x"$ generator

A. N. Leznov

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TL;DR

This paper constructs explicit representations of the quantum algebra $SU_q(2)$ in a basis diagonalizing a specific operator, linking it to the algebra's representation theory and exploring applications in quantum optics.

Contribution

It provides an explicit form of $SU_q(2)$ generators in a new basis related to the diagonalization of a particular operator, connecting to the algebra's representation theory.

Findings

01

Explicit representation of $SU_q(2)$ generators in a new basis.

02

Connection between the basis and the algebra's representation theory.

03

Discussion of applications in quantum optics.

Abstract

Generators of the quantum $S U_{q} (2)$ algebra are obtained in the explicit form in the basis where the operator $exp \frac{J _{z}}{2} J_{x} exp \frac{J _{z}}{2}$ is diagonal. It is shown that the solution of this problem is related to the representation theory of the two-dimensional algebra $[s, r] = tanh t (s^{2} - r^{2} + 1)$ . The relevance of such basis to some problems of quantum optics is discussed.

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Taxonomy

TopicsQuantum optics and atomic interactions · Advanced Topics in Algebra · Algebraic and Geometric Analysis