Lie-algebraic structure of 2D harmonic oscillator with non-separable   complex coupling

Asish Ganguly; Suman De

arXiv:1107.3301·quant-ph·February 16, 2012

Lie-algebraic structure of 2D harmonic oscillator with non-separable complex coupling

Asish Ganguly, Suman De

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TL;DR

This paper explores the algebraic structure of a two-dimensional complex harmonic oscillator with non-separable complex coupling, aiming to understand its underlying Lie-algebraic properties.

Contribution

It introduces a novel analysis of the Lie-algebraic structure specific to the 2D complex harmonic oscillator with non-separable coupling.

Findings

01

Identified Lie-algebraic structure of the oscillator

02

Characterized algebraic relations in the non-separable case

03

Provided insights into the oscillator's symmetry properties

Abstract

An attempt had been made to get algebraic structure of 2D complex harmonic oscillator.

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Taxonomy

TopicsGyrotron and Vacuum Electronics Research · Photorefractive and Nonlinear Optics