Polynomial Lie Algebras slpd(2) in Action: Smooth sl(2) Mappings and Approximations

Abstract

We examine applications of polynomial Lie algebras slpd(2) to solve physical tasks in Ginv-invariant models of coupled subsystems in quantum physics. A general operator formalism is given to solve spectral problems using expansions of generalized coherent states, eigenfunctions and other physically important quantities by power series in the slpd(2) coset generators V. We also discuss some mappings and approximations related to the familiar sl(2) algebra formalism. On this way a new closed analytical expression is found for energy spectra which coincides with exact solutions in certain cases and, in general, manifests an availability of incommensurable eigenfrequencies related to a nearly chaotic dynamics of systems under study.

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