Related papers: Average-fluctuation separation in energy levels in many-particle quantum systems with $k$-body interactions using $q$-Hermite polynomials

Average-fluctuation separation in energy levels in many-particle quantum systems with $k$-body interactions using $q$-Hermite polynomials

URL: http://arxiv.org/abs/2111.12087v3
Date: Fri, 11 Nov 2022 18:38:40 GMT
Title: Average-fluctuation separation in energy levels in many-particle quantum systems with $k$-body interactions using $q$-Hermite polynomials
Authors: N. D. Chavda
Abstract summary: Separation between average and fluctuation in the state density in many-particle quantum systems is shown. The smoothed state density is represented by the $q$-normal distribution ($f_qN$) which is the weight function for $q$-Hermites. As the rank of interaction $k$ increases, the fluctuations set in with smaller order of corrections in the smooth state density.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Separation between average and fluctuation parts in the state density in many-particle quantum systems with $k$-body interactions, modeled by the $k$-body embedded Gaussian orthogonal random matrices (EGOE($k$)), is demonstrated using the method of normal mode decomposition of the spectra and also verified through power spectrum analysis, for both fermions and bosons. The smoothed state density is represented by the $q$-normal distribution ($f_{qN}$) (with corrections) which is the weight function for $q$-Hermite polynomials. As the rank of interaction $k$ increases, the fluctuations set in with smaller order of corrections in the smooth state density. They are found to be of GOE type, for all $k$ values, for both fermion and boson systems.

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