Relaxation rates and collision integrals for Bose-Einstein condensates

Erich D. Gust; L. E. Reichl

arXiv:1207.6591·cond-mat.quant-gas·June 5, 2015

Relaxation rates and collision integrals for Bose-Einstein condensates

Erich D. Gust, L. E. Reichl

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TL;DR

This paper demonstrates that the third collision integral $\

Contribution

It introduces the importance of the $\

Findings

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The $\

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The $\

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The $\

Abstract

Near equilibrium, the rate of relaxation to equilibrium and the transport properties of excitations (bogolons) in a dilute Bose-Einstein condensate (BEC) are determined by three collision integrals, $G^{12}$ , $G^{22}$ , and $G^{31}$ . All three collision integrals conserve momentum and energy during bogolon collisions, but only $G^{22}$ conserves bogolon number. Previous works have considered the contribution of only two collision integrals, $G^{22}$ and $G^{12}$ . In this work, we show that the third collision integral $G^{31}$ makes a significant contribution to the bogolon number relaxation rate and needs to be retained when computing relaxation properties of the BEC. We provide values of relaxation rates in a form that can be applied to a variety of dilute Bose-Einstein condensates.

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