Quantized collision invariants on the sphere
Abstract
We show that a measurable function , with , satisfies the functional relation \begin{equation*} g(\omega)+g(\omega_*)=g(\omega')+g(\omega_*'), \end{equation*} for all admissible in the sense that \begin{equation*} \omega+\omega_*=\omega'+\omega_*', \end{equation*} if and only if it can be written as \begin{equation*} g(\omega)=A+B\cdot\omega, \end{equation*} for some constants and . Such functions form a family of quantized collision invariants which play a fundamental role in the study of hydrodynamic regimes of the Boltzmann--Fermi--Dirac equation near Fermionic condensates, i.e., at low temperatures. In particular, they characterize the elastic collisional dynamics of Fermions near a statistical equilibrium where quantum effects are predominant.
Keywords
Cite
@article{arxiv.2401.00433,
title = {Quantized collision invariants on the sphere},
author = {Benjamin Anwasia and Diogo Arsénio},
journal= {arXiv preprint arXiv:2401.00433},
year = {2024}
}