Large Time Convergence of the Non-homogeneous Goldstein-Taylor Equation
Arnold A, Einav A, Signorello B, Wöhrer T (2021)
Publication Type: Journal article
Publication year: 2021
Journal
Book Volume: 182
Article Number: 41
Journal Issue: 2
DOI: 10.1007/s10955-021-02702-8
Abstract
The Goldstein-Taylor equations can be thought of as a simplified version of a BGK system, where the velocity variable is constricted to a discrete set of values. It is intimately related to turbulent fluid motion and the telegrapher’s equation. A detailed understanding of the large time behaviour of the solutions to these equations has been mostly achieved in the case where the relaxation function, measuring the intensity of the relaxation towards equally distributed velocity densities, is constant. The goal of the presented work is to provide a general method to tackle the question of convergence to equilibrium when the relaxation function is not constant, and to do so as quantitatively as possible. In contrast to the usual modal decomposition of the equations, which is natural when the relaxation function is constant, we define a new Lyapunov functional of pseudodifferential nature, one that is motivated by the modal analysis in the constant case, that is able to deal with full spatial dependency of the relaxation function. The approach we develop is robust enough that one can apply it to multi-velocity Goldstein-Taylor models, and achieve explicit rates of convergence. The convergence rate we find, however, is not optimal, as we show by comparing our result to those found in [8].
Authors with CRIS profile
Tobias Wöhrer
Lehrstuhl für Dynamics, Control, Machine Learning and Numerics (Alexander von Humboldt-Professur)
Involved external institutions
Karl-Franzens-Universität Graz
Austria (AT)
Technische Universität Wien / Vienna University of Technology
Austria (AT)
Austria (AT)
Technische Universität Wien / Vienna University of Technology
Austria (AT)
How to cite
APA:
Arnold, A., Einav, A., Signorello, B., & Wöhrer, T. (2021). Large Time Convergence of the Non-homogeneous Goldstein-Taylor Equation. Journal of Statistical Physics, 182(2). https://dx.doi.org/10.1007/s10955-021-02702-8
MLA:
Arnold, Anton, et al. "Large Time Convergence of the Non-homogeneous Goldstein-Taylor Equation." Journal of Statistical Physics 182.2 (2021).
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