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On the equations of compressible fluid dynamics with Cattaneo-type extensions for the heat flux: Symmetrizability and relaxation structure

Published 2 Jun 2024 in math.AP | (2406.00844v1)

Abstract: The aim of this work is twofold. From a mathematical point of view, we show the existence of a hyperbolic system of equations that is not symmetrizable in the sense of Friedrichs. Such system appears in the theory of compressible fluid dynamics with Cattaneo-type extensions for the heat flux. In contrast, the linearizations of such system around constant equilibrium solutions have Friedrichs symmetrizers. Then, from a physical perspective, we aim to understand the relaxation term appearing in this system. By noticing the violation of the Kawashima-Shizuta condition, locally and smoothly, with respect to the Fourier frequencies, we construct persistent waves, i.e., solutions preserving the $L{2}$ norm for all times that are not dissipated by the relaxation terms.

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