Hydrodynamic limit of the Boltzmann equation to generic Riemann solutions with shocks and contacts is established in one dimension without removing layers.
Quantitative Closure Analysis toward Ideal Fluids
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abstract
We establish the incompressible low--Mach/high--Reynolds limit for the Boltzmann equation for a broad class of initial data, without recourse to any asymptotic expansion. Exploiting the local Maxwellian manifold and the macro--micro decomposition in a new quasi-linear analysis, we derive quantitative estimates for the purely microscopic fluctuation, as well as bounds for the kinetic vorticity and the entropic fluctuation in terms of the initial data. As a consequence, in two space dimensions, the rescaled velocity and temperature converge to a global solution of the incompressible Euler equations coupled to a transported temperature, within the frameworks of DiPerna--Lions--Majda and Delort.
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math.AP 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Hydrodynamic Limit of the Boltzmann Equation toward Generic Riemann Solutions with Shocks
Hydrodynamic limit of the Boltzmann equation to generic Riemann solutions with shocks and contacts is established in one dimension without removing layers.