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Low-Mach-number limit of a compressible two-phase flow system with algebraic closure

math.AP · 2026-02-26 · unverdicted · novelty 7.0

As the Mach number tends to zero under well-prepared data, the bi-fluid compressible system converges to the incompressible non-homogeneous fluid system with transported volume fractions.

A no-go theorem and its resolution for the discrete compressible barotropic Navier--Stokes equations

math.AP · 2026-05-15 · 2 refs

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Low-Mach-number limit of a compressible two-phase flow system with algebraic closure math.AP · 2026-02-26 · unverdicted · none · ref 53
As the Mach number tends to zero under well-prepared data, the bi-fluid compressible system converges to the incompressible non-homogeneous fluid system with transported volume fractions.
A no-go theorem and its resolution for the discrete compressible barotropic Navier--Stokes equations math.AP · 2026-05-15 · unreviewed · ref 52 · 2 links

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