Incompressible limit of the nonisentropic Euler equations with the solid wall boundary conditions
Incompressible limit of the nonisentropic Euler equations with the solid wall boundary conditions
We study the zero Mach number limit of classical solutions to the compressible Euler equations for nonisentropic fluids in a domain $\Omega \subset \mathbb R^d$ ($d=2$ or $3$). We consider the case of general initial data. For a domain $\Omega$, bounded or unbounded, we first prove the existence of classical …