Multiple scales and singular limits of perfect fluids

Abstract

In this article our goal is to study the singular limits for a scaled barotropic Euler system modelling a rotating, compressible and inviscid fluid, where Mach number =εm , Rossby number =ε and Froude number =εn are proportional to a small parameter ε→ 0. The fluid is confined to an infinite slab, the limit behaviour is identified as the incompressible Euler system. For well--prepared initial data, the convergence is shown on the life span time interval of the strong solutions of the target system, whereas a class of generalized dissipative solutions is considered for the primitive system. The technique can be adapted to the compressible Navier--Stokes system in the subcritical range of the adiabatic exponent γ with 1<γ≤32, where the weak solutions are not known to exist.