Sharper L1-convergence rates of weak entropy solutions to damped compressible Euler equations

Abstract

We consider the asymptotic behavior of compressible isentropic flow when the initial mass is finite, which is modeled by the compressible Euler equation with frictional damping. It is shown in HUA (resp.GEN) that any L∞ weak entropy solution of damped compressible Euler equation converges to the Barenblatt solution with finite mass in L1 norm, with convergence rates depending on the adiabatic gas exponent γ in the case of 1<γ<3 (resp.γ2). Whether or not these convergence rates can be improved remains an interesting and challenging open question. In this paper, we obtain a better L1 convergence rate than that in GEN, for any γ2, through a new perspective on the relationship between the density function and the Barenblatt solution of the porous medium equation. Furthermore, making intensive analysis of some relevant convex functions, we are able to obtain the same form of L1 convergence rate for 1<γ<9/7, which is better than that in HUA as well.