On the global existence and blowup of smooth solutions of 3-D compressible Euler equations with time-depending damping

Abstract

In this paper, we are concerned with the global existence and blowup of smooth solutions of the 3-D compressible Euler equation with time-depending damping ∂t+div( u)=0, ∂t( u)+div( u u+p\,I3)=-\,μ(1+t)λ\, u, (0,x)= +0(x), u(0,x)= u0(x), where x∈ R3, μ>0, λ≥ 0, and >0 are constants, 0,\, u0∈ C0∞( R3), (0, u0) 0, (0,·)>0, and >0 is sufficiently small. For 0≤λ≤1, we show that there exists a global smooth solution (, u) when curl u0 0, while for λ>1, in general, the solution (, u) will blow up in finite time. Therefore, λ=1 appears to be the critical value for the global existence of small amplitude smooth solutions.