Remarks on 1-D Euler Equations with Time-Decayed Damping

Abstract

We study the 1-d isentropic Euler equations with time-decayed damping equation \ aligned &∂t +∂x( u)=0, \\ &∂t( u)+ ∂x( u2)+∂xp()=-μ1+t u,\\ &|t=0=1+0(x),u|t=0= u0(x). aligned . equation This work is inspired by a recent work of F. Hou, I. Witt and H.C. Yin Hou01. In Hou01, they proved a global existence and blow-up result of 3-d irrotational Euler flow with time-dependent damping. In the 1-d case, we will prove a different result when the damping decays of order -1 with respect to the time t. More precisely, when μ>2, we prove the global existence of the 1-d Euler system. While when 0≤μ≤2 , we will prove the blow up of C1 solutions.