On the global existence and blowup of smooth solutions to the multi-dimensional compressible Euler equations with time-depending damping
On the global existence and blowup of smooth solutions to the multi-dimensional compressible Euler equations with time-depending damping
In this paper, we are concerned with the global existence and blowup of smooth solutions to the multi-dimensional compressible Euler equations with time-depending damping \begin{equation*} \partial_t\rho+\operatorname{div}(\rho u)=0, \quad \partial_t(\rho u)+\operatorname{div}\left(\rho u\otimes u+p\,I_d\right)=-\alpha(t)\rho u, \quad \rho(0,x)=\bar \rho+\varepsilon\rho_0(x),\quad u(0,x)=\varepsilon u_0(x), \end{equation*} where $x=(x_1, \cdots, x_d)\in\Bbb R^d$ $(d=2,3)$, the frictional coefficient is $\alpha(t)=\frac{\mu}{(1+t)^\lambda}$ …