Decay estimates for time-fractional porous medium flow with nonlocal pressure

Abstract

The main purpose of this paper is to study weak solutions of time-fractional of porous medium equation with nonlocal pressure: \[ ∂αt u=div( |u|m∇ (-)-s u) \,\, in RN× (0,T) \,, \] with m≥ 1, N≥ 2, 12≤ s<1, and α∈(0,1). We first prove an existence of weak solutions to the equation with initial data in L1(RN) L∞(RN) (possibly mixed sign). After that, we establish the Lq-L∞ decay estimate of weak solutions: \[ \|u(t)\|L∞(RN) ≤ C t-αq(1-λ0)+ m \|u0\|Lq(RN)q(1-λ0)q(1-λ0) + m , for t∈(0,∞), \] with λ0=N-2(1-s)N.