Porous Medium Flow with both a Fractional Potential Pressure and Fractional Time Derivative

Abstract

We study a porous medium equation with right hand side. The operator has nonlocal diffusion effects given by an inverse fractional Laplacian operator. The derivative in time is also fractional of Caputo-type and which takes into account "memory''. The precise model is \[ Dtα u - div(u(-)-σ u) = f, 0<σ <1/2. \] We pose the problem over \t∈ R+, x∈ Rn\ with nonnegative initial data u(0,x)≥ 0 as well as right hand side f≥ 0. We first prove existence for weak solutions when f,u(0,x) have exponential decay at infinity. Our main result is H\"older continuity for such weak solutions.