On distributional solutions of local and nonlocal problems of porous medium type

Abstract

We present a theory of well-posedness and a priori estimates for bounded distributional (or very weak) solutions of ∂tu-Lσ,μ[(u)]=g(x,t) RN×(0,T), where is merely continuous and nondecreasing and Lσ,μ is the generator of a general symmetric L\'evy process. This means that Lσ,μ can have both local and nonlocal parts like e.g. Lσ,μ=-(-)12. New uniqueness results for bounded distributional solutions of this problem and the corresponding elliptic equation are presented and proven. A key role is played by a new Liouville type result for Lσ,μ. Existence and a priori estimates are deduced from a numerical approximation, and energy type estimates are also obtained.