On fractional p-laplacian parabolic problem with general data

Abstract

In this article the problem to be studied is the following (P) \ arrayrcll ut+(-sp) u & = & f(x,t) & in T × (0,T), \\ u & = & 0 & in () × (0,T), \\ u & & 0 & in × (0,T),\\ u(x,0) & = & u0(x) & in , array% . where is a bounded domain, and (-sp) is the fractional p-Laplacian operator defined by (-sp)\, u(x,t):=P.V∫ \,|u(x,t)-u(y,t)|p-2(u(x,t)-u(y,t))|x-y|N+ps \,dy with 1<p<N, s∈ (0,1) and f, u0 are measurable functions. The main goal of this work is to prove that if (f,u0)∈ L1(T)× L1(), problem (P) has a weak solution with suitable regularity. In addition, if f0, u0 are nonnegative, we show that the problem above has a nonnegative entropy solution. In the case of nonnegative data, we give also some quantitative and qualitative properties of the solution according the values of p.