Liouville theorems and Fujita exponent for nonlinear space fractional diffusions

Abstract

We consider non-negative solutions to the semilinear space-fractional diffusion problem (∂t+(-)α/2)u=(x)up on whole space Rn with nonnegative initial data and with (-)α/2 being the α-Laplacian operator, α∈ (0,2). Here p>0 and (x) is a non-negative locally integrable function. For (x)=1 we show that the fujita exponent is pF=1+αn and the Liouville type result for the stationary equation is true for 0<p≤ 1+αn-α. When p=1/2 and (x) satisfies an integrable condition, there is at least one positive solution. This existence result is proved after we establish a uniqueness result about solutions of fractional Poisson equation.