Existence of solutions for a fractional semilinear parabolic equation with singular initial data

Abstract

In this paper we obtain necessary conditions and sufficient conditions on the initial data for the solvability of the Cauchy problem ∂t u+(-)θ2u=up, x∈ RN,\,\,t>0, u(0)=μ 0in RN, where N 1, 0<θ 2, p>1 and μ is a Radon measure or a measurable function in RN. Our conditions lead optimal estimates of the life span of the solution with μ behaving like λ |x|-A (A>0) at the space infinity, as λ +0.