Optimal singularities of initial data for solvability of the Hardy parabolic equation

Abstract

We consider the Cauchy problem for the Hardy parabolic equation ∂t u- u=|x|-γup with initial data u0 singular at some point z. Our main results show that, if z≠ 0, then the optimal strength of the singularity of u0 at z for the solvability of the equation is the same as that of the Fujita equation ∂t u- u=up. Moreover, if z=0, then the optimal singularity for the Hardy parabolic equation is weaker than that of the Fujita equation. We also obtain analogous results for a fractional case ∂t u+(-)θ/2 u=|x|-γup with 0<θ<2.