Singular solutions to the heat equations with nonlinear absorption and Hardy potentials

Abstract

We study the existence and nonexistence of singular solutions to the equation ut- u - |x|2u+|x|α u|u|p-1=0, p>1, in N×[0,∞), N 3, with a singularity at the point (0,0), that is, nonnegative solutions satisfying u(x,0)=0 for x0, assuming that >-2 and <(N-22)2. The problem is transferred to the one for a weighted Laplace-Beltrami operator with a non-linear absorbtion, absorbing the Hardy potential in the weight. A classification of a singular solution to the weighted problem either as a source solution with a multiple of the Dirac mass as initial datum, or as a unique very singular solution, leads to a complete classification of singular solutions to the original problem, which exist if and only if p<1+2(2+α)N+2+(N-2)2-4.