Sign-changing self-similar solutions of the nonlinear heat equation with positive initial value

Abstract

We consider the nonlinear heat equation ut - u = |u|α u on RN, where α >0 and N 1. We prove that in the range 0 < α < 4 N-2, for every μ >0, there exist infinitely many sign-changing, self-similar solutions to the Cauchy problem with initial value u0 (x)= μ |x|- 2 α . The construction is based on the analysis of the related inverted profile equation. In particular, we construct (sign-changing) self-similar solutions for positive initial values for which it is known that there does not exist any local, nonnegative solution.