On the multiplicity of self-similar solutions of the semilinear heat equation

Abstract

In studies of superlinear parabolic equations equation* ut= u+up, x∈ RN,\ t>0, equation* where p>1, backward self-similar solutions play an important role. These are solutions of the form u(x,t) = (T-t)-1/(p-1)w(y), where y:=x/T-t, T is a constant, and w is a solution of the equation w-y·∇ w/2 -w/(p-1)+wp=0. We consider (classical) positive radial solutions w of this equation. Denoting by pS, pJL, pL the Sobolev, Joseph-Lundgren, and Lepin exponents, respectively, we show that for p∈ (pS,pJL) there are only countably many solutions, and for p∈ (pJL,pL) there are only finitely many solutions. This result answers two basic open questions regarding the multiplicity of the solutions.