Non-uniqueness of positive solutions for supercritical semilinear heat equations without scale invariance

Abstract

We establish nonuniqueness of solutions for Cauchy problems of semilinear heat equations with a wide class of nonlinearities. Specifically, we consider \[ cases ∂tu- u=f(u), & x∈RN,\ t>0,\\ u(x,0)=u0(x), & x∈RN, cases \] where N>2. We assume that the growth rate of f is less than the Joseph-Lundgren exponent for N>10 and it satisfies certain assumptions guaranteeing a positive radial singular stationary solution u*. We prove that if u0=u*, then the problem has at least two positive solutions, namely u* and u(t) which satisfies u(t)∈ Lloc∞(0,t0;L∞(RN)) for some t0>0 and u(t) u*\ Lγul(RN)\ t 0+ for 1 γ<N(pf-1)/2, where pf:=u∞uf'(u)/f(u) is a growth rate of f. Hence, nonuniqueness problem can be reduced to the existence problem of a positive radial singular stationary solution. The method of construction of u(t) is based on the monotonicity argument. Transformations of forward self-similar solutions for f(u)=up and eu play a crucial role.

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