The critical Fujita exponent for one-dimensional semilinear heat equations with potentials and space-dependent nonlinearities
Abstract
This paper is concerned with the existence/nonexistence of nontrivial global-in-time solutions to the Cauchy problem equation casesP∂tu-∂x2u+Vu=(1+x2)-m2up,&x∈R,\ t>0,\\ u(x,0)=u0(x)0,&x∈R, cases equation where p>1, m0, u0∈ BC(R) and the potential V=V(x)∈ BC(R) satisfies a certain property. More precisely, we determine the critical Fujita exponent for (P), that is, the threshold for the global existence/nonexistence of (P).
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