Gaussian lower bounds on the Dirichlet heat kernel and non-existence of local solutions for semilinear heat equations of Osgood type

Abstract

We give a simple proof of a lower bound for the Dirichlet heat kernel in terms of the Gaussian heat kernel. Using this we establish a non-existence result for semilinear heat equations with zero Dirichlet boundary conditions and initial data in Lq() when the source term f is non-decreasing and s∞s-γf(s)=∞ for some γ>q(1+2/n). This allows us to construct a locally Lipschitz f satisfying the Osgood condition ∫1∞1/f(s)\ \, s =∞, which ensures global existence for bounded initial data, such that for every q with 1 q<∞ there is an initial condition u0∈ Lq() for which the corresponding semilinear problem has no local-in-time solution.