Lifespan estimates via Neumann heat kernel

Abstract

This paper studies the lower bound of the lifespan T* for the heat equation ut= u in a bounded domain ⊂Rn(n≥ 2) with positive initial data u0 and a nonlinear radiation condition on partial boundary: the normal derivative ∂ u/∂ n=uq on 1⊂eq ∂ for some q>1, while ∂ u/∂ n=0 on the other part of the boundary. Previously, under the convexity assumption of , the asymptotic behaviors of T* on the maximum M0 of u0 and the surface area |1| of 1 were explored. In this paper, without the convexity requirement of , we will show that as M0→ 0+, T* is at least of order M0-(q-1) which is optimal. Meanwhile, we will also prove that as |1|→ 0+, T* is at least of order |1|-1n-1 for n≥ 3 and |1|-1/(|1|-1) for n=2. The order on |1| when n=2 is almost optimal. The proofs are carried out by analyzing the representation formula of u in terms of the Neumann heat kernel.