English

Lifespan estimates via Neumann heat kernel

Analysis of PDEs 2019-08-09 v1

Abstract

This paper studies the lower bound of the lifespan TT^{*} for the heat equation ut=Δuu_t=\Delta u in a bounded domain ΩRn(n2)\Omega\subset\mathbb{R}^{n}(n\geq 2) with positive initial data u0u_{0} and a nonlinear radiation condition on partial boundary: the normal derivative u/n=uq\partial u/\partial n=u^{q} on Γ1Ω\Gamma_1\subseteq \partial\Omega for some q>1q>1, while u/n=0\partial u/\partial n=0 on the other part of the boundary. Previously, under the convexity assumption of Ω\Omega, the asymptotic behaviors of TT^{*} on the maximum M0M_{0} of u0u_{0} and the surface area Γ1|\Gamma_{1}| of Γ1\Gamma_{1} were explored. In this paper, without the convexity requirement of Ω\Omega, we will show that as M00+M_{0}\rightarrow 0^{+}, TT^{*} is at least of order M0(q1)M_{0}^{-(q-1)} which is optimal. Meanwhile, we will also prove that as Γ10+|\Gamma_{1}|\rightarrow 0^{+}, TT^{*} is at least of order Γ11n1|\Gamma_{1}|^{-\frac{1}{n-1}} for n3n\geq 3 and Γ11/ln(Γ11)|\Gamma_{1}|^{-1}\big/\ln\big(|\Gamma_{1}|^{-1}\big) for n=2n=2. The order on Γ1|\Gamma_{1}| when n=2n=2 is almost optimal. The proofs are carried out by analyzing the representation formula of uu in terms of the Neumann heat kernel.

Cite

@article{arxiv.1807.00492,
  title  = {Lifespan estimates via Neumann heat kernel},
  author = {Xin Yang and Zhengfang Zhou},
  journal= {arXiv preprint arXiv:1807.00492},
  year   = {2019}
}

Comments

31 pages, 7 figures

R2 v1 2026-06-23T02:47:45.018Z