Improvements on lower bounds for the blow-up time under local nonlinear Neumann conditions

Abstract

This paper studies the heat equation ut= u in a bounded domain ⊂Rn(n≥ 2) with positive initial data and a local nonlinear Neumann boundary condition: the normal derivative ∂ u/∂ n=uq on partial boundary 1⊂eq ∂ for some q>1, while ∂ u/∂ n=0 on the other part. We investigate the lower bound of the blow-up time T* of u in several aspects. First, T* is proved to be at least of order (q-1)-1 as q→ 1+. Since the existing upper bound is of order (q-1)-1, this result is sharp. Secondly, if is convex and |1| denotes the surface area of 1, then T* is shown to be at least of order |1|-1n-1 for n≥ 3 and |1|-1/(|1|-1) for n=2 as |1|→ 0, while the previous result is |1|-α for any α<1n-1. Finally, we generalize the results for convex domains to the domains with only local convexity near 1.