G. A. Philippin¹ and S. Vernier Piro²

Copyright © 1999 G. A. Philippin and S. Vernier Piro. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

This paper deals with classical solutions u(x,t) of some initial boundary value problems involving the quasilinear parabolic equation g(k(t)|∇u|2)Δu+f(u)=ut,  x∈Ω,t>0, where f,g,k are given functions. In the case of one space variable, i.e. when Ω:=(−L,L), we establish a maximum principle for the auxiliary function Φ(x,t):=e2αt{1k(t)∫0k(t)ux2g(ξ)dξ+αu2+2∫0uf(s)ds}, where a is an arbitrary nonnegative parameter. In some cases this maximum principle may be used to derive explicit exponential decay bounds for |u| and |ux|. Some extensions in N space dimensions are indicated. This work may be considered as a continuation of previous works by Payne and Philippin (Mathematical Models and Methods in Applied Sciences, 5 (1995), 95–110; Decay bounds in quasilinear parabolic problems, In: Nonlinear Problems in Applied Mathematics, Ed. by T.S. Angell, L. Pamela, Cook, R.E., SIAM, 1997).