Uniqueness and stability of solutions for a type of parabolic boundary value problem
Enrique A. Gonzalez-Velasco1
Received25 Jun 1986
Revised10 Oct 1986
Abstract
We consider a boundary value problem consisting of the one-dimensional
parabolic equation gut=(hux)x+q, where g, h and q are functions of x, subject to
some general boundary conditions. By developing a maximum principle for the boundary
value problem, rather than the equation, we prove the uniqueness of a nonnegative
solution that depends continuously on boundary values.