The Zero Number Diminishing Property under General Boundary Conditions

Abstract

The so-called zero number diminishing property (or zero number argument) is a powerful tool in qualitative studies of one dimensional parabolic equations, which says that, under the zero- or non-zero-Dirichlet boundary conditions, the number of zeroes of the solution u(x,t) of a linear equation is finite, non-increasing and strictly decreasing when there are multiple zeroes (cf. Ang). In this paper we extend the result to the problems with more general boundary conditions: u= 0 sometime and u= 0 at other times on the domain boundaries. Such results can be applied in particular to parabolic equations with Robin and free boundary conditions.