Properties of differential operators with vanishing coefficients

Abstract

In this paper, we investigate the properties of linear operators defined on Lp() that are the composition of differential operators with functions that vanish on the boundary ∂ . We focus on bounded domains ⊂ Rd with Lipshitz continuous boundary. In this setting we are able to characterize the spectral and Fredholm properties of a large class of such operators. This includes operators of the form Lu = div( ∇ u) where is a matrix valued function that vanishes on the boundary, as well as operators of the form Lu = Dα ( u) or L = Dα u for some function ∈ C1() that vanishes on ∂ .