Some results on second-order elliptic operators with polynomially growing coefficients in Lp-spaces

Abstract

In this paper we study minimal realizations in Lp(RN) of the second order elliptic operator equation* Ab,c := (1+|x|α) + b|x|α-2x·∇ - c |x|α-2 - |x|β , x ∈ RN, equation* where N≥3, α∈[0,2), β >0, and b, c are real numbers. We use quadratic form methods to prove that (Ab,c,Cc∞(RN \0\)) admits an extension that generates an analytic C0-semigroup for all p∈(1,∞). Moreover, we give conditions on the coefficients under which this extension is precisely the closure of (Ab,c,Cc∞(RN \0\)).