Bounded H∞-calculus for a Degenerate Elliptic Boundary Value Problem

Abstract

On a manifold X with boundary and bounded geometry we consider a strongly elliptic second order operator A together with a degenerate boundary operator T of the form T=0γ0 + 1γ1. Here γ0 and γ1 denote the evaluation of a function and its exterior normal derivative, respectively, at the boundary. We assume that 0,1∈ C∞b(∂ X), 0,1 0, and 0+1≥ c, for some c>0. We also assume that the highest order coefficients of A belong to Cτ(X) for some τ>0 and the lower order coefficients are in L∞(X). We show that the Lp(X)-realization of A which respect to the boundary operator T has a bounded H∞-calculus.