Holomorphic functional calculus of Hodge-Dirac operators in Lp

Abstract

We study the boundedness of the H∞ functional calculus for differential operators acting in (Lp(Rn;CN)). For constant coefficients, we give simple conditions on the symbols implying such boundedness. For non-constant coefficients, we extend our recent results for the (Lp) theory of the Kato square root problem to the more general framework of Hodge-Dirac operators with variable coefficients (B) as treated in (L2(Rn;CN)) by Axelsson, Keith, and McIntosh. We obtain a characterization of the property that (B) has a bounded (H∞) functional calculus, in terms of randomized boundedness conditions of its resolvent. This allows us to deduce stability under small perturbations of this functional calculus.