Hardy spaces adapted to elliptic operators on open sets

Abstract

Let L= - div (A ∇ ·) be an elliptic operator defined on an open subset of Rd, complemented with mixed boundary conditions. Under suitable assumptions on the operator and the geometry, we derive an atomic characterization (depending only on the boundary conditions) for the Hardy space H1L defined using an adapted square function for L. This generalizes known results of Auscher and Russ in the case of pure Dirichlet/Neumann boundary conditions on Lipschitz domains. In particular, we develop a connection between the harmonic analysis of L and its underlying geometry.

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