Connectivity conditions and boundary Poincar\'e inequalities

Abstract

Inspired by recent work of Mourgoglou and the second named author, and earlier work of Hofmann, Mitrea and Taylor, we consider connections between the local John condition, the Harnack chain condition and weak boundary Poincar\'e inequalities in open sets ⊂ Rn+1, with codimension 1 Ahlfors--David regular boundaries. First, we prove that if satisfies both the local John condition and the exterior corkscrew condition, then also satisfies the Harnack chain condition (and hence, is a chord-arc domain). Second, we show that if is a 2-sided chord-arc domain, then the boundary ∂ supports a Heinonen--Koskela type weak 1-Poincar\'e inequality. We also construct an example of a set ⊂ Rn+1 such that the boundary ∂ is Ahlfors--David regular and supports a weak boundary 1-Poincar\'e inequality but is not a chord-arc domain. Our proofs utilize significant advances in particularly harmonic measure, uniform rectifiability and metric Poincar\'e theories.

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