How to recognise extension domains

Abstract

Let Ω⊂ Rn be a bounded domain and 1 < p < ∞. We prove that there is a bounded extension operator W1,p(Ω) W1,p(Rn) if and only if Ω satisfies the measure density condition and a Bourgain-Brezis-Mironescu type inequality (or limiting formula). As a key ingredient, we establish a fractional Poincaré-type inequality under the assumption of Ahlfors regularity alone, improving a result of Ponce (2004). We also prove that, under a mild Hausdorff measure condition on the boundary ∂ Ω, fractional extension (from W1,p(Ω) to Ws,p(Rn)) at a single exponent s > 1/p self-improves to full first-order Sobolev extension (from W1,p(Ω) to W1,p(Rn)). These results clarify the role of nonlocal estimates in the geometry of Sobolev extension domains.