On a decomposition of regular domains into John domains with uniform constants

Abstract

We derive a decomposition result for regular, two-dimensional domains into John domains with uniform constants. We prove that for every simply connected domain ⊂ R2 with C1-boundary there is a corresponding partition = 1 … N with Σj=1N H1(∂ j ∂ ) θ such that each component is a John domain with a John constant only depending on θ. The result implies that many inequalities in Sobolev spaces such as Poincar\'e's or Korn's inequality hold on the partition of for uniform constants, which are independent of .