Traces and extensions of certain weighted Sobolev spaces on Rn and Besov functions on Ahlfors regular compact subsets of Rn

Abstract

The focus of this paper is on Ahlfors Q-regular compact sets E⊂Rn such that, for each Q-2<α 0, the weighted measure μα given by integrating the density ω(x)=dist(x, E)α yields a Muckenhoupt Ap-weight in a ball B containing E. For such sets E we show the existence of a bounded linear trace operator acting from W1,p(B,μα) to Bθp,p(E, HQE) when 0<θ<1-α+n-Qp, and the existence of a bounded linear extension operator from Bθp,p(E, HQE) to W1,p(B, μα) when 1-α+n-Qp θ<1. We illustrate these results with E as the Sierpi\'nski carpet, the Sierpi\'nski gasket, and the von Koch snowflake.