Traces of weighted Besov spaces to Ahlfors-David regular sets: the limiting case

Abstract

Given n∈ N, p∈ [1,∞), and a weight γ satisfying the local Muckenhoupt Ap condition, we introduce a weakened version of the Ahlfors--David codimension-θ regularity condition for Ahlfors--David d-regular sets E⊂Rn, where d∈(0,n) and θ∈(0,p). Under this assumption, we provide a complete intrinsic description of the trace-space of the weighted Besov space Bθpp,1(Rn,γ) to E. In particular, our results cover the case of power-type weights γ(x)=|x|α with -n<α<n(p-1), α≠ -(n-1), when E=Rn-1. This extends earlier results obtained by Haroske and Schmeisser.