Traces of Sobolev spaces to piecewise Ahlfors--David regular sets

Abstract

Let (X,d,μ) be a metric measure space with uniformly locally doubling measure μ. Given p ∈ (1,∞), assume that (X,d,μ) supports a weak local (1,p)-Poincar\'e inequality. We characterize trace spaces of the first-order Sobolev W1p(X)-spaces to subsets S of X that can be represented as a finite union i=1NSi, N ∈ N, of Ahlfors--David regular subsets Si ⊂ X, i ∈ \1,...,N\, of different codimensions. Furthermore, we explicitly compute the corresponding trace norms up to some universal constants.