Traces of Sobolev spaces to irregular subsets of metric measure spaces

Abstract

Given p ∈ (1,∞), let (X,d,μ) be a metric measure space with uniformly locally doubling measure μ supporting a weak local (1,p)-Poincar\'e inequality. For each θ ∈ [0,p), we characterize the trace space of the Sobolev W1p(X)-space to lower codimension-θ content regular closed subsets S ⊂ X. In particular, if the space (X,d,μ) is Ahlfors Q-regular for some Q ≥ 1 and p ∈ (Q,∞), then we get an intrinsic description of the trace-space of the Sobolev W1p(X)-space to arbitrary closed nonempty set S ⊂ X.

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