Characterizations for the existence of traces of first-order Sobolev spaces on hyperbolic fillings
Abstract
In this paper, we study the existence of traces for Sobolev spaces on the hyperbolic filling X of a compact metric space Z equipped with a doubling measure. Given a suitable metric on X, we can regard Z as the boundary of X. After equipping X with a weighted measure μ via the measure on Z and the Euclidean arc length, we give characterizations for the existence of traces for first-order Sobolev spaces.
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