Closed BV-extension and W1,1-extension sets
Abstract
This paper studies the relations between extendability of different classes of Sobolev W1,1 and BV functions from closed sets in general metric measure spaces. Under the assumption that the metric measure space satisfies a weak (1,1)-Poincar\'e inequality and measure doubling, we prove further properties for the extension sets. In the case of the Euclidean plane, we show that compact finitely connected BV-extension sets are always also W1,1-extension sets. This is shown via a local quasiconvexity result for the complement of the extension set.
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