A new Cartan-type property and strict quasicoverings when p=1 in metric spaces
Abstract
In a complete metric space that is equipped with a doubling measure and supports a Poincar\'e inequality, we prove a new Cartan-type property for the fine topology in the case p=1. Then we use this property to prove the existence of 1-finely open strict subsets and strict quasicoverings of 1-finely open sets. As an application, we study fine Newton-Sobolev spaces in the case p=1, that is, Newton-Sobolev spaces defined on 1-finely open sets.
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