The Choquet and Kellogg properties for the fine topology when $p=1$ in metric spaces

Panu Lahti

The Choquet and Kellogg properties for the fine topology when p=1 in metric spaces

Abstract

In the setting of a complete metric space that is equipped with a doubling measure and supports a Poincar\'e inequality, we prove the fine Kellogg property, the quasi-Lindel\"of principle, and the Choquet property for the fine topology in the case p=1.

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