Lebesgue points via the Poincar\'e inequality
Abstract
In this article, we show that in a Q-doubling space (X,d,μ), Q>1, which satisfies a chain condition, if we have a Q-Poincar\'e inequality for a pair of functions (u,g) where g∈ LQ(X), then u has Lebesgue points Hh-a.e. for h(t)=1-Q-ε(1/t). We also discuss how the existence of Lebesgue points follows for u∈ W1,Q(X) where (X,d,μ) is a complete Q-doubling space supporting a Q-Poincar\'e inequality for Q>1.
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