Weak porosity on metric measure spaces

Carlos Mudarra

Published 2023-06-20Version 1

We characterize the subsets $E$ of a metric space $X$ with doubling measure whose distance function to some negative power $\textrm{dist}(\cdot,E)^{-\alpha}$ belongs to the Muckenhoupt $A_1$ class of weights in $X$. To this end, we introduce the weakly porous and dyadic weakly porous sets in this setting, and show that, along with certain doubling-type conditions for the sizes of the largest $E$-free holes, these sets provide the mentioned $A_1$-characterization. We exhibit examples showing the optimality of these conditions, and also see how they can be simplified in the particular case where the underlying measure possesses certain qualitative version of the annular decay property. Moreover, for these classes of sets $E$ and every $1\leq p<\infty,$ we determine the range of exponents $\alpha$ for which $\textrm{dist}(\cdot,E)^{-\alpha} \in A_p(X).$