Packing dimension and Ahlfors regularity of porous sets in metric spaces

Abstract

Let X be a metric measure space with an s-regular measure μ. We prove that if A⊂ X is -porous, then p(A) s-cs where p is the packing dimension and c is a positive constant which depends on s and the structure constants of μ. This is an analogue of a well known asymptotically sharp result in Euclidean spaces. We illustrate by an example that the corresponding result is not valid if μ is a doubling measure. However, in the doubling case we find a fixed N⊂ X with μ(N)=0 such that p(A)p(X)-c( 1)-1t for all -porous sets A⊂ X N. Here c and t are constants which depend on the structure constant of μ. Finally, we characterize uniformly porous sets in complete s-regular metric spaces in terms of regular sets by verifying that A is uniformly porous if and only if there is t<s and a t-regular set F such that A⊂ F.