Completeness and additive property for submeasures

Abstract

Given an extended real-valued submeasure defined on a field of subsets of a given set, we provide necessary and sufficient conditions for which the pseudometric d defined by d(A,B):=\1,(A B)\ for all A,B ∈ is complete. As an application, we show that if : P(ω) [0,∞] is a lower semicontinuous submeasure and (A):=n (A \0, 1, …, n-1\) for all A⊂eq ω, then d is complete. This includes the case of all weighted upper densities, fixing a gap in a proof by Just and Krawczyk in [Trans.~Amer.~Math.~Soc.~285 (1984), 803--816]. In contrast, we prove that if is the upper Banach density (or an upper density greater than or equal to the latter) then d is not complete. We conclude with several characterizations of completeness in terms of the Stone space of the Boolean algebra /.