Albert Gorelishvili

Copyright © 1993 Albert Gorelishvili. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

By an Alexandrov lattice we mean a δ normal lattice of subsets of an abstract set X, such that the set of ℒ-regular countably additive bounded measures is sequentially closed in the set of ℒ-regular finitely additive bounded measures on the algebra generated by ℒ with the weak topology.

For a pair of lattices ℒ1⊂ℒ2 in X sufficient conditions are indicated to determine when ℒ1 Alexandrov implies that ℒ2 is also Alexandrov and vice versa. The extension of this situation is given where T:X→Y and ℒ1 and ℒ2 are lattices of subsets of X and Y respectively and T is ℒ1−ℒ2 continuous.