Regular lattices and weakly replete lattices (Q1209549)

A lattice \(L\) of subsets of a set \(X\) is regular if for every \(A\in L\) and \(x\in A\) there are \(A_ 1\), \(A_ 2\in L\) such that \(x\in A_ 1\), \(A\subset A_ 2\) and \(A_ 1\cap A_ 2=\emptyset\). A lattice \(L\) is replete if every two-valued \(\sigma\)-smooth finitely additive measure \(\mu\) has a non-empty support \(\cap\{A\in L;\mu(A)=1\}\). Various characterizations of measures and various types of smooth measures are investigated and some spaces associated with \(L\) are constructed.