Abstract: | An order topology in vector lattices and Boolean algebras is studied under the additional condition of “closure by one step”
that generalizes the well-known “regularity” property of Boolean algebras and K-spaces. It is proved that in a vector lattice
or a Boolean algebra possessing such a property there exists a basis of solid neighborhoods of zero with respect to an order
topology. An example of a Boolean algebra without basis of solid neighborhoods of zero (an algebra of regular open subsets
of the interval (0, 1)) is given. Bibliography: 3 titles.
Translated fromProblemy Matematicheskogo Analiza, No. 15 1995, pp. 213–220. |