On π-compatible topologies and their special cases

Abstract

Topologies τ, σ on a set X are called π-compatible if τ is a π-network for σ, and vice versa. If topologies τ, σ on a set X are π-compatible then the families of nowhere dense sets (resp. meager sets or sets possessing the Baire property) of the spaces (X, τ) and (X, σ) coincide. A topology σ on a set X is called an admissible extension of a topology τ on X if τ ⊂eq σ and τ is a π-network for σ. It turns out that examples of admissible extensions were occurred in literature several times. In the paper we provide some new facts about the π-compatibility and the admissible extension as well as about their particular cases.