Applications of outer measures to separation properties of lattices and regular or σ-smooth measures

Abstract

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Associated with a 0−1 measure μ∈I(ℒ) where ℒ is a lattice of subsets of X are outer measures μ′ and μ˜; associated with a σ-smooth 0−1 measure μ∈Iσ(ℒ) is an outer measure μ″ or with μ∈Iσ(ℒ′), ℒ′ being the complementary lattice, another outer measure μ˜˜. These outer measures and their associated measurable sets are used to establish separation properties on ℒ and regularity and σ-smoothness of μ. Separation properties between two lattices ℒ1 and ℒ2, ℒ1⫅ℒ2, are similarly investigated. Notions of strongly σ-smooth and slightly regular measures are also used.

Keywords

• normal lattice
• semi-separates
• separates
• complement generated
• countably paracompact
• countably compact. regular
• σ-smooth
• strongly σ-smooth
• slightly regular measures; μ*-measurable sets.