Abstract L-space

In mathematics, specifically in order theory and functional analysis, an abstract L-space, an AL-space, or an abstract Lebesgue space is a Banach lattice ${\displaystyle (X,\Vert \cdot \Vert )}$ whose norm is additive on the positive cone of X.Template:Sfn

In probability theory, it means the standard probability space.^[1]

The strong dual of an AM-space with unit is an AL-space.Template:Sfn

The reason for the name abstract L-space is because every AL-space is isomorphic (as a Banach lattice) with some subspace of ${\displaystyle L^1(\mu ).}$Template:Sfn Every AL-space X is an order complete vector lattice of minimal type; however, the order dual of X, denoted by X⁺, is not of minimal type unless X is finite-dimensional.Template:Sfn Each order interval in an AL-space is weakly compact.Template:Sfn

The strong dual of an AL-space is an AM-space with unit.Template:Sfn The continuous dual space ${\displaystyle X^{\prime }}$ (which is equal to X⁺) of an AL-space X is a Banach lattice that can be identified with ${\displaystyle C_{ℝ}(K)}$, where K is a compact extremally disconnected topological space; furthermore, under the evaluation map, X is isomorphic with the band of all real Radon measures 𝜇 on K such that for every majorized and directed subset S of ${\displaystyle C_{ℝ}(K),}$ we have ${\displaystyle \underset{f\in S}{\lim }\mu (f)=\mu (\sup S).}$Template:Sfn

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