Disintegration of positive isometric group representations on Lp-spaces

Abstract

Let G be a Polish locally compact group acting on a Polish space X with a G-invariant probability measure μ. We factorize the integral with respect to μ in terms of the integrals with respect to the ergodic measures on X, and show that Lp(X,μ) (1≤ p<∞) is G-equivariantly isometrically lattice isomorphic to an Lp-direct integral of the spaces Lp(X,λ), where λ ranges over the ergodic measures on X. This yields a disintegration of the canonical representation of G as isometric lattice automorphisms of Lp(X,μ) as an Lp-direct integral of order indecomposable representations. If (X,μ) is a probability space, and, for some 1≤ q<∞, G acts in a strongly continuous manner on Lq(X,μ) as isometric lattice automorphisms that leave the constants fixed, then G acts on Lp(X,μ) in a similar fashion for all 1≤ p<∞. Moreover, there exists an alternative model in which these representations originate from a continuous action of G on a compact Hausdorff space. If (X,μ) is separable, the representation of G on Lp(X,μ) can then be disintegrated into order indecomposable representations. The notions of Lp-direct integrals of Banach spaces and representations that are developed extend those in the literature.