G-finite von Neumann algebras and weakly almost periodic functions

Abstract

Let M be a von Neumann algebra which acts in a standard way on the Hilbert space H, let G be a subgroup of the group of all *-automorphisms of M. We prove that M is G-finite (in the sense of I. Kovács and Szücs, i.e. the set of all normal, G-invariant states on M is separating) if and only if, for every x∈ M and all ξ,η∈ H, the coefficient function g g(x)ξ|η is weakly almost periodic.

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