Finite dimensional irreducible representations and the uniqueness of the Lebesgue decomposition of positive functionals
Abstract
We prove for an arbitrary complex *-algebra A that every topologically irreducible *-representation of A on a Hilbert space is finite dimensional precisely when the Lebesgue decomposition of representable positive functionals over A is unique. In particular, the uniqueness of the Lebesgue decomposition of positive functionals over the L1-algebras of locally compact groups provides a new characterization of Moore groups.
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