Representations of the weak Weyl commutation relation

Abstract

Let G be a locally compact abelian group with Pontraygin dual G. Suppose P is a closed subsemigroup of G containing the identity element 0. We assume that P has dense interior and P generates G. Let U:=\U\ ∈ G be a strongly continuous group of unitaries and let V:=\Va\a ∈ P be a strongly continuous semigroup of isometries. We call (U,V) a weak Weyl pair if \[ UVa=(a)VaU\] for every ∈ G and for every a ∈ P. We work out the representation theory (the factorial and the irreducible representations) of the above commutation relation under the assumption that \VaVa*:a ∈ P\ is a commuting family of projections. Not only does this generalise the results of [4] and [5], our proof brings out the Morita equivalence that lies behind the results. For P=[0,∞)× [0,∞), we demonstrate that if we drop the commutativity assumption on the range projections, then the representation theory of the weak Weyl commutation relation becomes very complicated.

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