Abstract
The spectral representation for a group of unitary operators acting on a Hilbert space where the parameter set is a separable real Hilbert space is obtained. The usual spectral representation of such a group of unitary operators is when the parameter set is a locally compact abelian group (Stone’s theorem). The main result used in the proof is the Bochner theorem on the representation of positive definite functions on a real Hilbert space.
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