English

Extensions and Dilations for $C^*$-dynamical Systems

Operator Algebras 2016-09-07 v1

Abstract

Let AA be a unital CC^*-algebra and α\alpha be an injective, unital endomorphism of AA. A covariant representation of (A,α)(A,\alpha) is a pair (π,T)(\pi,T) consisting of a CC^*-representation π\pi of AA on a Hilbert space HH and a contraction TT in B(H)B(H) satisfying Tπ(α(a))=π(a)TT\pi(\alpha(a))=\pi(a)T. It follows from more general results of ours that such a covariant representation can be extended to a covariant representation (ρ,V)(\rho,V) (on a larger space KK) such that VV is a coisometry and it can be dilated to a covariant representation (σ,U)(\sigma,U) (on a larger space K1K_1) with UU unitary. Our objective here is to give self-contained, elementary proofs of these results which avoid the technology of CC^*-correspondences. We also discuss the non uniqueness of the extension.

Keywords

Cite

@article{arxiv.math/0509506,
  title  = {Extensions and Dilations for $C^*$-dynamical Systems},
  author = {Paul S. Muhly and Baruch Solel},
  journal= {arXiv preprint arXiv:math/0509506},
  year   = {2016}
}

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11 pages