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Algebra with indefinite involution and its representation in Krein space

Operator Algebras 2007-11-21 v2 Mathematical Physics math.MP

Abstract

It is often inevitable to introduce an indefinite-metric space in quantum field theory, for example, which is explained for the sake of the manifestly covariant quantization of the electromagnetic field. We show two more evident mathematical reasons why such indefinite metric appears. The first idea is the replacement of involution on an algebra. For an algebra A{\cal A} with an involution \sdag\sdag such that a representation of the involutive algebra (A,\sdag)({\cal A},\sdag) brings an indefinite-metric space, we replace the involution \sdag\sdag with a new one * on A{\cal A} such that (A,)({\cal A},*) is a well-known involutive algebra acting on a representation space with positive definite metric. This explains that non-isomorphic two involutive algebras are transformed each other by the replacement of involution. The second is that a covariant (Hilbert space) representation (H,π,U)({\cal H},\pi,U) of an involutive dynamical system ((A,),Z2,α)(({\cal A},*),{\bf Z}_{2},\alpha) brings a Krein space representation of the algebra A{\cal A} with the replaced involution. For example, we show representations of abnormal CCRs, CARs and pseudo-Cuntz algebras arising from those of standard CCRs, CARs and Cuntz algebras.

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Cite

@article{arxiv.math/0610059,
  title  = {Algebra with indefinite involution and its representation in Krein space},
  author = {Katsunori Kawamura},
  journal= {arXiv preprint arXiv:math/0610059},
  year   = {2007}
}

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27pages