A Representation Theorem for MV-algebras

@article{Jenca2007ART,
  title={A Representation Theorem for MV-algebras},
  author={Gejza Jenca},
  journal={Soft Comput.},
  year={2007},
  volume={11},
  pages={557-564}
}
An MV-pair is a pair (B, G) where B is a Boolean algebra and G is a subgroup of the automorphism group of B satisfying certain conditions. Let ∼ G be the equivalence relation on B naturally associated with G. We prove that for every MV-pair (B, G), the effect algebra B/ ∼ G is an MV-effect algebra. Moreover, for every MV-effect algebra M there is an MV-pair (B, G) such that M is isomorphic to B/ ∼ G . 

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