@article{Brickhill2018-09Trian-48651,
  year={2018},
  doi={10.1017/S1755020318000060},
  title={Triangulating non-archimedean probability},
  number={3},
  volume={11},
  issn={1755-0203},
  journal={The Review of Symbolic Logic},
  pages={519--546},
  author={Brickhill, Hazel and Horsten, Leon}
}

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    <dcterms:title>Triangulating non-archimedean probability</dcterms:title>
    <dcterms:abstract xml:lang="eng">We relate Popper functions to regular and perfectly additive such non-Archimedean probability functions by means of a representation theorem: every such non-Archimedean probability function is infinitesimally close to some Popper function, and vice versa. We also show that regular and perfectly additive non-Archimedean probability functions can be given a lexicographic representation. Thus Popper functions, a specific kind of non-Archimedean probability functions, and lexicographic probability functions triangulate to the same place: they are in a good sense interchangeable.</dcterms:abstract>
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