Corpus ID: 220128286

Kuhn's Equivalence Theorem for Games in Intrinsic Form

@article{Heymann2020KuhnsET,
  title={Kuhn's Equivalence Theorem for Games in Intrinsic Form},
  author={Benjamin Heymann and Michel De Lara and Jean-Philippe Chancelier},
  journal={ArXiv},
  year={2020},
  volume={abs/2006.14838}
}
  • Benjamin Heymann, Michel De Lara, Jean-Philippe Chancelier
  • Published 2020
  • Mathematics, Computer Science, Economics
  • ArXiv
  • We state and prove Kuhn’s equivalence theorem for a new representation of games, the intrinsic form. First, we introduce games in intrinsic form where information is represented by σ-fields over a product set. For this purpose, we adapt to games the intrinsic representation that Witsenhausen introduced in control theory. Those intrinsic games do not require an explicit description of the play temporality, as opposed to extensive form games on trees. Second, we prove, for this new and more… CONTINUE READING

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