Representation of game algebras

Studia Logica 75 (2):239 - 256 (2003)
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Abstract

We prove that every abstractly defined game algebra can be represented as an algebra of consistent pairs of monotone outcome relations over a game board. As a corollary we obtain Goranko's result that van Benthem's conjectured axiomatization for equivalent game terms is indeed complete.

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2004

DOI

10.1023/a:1027363028181

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Yde Venema
University of Amsterdam

Citations of this work

The Basic Algebra of Game Equivalences.Valentin Goranko - 2003 - Studia Logica 75 (2):221-238.

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