English

Conway games, algebraically and coalgebraically

Logic in Computer Science 2015-07-01 v3

Abstract

Using coalgebraic methods, we extend Conway's theory of games to possibly non-terminating, i.e. non-wellfounded games (hypergames). We take the view that a play which goes on forever is a draw, and hence rather than focussing on winning strategies, we focus on non-losing strategies. Hypergames are a fruitful metaphor for non-terminating processes, Conway's sum being similar to shuffling. We develop a theory of hypergames, which extends in a non-trivial way Conway's theory; in particular, we generalize Conway's results on game determinacy and characterization of strategies. Hypergames have a rather interesting theory, already in the case of impartial hypergames, for which we give a compositional semantics, in terms of a generalized Grundy-Sprague function and a system of generalized Nim games. Equivalences and congruences on games and hypergames are discussed. We indicate a number of intriguing directions for future work. We briefly compare hypergames with other notions of games used in computer science.

Keywords

Cite

@article{arxiv.1107.1351,
  title  = {Conway games, algebraically and coalgebraically},
  author = {Furio Honsell and Marina Lenisa},
  journal= {arXiv preprint arXiv:1107.1351},
  year   = {2015}
}

Comments

30 pages

R2 v1 2026-06-21T18:33:25.604Z