English

Partizan Subtraction Games

Combinatorics 2021-01-06 v1 Discrete Mathematics Computer Science and Game Theory

Abstract

Partizan subtraction games are combinatorial games where two players, say Left and Right, alternately remove a number n of tokens from a heap of tokens, with nSLn \in S_L (resp. nSRn \in S_R) when it is Left's (resp. Right's) turn. The first player unable to move loses. These games were introduced by Fraenkel and Kotzig in 1987, where they introduced the notion of dominance, i.e. an asymptotic behavior of the outcome sequence where Left always wins if the heap is sufficiently large. In the current paper, we investigate the other kinds of behaviors for the outcome sequence. In addition to dominance, three other disjoint behaviors are defined, namely weak dominance, fairness and ultimate impartiality. We consider the problem of computing this behavior with respect to SLS_L and SRS_R, which is connected to the well-known Frobenius coin problem. General results are given, together with arithmetic and geometric characterizations when the sets SLS_L and SRS_R have size at most 2.

Keywords

Cite

@article{arxiv.2101.01595,
  title  = {Partizan Subtraction Games},
  author = {Eric Duchêne and Marc Heinrich and Richard J. Nowakowski and Aline Parreau},
  journal= {arXiv preprint arXiv:2101.01595},
  year   = {2021}
}
R2 v1 2026-06-23T21:48:10.048Z