Ordinal Sums with Substitution of Impartial Games

Abstract

A combinatorial game is a two-player game without hidden information or chance elements. The disjunctive sum G + H of games G and H is the game in which G and H are played in parallel, and a player makes a move on exactly one of G and H in a turn. The ordinal sum G H is similar to the disjunctive sum, but once the left game G is played, the right game H is discarded and can no longer be played. It is known that the outcome of a mixture of disjunctive sums and ordinal sums, such as (G1 G2) + ((G3 + G4) G5), is determined by the variation sets, the set of Grundy numbers of all options, of the components in the normal-play. In this paper, we propose a generalization of an ordinal sum, called an ordinal sum with substitution G H H, which is the game made by combining G, H, and H in the following way: the games G and H are played in parallel; a player makes a move on exactly one of G and H in a turn; each time the left game G is played, the right game H is replaced with H. We investigate their fundamental properties and prove a simple formula for the variation sets of ordinal sums with substitution. Apply the formula, we give an explicit expression of the Grundy number of a chain of ordinal sums with substitution consisting of nimbers. We also provide an example illustrating the generalization of ordinal sums with substitution to poset structures.