Saved in:
Bibliographic Details
Main Author: Hashimoto, Kengo
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2604.11764
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866908960325369856
author Hashimoto, Kengo
author_facet Hashimoto, Kengo
contents 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 $G \colon H$ 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 $(G_1 \colon G_2) + ((G_3 + G_4) \colon G_5)$, 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 $G \colon_{\widehat{H}} H$, which is the game made by combining $G$, $H$, and $\widehat{H}$ 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 $\widehat{H}$. 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.
format Preprint
id arxiv_https___arxiv_org_abs_2604_11764
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Ordinal Sums with Substitution of Impartial Games
Hashimoto, Kengo
Combinatorics
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 $G \colon H$ 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 $(G_1 \colon G_2) + ((G_3 + G_4) \colon G_5)$, 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 $G \colon_{\widehat{H}} H$, which is the game made by combining $G$, $H$, and $\widehat{H}$ 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 $\widehat{H}$. 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.
title Ordinal Sums with Substitution of Impartial Games
topic Combinatorics
url https://arxiv.org/abs/2604.11764