Ryuo Nim: A Variant of the classical game of Wythoff Nim

Abstract

The authors introduce the impartial game of the generalized Ry\=u\=o Nim, a variant of the classical game of Wythoff Nim. In the latter game, two players take turns in moving a single queen on a large chessboard, attempting to be the first to put her in the upper left corner, position (0,0). Instead of the queen used in Wythoff Nim, we use the generalized Ry\=u\=o for a given natural number p. The generalized Ry\=u\=o for p can be moved horizontally and vertically, as far as one wants. It also can be moved diagonally from (x,y) to (x-s,y-t), where s,t are non-negative integers such that 1 ≤ s ≤ x, 1 ≤ t ≤ y and s+t ≤ p-1. When p is 3, the generalized Ry\=u\=o for p is a Ry\=u\=o, i.e., a promoted hisha piece of Japanese chess. A Ry\=u\=o combines the power of the rook and the king in Western chess. The generalized Ry\=u\=o Nim for p is mathematically the same as the Nim with two piles of counters in which a player may take any number from either heap, and a player may also simultaneously remove s counters from either of the piles and t counters from the other, where s+t ≤ p-1 and p is a given natural number. The Grundy number of the generalized Ry\=u\=o Nim for p is given by (x+y,p) + p( xp yp). The authors also study the generalized Ry\=u\=o Nim for p with a pass move. The generalized Ry\=u\=o Nim for p without a pass move has simple formulas for Grundy numbers. This is not the case after the introduction of a pass move, but it still has simple formulas for the previous player's positions. We also study the Ry\=u\=o Nim that restricted the diagonal and side movement. Moreover, we extended the Ry\=u\=o Nim dimension to the n-dimension.