The -operator and Invariant Subtraction Games

Abstract

We study 2-player impartial games, so called invariant subtraction games, of the type, given a set of allowed moves the players take turn in moving one single piece on a large Chess board towards the position 0. Here, invariance means that each allowed move is available inside the whole board. Then we define a new game, of the old game, by taking the P-positions, except 0, as moves in the new game. One such game is = (Wythoff Nim), where the moves are defined by complementary Beatty sequences with irrational moduli. Here we give a polynomial time algorithm for infinitely many P-positions of . A repeated application of turns out to give especially nice properties for a certain subfamily of the invariant subtraction games, the permutation games, which we introduce here. We also introduce the family of ornament games, whose P-positions define complementary Beatty sequences with rational moduli---hence related to A. S. Fraenkel's `variant' Rat- and Mouse games---and give closed forms for the moves of such games. We also prove that (k-pile Nim) = k-pile Nim.