Extended circular nim

Abstract

Circular nim CN(m, k) is a variant of nim, in which there are m piles of tokens arranged in a circle and each player, in their turn, chooses at most k consecutive piles in the circle and removes an arbitrary number of tokens from each pile. The player must remove at least one token in total. For some cases of m and k, closed formulas to determine which player has a winning strategy have been found. Almost all cases are still open problems. In this paper, we consider a variant of circular nim, extended circular nim. In extended circular nim ECN(mS, k), there are m piles of tokes arranged in a circle. S is a set of positive integers less than or equal to half of m. In each turn, a player chooses an integer s ∈ S. Then the player selects at most k piles among those located every s-th position on the circle, and removes an arbitrary number of tokens from each selected pile. We show some closed formulas to determine which player has a winning strategy for the cases where the number of piles is no more than eight, and for a few generalized cases.