On the Sprague-Grundy Function of Tetris Extensions of Proper Nim

Abstract

Given a hypergraph ⊂eq 2I \\ on the ground set I = \1, …, n\, we assign to each i ∈ I a nonnegative integer xi, that is a pile of xi tokens, and consider the following generalization of the classical game of Nim: Two players alternate turns. In a move a player chooses an arbitrary edge H ∈ and reduces all piles i ∈ H. The player who is out of moves loses. We call the obtained game hypergraph Nim. Such a game is called proper Nim, when =2I \I,\ is the family of all proper subsets of I. Jenkyns and Mayberry JM80 described the Sprague-Grundy (or SG in short) function of these games. In this paper we introduce Tetris extensions of hypergraph Nim, and obtain a closed formula for the SG functions of the extensions of proper Nim, when n≥ 3. Surprisingly, the case of n=2 is much more complicated. For this case we only suggest several partial results and conjectures.