Restrictions of m-Wythoff Nim and p-complementary Beatty Sequences

Abstract

Fix a positive integer m. The game of m-Wythoff Nim (A.S. Fraenkel, 1982) is a well-known extension of Wythoff Nim, a.k.a 'Corner the Queen'. Its set of P-positions may be represented by a pair of increasing sequences of non-negative integers. It is well-known that these sequences are so-called complementary homogeneous Beatty sequences, that is they satisfy Beatty's theorem. For a positive integer p, we generalize the solution of m-Wythoff Nim to a pair of p-complementary---each positive integer occurs exactly p times---homogeneous Beatty sequences a = (an)n∈ and b = (bn)n∈ , which, for all n, satisfies bn - an = mn. By the latter property, we show that a and b are unique among all pairs of non-decreasing p-complementary sequences. We prove that such pairs can be partitioned into p pairs of complementary Beatty sequences. Our main results are that \\an,bn\ n∈ \ represents the solution to three new 'p-restrictions' of m-Wythoff Nim---of which one has a blocking maneuver on the rook-type options. C. Kimberling has shown that the solution of Wythoff Nim satisfies the complementary equation xxn=yn - 1. We generalize this formula to a certain 'p-complementary equation' satisfied by our pair a and b. We also show that one may obtain our new pair of sequences by three so-called Minimal EXclusive algorithms. We conclude with an Appendix by Aviezri Fraenkel.