1 research outputs found
Restrictions of -Wythoff Nim and -complementary Beatty Sequences
Fix a positive integer . The game of \emph{-Wythoff Nim} (A.S.
Fraenkel, 1982) is a well-known extension of \emph{Wythoff Nim}, a.k.a 'Corner
the Queen'. Its set of -positions may be represented by a pair of increasing
sequences of non-negative integers. It is well-known that these sequences are
so-called \emph{complementary homogeneous}
\emph{Beatty sequences}, that is they satisfy Beatty's theorem. For a
positive integer , we generalize the solution of -Wythoff Nim to a pair
of \emph{-complementary}---each positive integer occurs exactly
times---homogeneous Beatty sequences a = (a_n)_{n\in \M} and b = (b_n)_{n\in
\M}, which, for all , satisfies . By the latter property,
we show that and are unique among \emph{all} pairs of non-decreasing
-complementary sequences. We prove that such pairs can be partitioned into
pairs of complementary Beatty sequences. Our main results are that
\{\{a_n,b_n\}\mid n\in \M\} represents the solution to three new
'-restrictions' of -Wythoff Nim---of which one has a \emph{blocking
maneuver} on the \emph{rook-type} options. C. Kimberling has shown that the
solution of Wythoff Nim satisfies the \emph{complementary equation}
. We generalize this formula to a certain '-complementary
equation' satisfied by our pair and . We also show that one may obtain
our new pair of sequences by three so-called \emph{Minimal EXclusive}
algorithms. We conclude with an Appendix by Aviezri Fraenkel.Comment: 22 pages, 2 figures, Games of No Chance 4, Appendix by Aviezri
Fraenke