English

Leaper graphs

Combinatorics 2008-02-03 v1

Abstract

An {r,s}\{r,s\}-leaper is a generalized knight that can jump from (x,y)(x,y) to (x±r,y±s)(x\pm r,y\pm s) or (x±s,y±r)(x\pm s,y\pm r) on a rectangular grid. The graph of an {r,s}\{r,s\}-leaper on an m×nm\times n board is the set of mnmn~vertices (x,y)(x,y) for 0x<m0\leq x<m and 0y<n0\leq y<n, with an edge between vertices that are one {r,s}\{r,s\}-leaper move apart. We call xx the {\it rank} and yy the {\it file} of board position (x,y)(x,y). George~P. Jelliss raised several interesting questions about these graphs, and established some of their fundamental properties. The purpose of this paper is to characterize when the graphs are connected, for arbitrary~rr and~ss, and to determine the smallest boards with Hamiltonian circuits when s=r+1s=r+1 or r=1r=1.

Cite

@article{arxiv.math/9411240,
  title  = {Leaper graphs},
  author = {Donald E. Knuth},
  journal= {arXiv preprint arXiv:math/9411240},
  year   = {2008}
}