English

The Second Leaper Theorem

Combinatorics 2017-06-28 v1

Abstract

A (p,q)(p, q)-leaper is a fairy chess piece that, from a square aa, can move to any of the squares a+(±p,±q)a + (\pm p, \pm q) or a+(±q,±p)a + (\pm q, \pm p). Let LL be a (p,q)(p, q)-leaper with p+qp + q odd and CC a cycle of LL within a (p+q)×(p+q)(p + q) \times (p + q) chessboard. We show that there exists a second leaper MM, distinct from LL, such that a Hamiltonian cycle DD of MM exists over the squares of CC. We give descriptions of CC and MM in terms of continued fractions. We introduce the notion of a direction graph, roughly a leaper graph from which all information has been abstracted away save for the directions of the moves, and we study CC and DD in terms of direction graphs. We introduce the notion of a dual generalized chessboard, a generalized chessboard BB of more than one square such that the leaper graph of a leaper LL over BB is connected and isomorphic to the leaper graph of a second leaper MM, distinct from LL, over BB, and we give constructions for dual generalized chessboards.

Cite

@article{arxiv.1706.08845,
  title  = {The Second Leaper Theorem},
  author = {Nikolai Beluhov},
  journal= {arXiv preprint arXiv:1706.08845},
  year   = {2017}
}

Comments

78 pages, 27 figures

R2 v1 2026-06-22T20:31:04.021Z