A Reciprocity Theorem for Monomer-Dimer Coverings
摘要
The problem of counting monomer-dimer coverings of a lattice is a longstanding problem in statistical mechanics. It has only been exactly solved for the special case of dimer coverings in two dimensions. In earlier work, Stanley proved a reciprocity principle governing the number of dimer coverings of an by rectangular grid (also known as perfect matchings), where is fixed and is allowed to vary. As reinterpreted by Propp, Stanley's result concerns the unique way of extending to so that the resulting bi-infinite sequence, for , satisfies a linear recurrence relation with constant coefficients. In particular, Stanley shows that is always an integer satisfying the relation where unless 2(mod 4) and is odd, in which case . Furthermore, Propp's method is applicable to higher-dimensional cases. This paper discusses similar investigations of the numbers , of monomer-dimer coverings, or equivalently (not necessarily perfect) matchings of an by rectangular grid. We show that for each fixed there is a unique way of extending to so that the resulting bi-infinite sequence, for , satisfies a linear recurrence relation with constant coefficients. We show that , a priori a rational number, is always an integer, using a generalization of the combinatorial model offered by Propp. Lastly, we give a new statement of reciprocity in terms of multivariate generating functions from which Stanley's result follows.
引用
@article{arxiv.math/0304359,
title = {A Reciprocity Theorem for Monomer-Dimer Coverings},
author = {N. Anzalone and J. Baldwin and I. Bronshtein and T. K. Petersen},
journal= {arXiv preprint arXiv:math/0304359},
year = {2007}
}
备注
13 pages, 12 figures, to appear in the proceedings of the Discrete Models for Complex Systems (DMCS) 2003 conference. (v2 - some minor changes)