Recurrence solution of monomer-polymer models on two-dimensional rectangular lattices
Abstract
The problem of counting polymer coverings on the rectangular lattices is investigated. In this model, a linear rigid polymer covers adjacent lattice sites such that no two polymers occupy a common site. Those unoccupied lattice sites are considered as monomers. We prove that for a given number of polymers (-mers), the number of arrangements for the polymers on two-dimensional rectangular lattices satisfies simple recurrence relations. These recurrence relations are quite general and apply for arbitrary polymer length () and the width of the lattices (). The well-studied monomer-dimer problem is a special case of the monomer-polymer model when . It is known the enumeration of monomer-dimer configurations in planar lattices is #P-complete. The recurrence relations shown here have the potential for hints for the solution of long-standing problems in this class of computational complexity.
Keywords
Cite
@article{arxiv.2405.09457,
title = {Recurrence solution of monomer-polymer models on two-dimensional rectangular lattices},
author = {Yong Kong},
journal= {arXiv preprint arXiv:2405.09457},
year = {2026}
}