Classical and quantum dimers on the star lattice

TL;DR

This paper studies classical and quantum dimer models on the star lattice, revealing their properties, correlations, and an exactly solvable quantum model with a Rokhsar-Kivelson ground state, drawing parallels to the kagome lattice.

Contribution

It introduces an exactly solvable quantum dimer model on the star lattice and analyzes its properties, extending the understanding of dimer models beyond the kagome lattice.

Findings

Dimer correlations decay beyond neighboring triangles

Vison-vison correlations vanish

Monomer-monomer correlations are constant at 1/4

Abstract

We consider dimers on the star lattice (aka the 3-12, Fisher, expanded kagome or triangle-honeycomb lattice). We show that dimer coverings on this lattice have Z_2 arrow and pseudo-spin representations analogous to those for the kagome lattice, and use these to construct an exactly solvable quantum dimer model (QDM) with a Rokhsar-Kivelson (RK) ground state. This QDM, first discussed by Moessner and Sondhi from a different point of view, is the star-lattice analogue of a kagome-lattice QDM analyzed by Misguich et al. We give a detailed analysis of various properties of the classical equal-weight dimer model on the star lattice, most of which are related to those of the RK state. Using both the arrow representation and the fermionic path integral formulation of the Pfaffian method, we calculate the number of dimer coverings, dimer occupation probabilities, and dimer, vison, and monomer correlation functions. We show that a dimer is uncorrelated with dimers further away than on neighboring triangles, that the vison-vison correlation function vanishes, and that the monomer-monomer correlation function equals 1/4 regardless of the monomer positions (with one exception). A key result in the fermionic approach is the vanishing of the two-point Green function beyond a short distance. These properties are very similar to those of dimers on the kagome lattice. We also discuss some generalizations involving arrow representations for dimer coverings on "general Fisher lattices" and their "reduced" lattices, with the kagome, squagome, and triangular kagome lattice being examples of the latter.