Resonating valence bond wavefunctions and classical interacting dimer models

Abstract

We relate properties of nearest-neighbour resonating valence bond (nnRVB) wavefunctions for SU(g) spin systems on two dimensional bipartite lattices to those of fully-packed classical dimer models with potential energy V on the same lattice. We define a cluster expansion of V in terms of n-body potentials Vn, which are recursively determined from the nnRVB wavefunction on finite subgraphs of the original lattice. The magnitude of the n-body interaction Vn (n>1) is of order O(g-(n-1)) for small g-1, while V1 reduces to a constant due to the fully-packed nature of the model. At leading non-trivial order on the square lattice, the interacting dimer model only has two-body interactions V2(g) that favour two parallel dimers on elementary plaquettes. Setting g=2 and using the results of earlier work on this interacting dimer model, we find that the long-distance behaviour of the bond-energy correlation function is dominated by an oscillatory term that decays as 1/|r|α with α ≈ 1.22 for SU(2) spins. This result is in remarkable quantitative agreement with earlier direct numerical studies of the corresponding wavefunction, which give α ≈ 1.20.