English

Exactly Solvable Topological Phase Transition in a Quantum Dimer Model

Strongly Correlated Electrons 2026-03-17 v3 Statistical Mechanics Mathematical Physics math.MP Quantum Physics

Abstract

We consider a family of generalized Rokhsar-Kivelson (RK) Hamiltonians, which are reverse-engineered to have an arbitrary edge-weighted superposition of dimer coverings as their exact ground state at the RK point. We focus on a quantum dimer model on the triangular lattice, with doubly-periodic edge weights. For simplicity we consider a 2×12\times1 periodic model in which all weights are set to one except for a tunable horizontal edge weight labeled α\alpha. We analytically show that the model exhibits a continuous quantum phase transition at α=3\alpha=3, changing from a topological Z2\mathbb{Z}_2 quantum spin liquid (α<3\alpha<3) to a columnar ordered state (α>3\alpha>3). The dimer-dimer correlator decays exponentially on both sides of the transition with the correlation length ξ1/α3\xi\propto1/|\alpha-3| and as a power-law at criticality. The vison correlator exhibits an exponential decay in the spin liquid phase, but becomes a constant in the ordered phase, which we explain in terms of loops statistics of the double-dimer model. Using finite-size scaling of the vison correlator, we extract critical exponents consistent with the 2D Ising universality class. Additionally, we analytically show that the topological R\'enyi entropy of order \infty (topological min-entropy) changes from log2\log2 for the quantum spin liquid phase α<3\alpha<3, to 00 for the ordered phase α>3\alpha>3, thereby analytically confirming the topological nature of the phase transition.

Keywords

Cite

@article{arxiv.2601.15377,
  title  = {Exactly Solvable Topological Phase Transition in a Quantum Dimer Model},
  author = {Laura Shou and Jeet Shah and Matthew Lerner-Brecher and Amol Aggarwal and Alexei Borodin and Victor Galitski},
  journal= {arXiv preprint arXiv:2601.15377},
  year   = {2026}
}

Comments

5+17 pages, 6+11 figures; v3 added topological min-entropy

R2 v1 2026-07-01T09:14:47.776Z