From Quantum Dimers to the π-flux Toric Code via Deconfined Multicriticality
Abstract
Two-dimensional Rokhsar-Kivelson (RK) dimer models on bipartite lattices are generally limited to translation-symmetry-broken dimer crystals. We introduce a tensor-product regularisation of the dimer Hilbert space that yields a qubit Hamiltonian interpolating from the RK model to the π-flux toric code, thereby accessing a deconfined Z2 topological liquid. In this framework, the Z2 liquid descends from a multicritical U(1) spin liquid through condensation of a charge-2 Higgs field, thus avoiding confinement. Using iDMRG together with low-energy field theory, we determine a phase diagram containing two continuous quantum phase transitions -- a 3D XY transition between the Z2 liquid and the columnar/plaquette-VBS, and a quantum Lifshitz transition between two dimer crystals -- alongside a first-order transition between the staggered crystal and the Z2 liquid. Our field theory suggests a deconfined multicritical point described by an Abelian Higgs model with dynamical critical exponent, z=2, where the three transitions meet, highlighting the interplay of fractionalisation and emergent gauge fluctuations.
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