Probing phase transition and underlying symmetry breaking via entanglement entropy scanning

Using entanglement entropy (EE) to probe the intrinsic physics of the novel phases and phase transitions in quantum many-body systems is an important but challenging topic in condensed matter physics. Thanks to our newly developed bipartite-reweight-annealing algorithm, we can systematically study EE behaviors near both first and second-order phase transition points of two-dimensional strongly correlated systems by scanning the EE across a large parameter region, which was super difficult previously due to the huge computation resources demanded. Interestingly, we find that the EE or its derivative diverges at the critical point, which essentially reveals the phase transition involving discrete or continuous symmetry breaking. What's more, we observe that the peak of the EE curve can detect first-order phase transitions at high symmetry breaking points, separating phases with lower symmetry broken. This behavior also applies to the symmetry-enhanced first-order phase transition in the two-dimensional chequerboard $J-Q$ model, where the emergent higher symmetry arises from the related deconfined criticality beyond the Landau-Ginzburg-Wilson paradigm. This work points to new phenomena and mechanisms that can help us better identify different phase transitions and the underlying symmetry breaking.