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Duality, criticality, anomaly, and topology in quantum spin-1 chains

Hong Yang, Linhao Li, Kouichi Okunishi, Hosho Katsura

2023Physical review. B./Physical review. B27 citationsDOI

Abstract

In quantum spin-1 chains, there is a nonlocal unitary transformation known as the Kennedy-Tasaki transformation ${U}_{\mathrm{KT}}$, which defines a duality between the Haldane phase and the ${\mathbb{Z}}_{2}\ifmmode\times\else\texttimes\fi{}{\mathbb{Z}}_{2}$ symmetry-breaking phase. In this paper, we find that ${U}_{\mathrm{KT}}$ also defines a duality between a topological Ising critical phase and a trivial Ising critical phase, which provides a ``hidden symmetry breaking'' interpretation of the topological criticality. Moreover, since the duality relates different phases of matter, we argue that a model with self-duality (i.e., invariant under ${U}_{\mathrm{KT}}$) is natural to be at a critical or multicritical point. We study concrete examples to demonstrate this argument. In particular, when $H$ is the Hamiltonian of the spin-1 antiferromagnetic Heisenberg chain, we prove that the self-dual model $H+{U}_{\mathrm{KT}}H{U}_{\mathrm{KT}}$ is exactly equivalent to a gapless spin-$1/2$ XY chain, which also implies an emergent quantum anomaly. On the other hand, we show that the topological and trivial Ising critical phases that are dual to each other meet at a multicritical point which is indeed self-dual.

Topics & Concepts

PhysicsIsing modelDuality (order theory)Hamiltonian (control theory)Critical point (mathematics)Quantum phase transitionMathematical physicsQuantumQuantum mechanicsTopology (electrical circuits)MathematicsCombinatoricsMathematical analysisMathematical optimizationQuantum many-body systemsPhysics of Superconductivity and MagnetismQuantum and electron transport phenomena
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