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Building models of topological quantum criticality from pivot Hamiltonians
by Nathanan Tantivasadakarn, Ryan Thorngren, Ashvin Vishwanath and Ruben Verresen
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Submission summary
Authors (as registered SciPost users): | Nathanan Tantivasadakarn · Ruben Verresen |
Submission information | |
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Preprint Link: | scipost_202204_00018v2 (pdf) |
Date accepted: | 2022-10-18 |
Date submitted: | 2022-10-15 22:33 |
Submitted by: | Tantivasadakarn, Nathanan |
Submitted to: | SciPost Physics |
Ontological classification | |
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Academic field: | Physics |
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Approaches: | Theoretical, Computational |
Abstract
Progress in understanding symmetry-protected topological (SPT) phases has been greatly aided by our ability to construct lattice models realizing these states. In contrast, a systematic approach to constructing models that realize quantum critical points between SPT phases is lacking, particularly in dimension $d>1$. Here, we show how the recently introduced notion of the pivot Hamiltonian---generating rotations between SPT phases---facilitates such a construction. We demonstrate this approach by constructing a spin model on the triangular lattice, which is midway between a trivial and SPT phase. The pivot Hamiltonian generates a $U(1)$ pivot symmetry which helps to stabilize a direct SPT transition. The sign-problem free nature of the model---with an additional Ising interaction preserving the pivot symmetry---allows us to obtain the phase diagram using quantum Monte Carlo simulations. We find evidence for a direct transition between trivial and SPT phases that is consistent with a deconfined quantum critical point with emergent $SO(5)$ symmetry. The known anomaly of the latter is made possible by the non-local nature of the $U(1)$ pivot symmetry. Interestingly, the pivot Hamiltonian generating this symmetry is nothing other than the staggered Baxter-Wu three-spin interaction. This work illustrates the importance of $U(1)$ pivot symmetries and proposes how to generally construct sign-problem-free lattice models of SPT transitions with such anomalous symmetry groups for other lattices and dimensions.
List of changes
- Clarified that exponents of "O(3) criticality" and "O(3) criticality with cubic anisotropy" are very close
- Added argument that the cubic anisotropy is irrelevant at the $SO(5)$ DQCP.
- Added footnote in outlook to explain that our symmetrized Hamiltonian is local.
- We have fixed certain typos pointed out by the referees.
Published as SciPost Phys. 14, 013 (2023)