Related papers: Detection of 2D SPT Order with Partial Symmetries

Detection of 2D SPT Order with Partial Symmetries

URL: http://arxiv.org/abs/2503.04510v1
Date: Thu, 06 Mar 2025 14:56:52 GMT
Title: Detection of 2D SPT Order with Partial Symmetries
Authors: Alex Turzillo, Naren Manjunath, Jose Garre-Rubio,
Abstract summary: A method of using partial symmetries to distinguish two dimensional symmetry protected topological phases is proposed.<n>The construction exploits the rotational symmetry of the lattice to extract on-site SPT invariants.<n>Its robustness is suggested by interpreting partial symmetries as generating the topological partition functions of lens spaces.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: A method of using partial symmetries to distinguish two dimensional symmetry protected topological (SPT) phases of on-site, unitary symmetries is proposed. This novel order parameter takes a wavefunction, such as a ground state of a lattice model, and detects its SPT invariants as expectation values of finitely supported operators, without the need for flux insertion. The construction exploits the rotational symmetry of the lattice to extract on-site SPT invariants, building upon prior work on probing crystalline SPT phases with partial rotations. The method is demonstrated by computing the order parameter analytically on group cohomology models and numerically on a family of states interpolating between the CZX state and a trivial state. Its robustness is suggested by interpreting partial symmetries as generating the topological partition functions of lens spaces.

Related papers

Topological nature of edge states for one-dimensional systems without symmetry protection [46.87902365052209]
We numerically verify and analytically prove a winding number invariant that correctly predicts the number of edge states in one-dimensional, nearest-neighbour (between unit cells)<n>Our invariant is invariant under unitary and similarity transforms.
arXiv Detail & Related papers (2024-12-13T19:44:54Z)
Long-range entanglement from spontaneous non-onsite symmetry breaking [3.3754780158324564]
We show a frustration-free lattice model exhibiting SSB of a non-onsite symmetry. We analytically prove the two-fold ground-state degeneracy and the existence of a finite energy gap. Our work reveals the exotic features of SSB of non-onsite symmetries, which may lie beyond the framework of topological holography.
arXiv Detail & Related papers (2024-11-07T18:59:51Z)
Finite Entanglement Scaling of Disorder Parameter at Quantum Criticality [2.570568710751949]
We show that disorder parameters can be conveniently and efficiently evaluated using infinite projected entangled pair states. We find from the finite entanglement scaling that the disorder parameter satisfies perimeter law at a critical point, proportional to boundary size of the subsystem.
arXiv Detail & Related papers (2024-11-01T20:19:57Z)
Relative Representations: Topological and Geometric Perspectives [53.88896255693922]
Relative representations are an established approach to zero-shot model stitching. We introduce a normalization procedure in the relative transformation, resulting in invariance to non-isotropic rescalings and permutations. Second, we propose to deploy topological densification when fine-tuning relative representations, a topological regularization loss encouraging clustering within classes.
arXiv Detail & Related papers (2024-09-17T08:09:22Z)
Topological quantum chains protected by dipolar and other modulated symmetries [0.0]
We investigate the physics of one-dimensional symmetry protected topological (SPT) phases protected by symmetries whose symmetry generators exhibit spatial modulation. We present a simple recipe for constructing modulated SPT models by generalizing the concept of decorated domain walls to spatially modulated symmetry defects.
arXiv Detail & Related papers (2023-09-18T18:00:04Z)
Topological characterization of special edge modes from the winding of relative phase [0.0]
Inversion or chiral symmetry broken SSH model is an example of a system where one-sided edge state with finite energy appears at one end of the open chain. We introduce a concept of relative phase between the components of a two-component spinor and define a winding number by the change of this relative phase over the one-dimensional Brillouin zone. We extend this analysis to a two dimensional case where we characterize the non-trivial phase, hosting gapped one-sided edge mode, by the winding in relative phase only along a certain axis in the Brillouin zone.
arXiv Detail & Related papers (2023-06-13T19:43:04Z)
Oracle-Preserving Latent Flows [58.720142291102135]
We develop a methodology for the simultaneous discovery of multiple nontrivial continuous symmetries across an entire labelled dataset. The symmetry transformations and the corresponding generators are modeled with fully connected neural networks trained with a specially constructed loss function. The two new elements in this work are the use of a reduced-dimensionality latent space and the generalization to transformations invariant with respect to high-dimensional oracles.
arXiv Detail & Related papers (2023-02-02T00:13:32Z)
Counting Phases and Faces Using Bayesian Thermodynamic Integration [77.34726150561087]
We introduce a new approach to reconstruction of the thermodynamic functions and phase boundaries in two-parametric statistical mechanics systems. We use the proposed approach to accurately reconstruct the partition functions and phase diagrams of the Ising model and the exactly solvable non-equilibrium TASEP.
arXiv Detail & Related papers (2022-05-18T17:11:23Z)
Boundary theories of critical matchgate tensor networks [59.433172590351234]
Key aspects of the AdS/CFT correspondence can be captured in terms of tensor network models on hyperbolic lattices. For tensors fulfilling the matchgate constraint, these have previously been shown to produce disordered boundary states. We show that these Hamiltonians exhibit multi-scale quasiperiodic symmetries captured by an analytical toy model.
arXiv Detail & Related papers (2021-10-06T18:00:03Z)
String order parameters for symmetry fractionalization in an enriched toric code [0.0]
We study a simple model of symmetry-enriched topological order obtained by decorating a toric code model with lower-dimensional symmetry-protected topological states. We show that the symmetry fractionalization in this model can be characterized by string order parameters, and that these signatures are robust under the effects of external fields and interactions.
arXiv Detail & Related papers (2020-11-05T17:15:53Z)
Inverse Learning of Symmetries [71.62109774068064]
We learn the symmetry transformation with a model consisting of two latent subspaces. Our approach is based on the deep information bottleneck in combination with a continuous mutual information regulariser. Our model outperforms state-of-the-art methods on artificial and molecular datasets.
arXiv Detail & Related papers (2020-02-07T13:48:52Z)

This list is automatically generated from the titles and abstracts of the papers in this site.