Related papers: Optimal Thresholds for Fracton Codes and Random Spin Models with Subsystem Symmetry

Optimal Thresholds for Fracton Codes and Random Spin Models with Subsystem Symmetry

URL: http://arxiv.org/abs/2112.05122v2
Date: Sun, 4 Dec 2022 16:25:55 GMT
Title: Optimal Thresholds for Fracton Codes and Random Spin Models with Subsystem Symmetry
Authors: Hao Song, Janik Sch\"onmeier-Kromer, Ke Liu, Oscar Viyuela, Lode Pollet, M. A. Martin-Delgado
Abstract summary: We calculate optimal error thresholds for quantum error correcting codes based on fracton models. By mapping the error-correction process for bit-flip and phase-flip noises into novel statistical models, we obtain models that exhibit an unconventional subsystem symmetry.
Score: 10.029027477019984
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Fracton models provide examples of novel gapped quantum phases of matter that host intrinsically immobile excitations and therefore lie beyond the conventional notion of topological order. Here, we calculate optimal error thresholds for quantum error correcting codes based on fracton models. By mapping the error-correction process for bit-flip and phase-flip noises into novel statistical models with Ising variables and random multi-body couplings, we obtain models that exhibit an unconventional subsystem symmetry instead of a more usual global symmetry. We perform large-scale parallel tempering Monte Carlo simulations to obtain disorder-temperature phase diagrams, which are then used to predict optimal error thresholds for the corresponding fracton code. Remarkably, we found that the X-cube fracton code displays a minimum error threshold ($7.5\%$) that is much higher than 3D topological codes such as the toric code ($3.3\%$), or the color code ($1.9\%$). This result, together with the predicted absence of glass order at the Nishimori line, shows great potential for fracton phases to be used as quantum memory platforms.

Related papers

Statistical mechanical mapping and maximum-likelihood thresholds for the surface code under generic single-qubit coherent errors [0.0]
We consider single-qubit coherent errors in the surface code, i.e., rotations by angle $alpha$ about an axis that can be chosen arbitrarily. We numerically establish the existence of an error-correcting phase, which we chart in a subspace of rotation axes to estimate the corresponding maximum-likelihood thresholds.
arXiv Detail & Related papers (2024-10-29T18:23:23Z)
Neural Quantum State Study of Fracton Models [3.8068573698649826]
Fracton models host unconventional topological orders in three and higher dimensions. We establish neural quantum states (NQS) as new tools to study phase transitions in these models. Our work demonstrates the remarkable potential of NQS in studying complicated three-dimensional problems.
arXiv Detail & Related papers (2024-06-17T15:58:09Z)
Learning Gaussian Representation for Eye Fixation Prediction [54.88001757991433]
Existing eye fixation prediction methods perform the mapping from input images to the corresponding dense fixation maps generated from raw fixation points. We introduce Gaussian Representation for eye fixation modeling. We design our framework upon some lightweight backbones to achieve real-time fixation prediction.
arXiv Detail & Related papers (2024-03-21T20:28:22Z)
Exotic Symmetry Breaking Properties of Self-Dual Fracton Spin Models [4.467896011825295]
We investigate the ground-state properties and phase transitions of two self-dual fracton spin models. We show that both models experience a strong first-order phase transition with an anomalous $L-(D-1)$ scaling. Our work provides new understanding of sub-dimensional symmetry breaking and makes an important step for studying quantum-error-correction properties of the checkerboard and Haah's codes.
arXiv Detail & Related papers (2023-11-18T13:12:14Z)
Regularized Vector Quantization for Tokenized Image Synthesis [126.96880843754066]
Quantizing images into discrete representations has been a fundamental problem in unified generative modeling. deterministic quantization suffers from severe codebook collapse and misalignment with inference stage while quantization suffers from low codebook utilization and reconstruction objective. This paper presents a regularized vector quantization framework that allows to mitigate perturbed above issues effectively by applying regularization from two perspectives.
arXiv Detail & Related papers (2023-03-11T15:20:54Z)
Modeling the space-time correlation of pulsed twin beams [68.8204255655161]
Entangled twin-beams generated by parametric down-conversion are among the favorite sources for imaging-oriented applications. We propose a semi-analytic model which aims to bridge the gap between time-consuming numerical simulations and the unrealistic plane-wave pump theory.
arXiv Detail & Related papers (2023-01-18T11:29:49Z)
Topological fracton quantum phase transitions by tuning exact tensor network states [1.0753191494611891]
Gapped fracton phases of matter generalize the concept of topological order. We employ an exact 3D quantum tensor-network approach to study a prototypical X cube fracton model.
arXiv Detail & Related papers (2022-02-28T19:00:01Z)
Hamiltonian simulation with random inputs [74.82351543483588]
Theory of average-case performance of Hamiltonian simulation with random initial states. Numerical evidence suggests that this theory accurately characterizes the average error for concrete models.
arXiv Detail & Related papers (2021-11-08T19:08:42Z)
Realization of arbitrary doubly-controlled quantum phase gates [62.997667081978825]
We introduce a high-fidelity gate set inspired by a proposal for near-term quantum advantage in optimization problems. By orchestrating coherent, multi-level control over three transmon qutrits, we synthesize a family of deterministic, continuous-angle quantum phase gates acting in the natural three-qubit computational basis.
arXiv Detail & Related papers (2021-08-03T17:49:09Z)
Error-correction and noise-decoherence thresholds for coherent errors in planar-graph surface codes [0.0]
We numerically study coherent errors in surface codes on planar graphs. In particular, we show that a graph class exists where logical-level noise exhibits a decoherence threshold slightly above the error-correction threshold.
arXiv Detail & Related papers (2020-06-23T14:29:25Z)
Simulating nonnative cubic interactions on noisy quantum machines [65.38483184536494]
We show that quantum processors can be programmed to efficiently simulate dynamics that are not native to the hardware. On noisy devices without error correction, we show that simulation results are significantly improved when the quantum program is compiled using modular gates.
arXiv Detail & Related papers (2020-04-15T05:16:24Z)

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