Related papers: Topological defect network representations of fracton stabilizer codes

Topological defect network representations of fracton stabilizer codes

URL: http://arxiv.org/abs/2112.14717v1
Date: Wed, 29 Dec 2021 18:21:59 GMT
Title: Topological defect network representations of fracton stabilizer codes
Authors: Zijian Song, Arpit Dua, Wilbur Shirley, Dominic J. Williamson
Abstract summary: A topological defect network (TDN) is formed by a network of topological defects embedded within a topological quantum field theory (TQFT) Here we formulate a method to construct TDNs for a wide range of lattice Hamiltonians. Our method takes a lattice Hamiltonian as input, applies an ungauging procedure, then creates a refined lattice within each unit cell, followed by regauging the system to produce a TDN as output.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: A topological defect network (TDN) is formed by a network of topological defects embedded within a topological quantum field theory (TQFT). TDNs were introduced recently for the purpose of describing fracton topological phases of matter using the framework of defect TQFT. Their effectiveness has been demonstrated through numerous examples, yet a systematic construction was lacking. Here we solve this problem by formulating a method to construct TDNs for a wide range of lattice Hamiltonians. Our method takes a lattice Hamiltonian as input, applies an ungauging procedure, then creates a refined lattice within each unit cell, followed by regauging the system to produce a TDN as output. For topological Calderbank-Shor-Steane (CSS) Pauli stabilizer models, this procedure is guaranteed to produce a phase equivalent TDN. This provides TDN representations of canonical fracton models for which no such construction was previously known, including Haah's cubic code and Yoshida's infinite family of fractal spin liquid models. We demonstrate the applicability of our method beyond CSS stabilizer models by constructing TDNs for non-CSS models including Chamon's model and the semionic X-cube model.

Related papers

TopoDiffusionNet: A Topology-aware Diffusion Model [30.091135276750506]
Diffusion models excel at creating visually impressive images but often struggle to generate images with a specified topology. TopoDiffusionNet (TDN) is a novel approach that enforces diffusion models to maintain the desired topology. Our experiments across four datasets demonstrate significant improvements in topological accuracy.
arXiv Detail & Related papers (2024-10-22T02:45:46Z)
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)
Geometric Neural Diffusion Processes [55.891428654434634]
We extend the framework of diffusion models to incorporate a series of geometric priors in infinite-dimension modelling. We show that with these conditions, the generative functional model admits the same symmetry.
arXiv Detail & Related papers (2023-07-11T16:51:38Z)
Neural Template: Topology-aware Reconstruction and Disentangled Generation of 3D Meshes [52.038346313823524]
This paper introduces a novel framework called DTNet for 3D mesh reconstruction and generation via Disentangled Topology. Our method is able to produce high-quality meshes, particularly with diverse topologies, as compared with the state-of-the-art methods.
arXiv Detail & Related papers (2022-06-10T08:32:57Z)
Continuous Generative Neural Networks [0.966840768820136]
We study Continuous Generative Neural Networks (CGNNs) in the continuous setting. The architecture is inspired by DCGAN, with one fully connected layer, several convolutional layers and nonlinear activation functions. We present conditions on the convolutional filters and on the nonlinearity that guarantee that a CGNN is injective.
arXiv Detail & Related papers (2022-05-29T11:06:29Z)
Learning High-Dimensional Distributions with Latent Neural Fokker-Planck Kernels [67.81799703916563]
We introduce new techniques to formulate the problem as solving Fokker-Planck equation in a lower-dimensional latent space. Our proposed model consists of latent-distribution morphing, a generator and a parameterized Fokker-Planck kernel function.
arXiv Detail & Related papers (2021-05-10T17:42:01Z)
On Noise Injection in Generative Adversarial Networks [85.51169466453646]
Noise injection has been proved to be one of the key technique advances in generating high-fidelity images. We propose a geometric framework to theoretically analyze the role of noise injection in GANs.
arXiv Detail & Related papers (2020-06-10T15:24:48Z)
Ground Subspaces of Topological Phases of Matter as Error Correcting Codes [0.9306768284179177]
We prove that a lattice implementation of the disk axiom and annulus axiom in TQFTs is essentially the equivalence of TQO1 and TQO2 conditions. We propose to characterize topological phases of matter via error correcting properties, and refer to gapped fracton models as lax-topological.
arXiv Detail & Related papers (2020-04-24T20:38:10Z)
Tensor network models of AdS/qCFT [69.6561021616688]
We introduce the notion of a quasiperiodic conformal field theory (qCFT) We show that qCFT can be best understood as belonging to a paradigm of discrete holography.
arXiv Detail & Related papers (2020-04-08T18:00:05Z)
Kernel and Rich Regimes in Overparametrized Models [69.40899443842443]
We show that gradient descent on overparametrized multilayer networks can induce rich implicit biases that are not RKHS norms. We also demonstrate this transition empirically for more complex matrix factorization models and multilayer non-linear networks.
arXiv Detail & Related papers (2020-02-20T15:43:02Z)
Topological Defect Networks for Fractons of all Types [0.0]
We conjecture that all gapped phases, including fracton phases, admit a topological defect network description. We also provide a defect network construction of a novel fracton phase hosting non-Abelian fractons. Our work also sheds light on new techniques for constructing higher order gapped boundaries of 3+1D TQFTs.
arXiv Detail & Related papers (2020-02-12T19:00:00Z)

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