Related papers: Invertible subalgebras

Invertible subalgebras

URL: http://arxiv.org/abs/2211.02086v4
Date: Thu, 10 Aug 2023 05:13:03 GMT
Title: Invertible subalgebras
Authors: Jeongwan Haah
Abstract summary: We introduce invertible subalgebras of local operator algebras on lattices. On a two-dimensional lattice, an invertible subalgebra hosts a chiral anyon theory by a commuting Hamiltonian. We consider a metric on the group of all QCA on infinite lattices and prove that the metric completion contains the time evolution by local Hamiltonians.
Score: 0.30458514384586394
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We introduce invertible subalgebras of local operator algebras on lattices. An invertible subalgebra is defined to be one such that every local operator can be locally expressed by elements of the inveritible subalgebra and those of the commutant. On a two-dimensional lattice, an invertible subalgebra hosts a chiral anyon theory by a commuting Hamiltonian, which is believed not to be possible on any full local operator algebra. We prove that the stable equivalence classes of $\mathsf d$-dimensional invertible subalgebras form an abelian group under tensor product, isomorphic to the group of all $\mathsf d + 1$ dimensional QCA modulo blending equivalence and shifts. In an appendix, we consider a metric on the group of all QCA on infinite lattices and prove that the metric completion contains the time evolution by local Hamiltonians, which is only approximately locality-preserving. Our metric topology is strictly finer than the strong topology.

Related papers

Quantum cellular automata and categorical duality of spin chains [0.0]
We study categorical dualities, which are bounded-spread isomorphisms between algebras of symmetry-respecting local operators on a spin chain. A fundamental question about dualities is whether they can be extended to quantum cellular automata. We present a solution to the extension problem using the machinery of Doplicher-Haag-Roberts bimodules.
arXiv Detail & Related papers (2024-10-11T15:00:50Z)
Hyperpolyadic structures [0.0]
We introduce a new class of division algebras, the hyperpolyadic algebras, which correspond to the binary division algebras $mathbbR$, $mathbbC$, $mathbbH$, $mathbbO$ without considering new elements. For each invertible element we define a new norm which is polyadically multiplicative, and the corresponding map is a $n$-ary homomorphism. We show that the ternary division algebra of imaginary "half-octonions" is unitless and totally as
arXiv Detail & Related papers (2023-12-03T12:27:53Z)
Enriching Diagrams with Algebraic Operations [49.1574468325115]
We extend diagrammatic reasoning in monoidal categories with algebraic operations and equations. We show how this construction can be used for diagrammatic reasoning of noise in quantum systems.
arXiv Detail & Related papers (2023-10-17T14:12:39Z)
Algebras of actions in an agent's representations of the world [51.06229789727133]
We use our framework to reproduce the symmetry-based representations from the symmetry-based disentangled representation learning formalism. We then study the algebras of the transformations of worlds with features that occur in simple reinforcement learning scenarios. Using computational methods, that we developed, we extract the algebras of the transformations of these worlds and classify them according to their properties.
arXiv Detail & Related papers (2023-10-02T18:24:51Z)
DHR bimodules of quasi-local algebras and symmetric quantum cellular automata [0.0]
We show that for the double spin flip action $mathbbZ/2mathbbZtimes mathbbZ/2mathbbZZcurvearrowright mathbbC2otimes mathbbC2$, the group of symmetric QCA modulo symmetric finite depth circuits in 1D contains a copy of $S_3$, hence is non-abelian.
arXiv Detail & Related papers (2023-03-31T18:33:07Z)
Computing equivariant matrices on homogeneous spaces for Geometric Deep Learning and Automorphic Lie Algebras [0.0]
We compute equivariant maps from a homogeneous space $G/H$ of a Lie group $G$ to a module of this group. This work has applications in the theoretical development of geometric deep learning and also in the theory of automorphic Lie algebras.
arXiv Detail & Related papers (2023-03-13T14:32:49Z)
Discovering Sparse Representations of Lie Groups with Machine Learning [55.41644538483948]
We show that our method reproduces the canonical representations of the generators of the Lorentz group. This approach is completely general and can be used to find the infinitesimal generators for any Lie group.
arXiv Detail & Related papers (2023-02-10T17:12:05Z)
Deep Learning Symmetries and Their Lie Groups, Algebras, and Subalgebras from First Principles [55.41644538483948]
We design a deep-learning algorithm for the discovery and identification of the continuous group of symmetries present in a labeled dataset. We use fully connected neural networks to model the transformations symmetry and the corresponding generators. Our study also opens the door for using a machine learning approach in the mathematical study of Lie groups and their properties.
arXiv Detail & Related papers (2023-01-13T16:25:25Z)
Capacity of Group-invariant Linear Readouts from Equivariant Representations: How Many Objects can be Linearly Classified Under All Possible Views? [21.06669693699965]
We find that the fraction of separable dichotomies is determined by the dimension of the space that is fixed by the group action. We show how this relation extends to operations such as convolutions, element-wise nonlinearities, and global and local pooling.
arXiv Detail & Related papers (2021-10-14T15:46:53Z)
Abelian Neural Networks [48.52497085313911]
We first construct a neural network architecture for Abelian group operations and derive a universal approximation property. We extend it to Abelian semigroup operations using the characterization of associative symmetrics. We train our models over fixed word embeddings and demonstrate improved performance over the original word2vec.
arXiv Detail & Related papers (2021-02-24T11:52:21Z)
Algebraic Neural Networks: Stability to Deformations [179.55535781816343]
We study algebraic neural networks (AlgNNs) with commutative algebras. AlgNNs unify diverse architectures such as Euclidean convolutional neural networks, graph neural networks, and group neural networks.
arXiv Detail & Related papers (2020-09-03T03:41:38Z)

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