Salvato in:
Dettagli Bibliografici
Autori principali: Acuaviva, Arturo, Makam, Visu, Nieuwboer, Harold, Pérez-García, David, Sittner, Friedrich, Walter, Michael, Witteveen, Freek
Natura: Preprint
Pubblicazione: 2022
Soggetti:
Accesso online:https://arxiv.org/abs/2209.14358
Tags: Aggiungi Tag
Nessun Tag, puoi essere il primo ad aggiungerne!!
_version_ 1866910500323852288
author Acuaviva, Arturo
Makam, Visu
Nieuwboer, Harold
Pérez-García, David
Sittner, Friedrich
Walter, Michael
Witteveen, Freek
author_facet Acuaviva, Arturo
Makam, Visu
Nieuwboer, Harold
Pérez-García, David
Sittner, Friedrich
Walter, Michael
Witteveen, Freek
contents Tensor networks have a gauge degree of freedom on the virtual degrees of freedom that are contracted. A canonical form is a choice of fixing this degree of freedom. For matrix product states, choosing a canonical form is a powerful tool, both for theoretical and numerical purposes. On the other hand, for tensor networks in dimension two or greater there is only limited understanding of the gauge symmetry. Here we introduce a new canonical form, the minimal canonical form, which applies to projected entangled pair states (PEPS) in any dimension, and prove a corresponding fundamental theorem. Already for matrix product states this gives a new canonical form, while in higher dimensions it is the first rigorous definition of a canonical form valid for any choice of tensor. We show that two tensors have the same minimal canonical forms if and only if they are gauge equivalent up to taking limits; moreover, this is the case if and only if they give the same quantum state for any geometry. In particular, this implies that the latter problem is decidable - in contrast to the well-known undecidability for PEPS on grids. We also provide rigorous algorithms for computing minimal canonical forms. To achieve this we draw on geometric invariant theory and recent progress in theoretical computer science in non-commutative group optimization.
format Preprint
id arxiv_https___arxiv_org_abs_2209_14358
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle The minimal canonical form of a tensor network
Acuaviva, Arturo
Makam, Visu
Nieuwboer, Harold
Pérez-García, David
Sittner, Friedrich
Walter, Michael
Witteveen, Freek
Quantum Physics
Strongly Correlated Electrons
Data Structures and Algorithms
Mathematical Physics
Rings and Algebras
Tensor networks have a gauge degree of freedom on the virtual degrees of freedom that are contracted. A canonical form is a choice of fixing this degree of freedom. For matrix product states, choosing a canonical form is a powerful tool, both for theoretical and numerical purposes. On the other hand, for tensor networks in dimension two or greater there is only limited understanding of the gauge symmetry. Here we introduce a new canonical form, the minimal canonical form, which applies to projected entangled pair states (PEPS) in any dimension, and prove a corresponding fundamental theorem. Already for matrix product states this gives a new canonical form, while in higher dimensions it is the first rigorous definition of a canonical form valid for any choice of tensor. We show that two tensors have the same minimal canonical forms if and only if they are gauge equivalent up to taking limits; moreover, this is the case if and only if they give the same quantum state for any geometry. In particular, this implies that the latter problem is decidable - in contrast to the well-known undecidability for PEPS on grids. We also provide rigorous algorithms for computing minimal canonical forms. To achieve this we draw on geometric invariant theory and recent progress in theoretical computer science in non-commutative group optimization.
title The minimal canonical form of a tensor network
topic Quantum Physics
Strongly Correlated Electrons
Data Structures and Algorithms
Mathematical Physics
Rings and Algebras
url https://arxiv.org/abs/2209.14358