Calculus of continuous matrix product states

Research output: Contribution to journalArticleResearchpeer review

Authors

  • Jutho Haegeman
  • J. Ignacio Cirac
  • Tobias J. Osborne
  • Frank Verstraete

Research Organisations

External Research Organisations

  • Ghent University
  • Max Planck Institute of Quantum Optics (MPQ)
  • University of Vienna
View graph of relations

Details

Original languageEnglish
Article number085118
JournalPhysical Review B - Condensed Matter and Materials Physics
Volume88
Issue number8
Publication statusPublished - 20 Aug 2013

Abstract

We discuss various properties of the variational class of continuous matrix product states, a class of Ansatz states for one-dimensional quantum fields that was recently introduced as the direct continuum limit of the highly successful class of matrix product states. We discuss both attributes of the physical states, e.g., by showing in detail how to compute expectation values, as well as properties intrinsic to the representation itself, such as the gauge freedom. We consider general translation noninvariant systems made of several particle species and derive certain regularity properties that need to be satisfied by the variational parameters. We also devote a section to the translation invariant setting in the thermodynamic limit and show how continuous matrix product states possess an intrinsic ultraviolet cutoff. Finally, we introduce a new set of states, which are tangent to the original set of continuous matrix product states. For the case of matrix product states, this construction has recently proven relevant in the development of new algorithms for studying time evolution and elementary excitations of quantum spin chains. We thus lay the foundation for similar developments for one-dimensional quantum fields.

ASJC Scopus subject areas

Cite this

Calculus of continuous matrix product states. / Haegeman, Jutho; Cirac, J. Ignacio; Osborne, Tobias J. et al.
In: Physical Review B - Condensed Matter and Materials Physics, Vol. 88, No. 8, 085118, 20.08.2013.

Research output: Contribution to journalArticleResearchpeer review

Haegeman, J., Cirac, J. I., Osborne, T. J., & Verstraete, F. (2013). Calculus of continuous matrix product states. Physical Review B - Condensed Matter and Materials Physics, 88(8), Article 085118. https://doi.org/10.1103/PhysRevB.88.085118
Haegeman J, Cirac JI, Osborne TJ, Verstraete F. Calculus of continuous matrix product states. Physical Review B - Condensed Matter and Materials Physics. 2013 Aug 20;88(8):085118. doi: 10.1103/PhysRevB.88.085118
Haegeman, Jutho ; Cirac, J. Ignacio ; Osborne, Tobias J. et al. / Calculus of continuous matrix product states. In: Physical Review B - Condensed Matter and Materials Physics. 2013 ; Vol. 88, No. 8.
Download
@article{5b7b778a256b4674abc5b779d6d72fed,
title = "Calculus of continuous matrix product states",
abstract = "We discuss various properties of the variational class of continuous matrix product states, a class of Ansatz states for one-dimensional quantum fields that was recently introduced as the direct continuum limit of the highly successful class of matrix product states. We discuss both attributes of the physical states, e.g., by showing in detail how to compute expectation values, as well as properties intrinsic to the representation itself, such as the gauge freedom. We consider general translation noninvariant systems made of several particle species and derive certain regularity properties that need to be satisfied by the variational parameters. We also devote a section to the translation invariant setting in the thermodynamic limit and show how continuous matrix product states possess an intrinsic ultraviolet cutoff. Finally, we introduce a new set of states, which are tangent to the original set of continuous matrix product states. For the case of matrix product states, this construction has recently proven relevant in the development of new algorithms for studying time evolution and elementary excitations of quantum spin chains. We thus lay the foundation for similar developments for one-dimensional quantum fields.",
author = "Jutho Haegeman and Cirac, {J. Ignacio} and Osborne, {Tobias J.} and Frank Verstraete",
year = "2013",
month = aug,
day = "20",
doi = "10.1103/PhysRevB.88.085118",
language = "English",
volume = "88",
journal = "Physical Review B - Condensed Matter and Materials Physics",
issn = "1098-0121",
publisher = "American Institute of Physics",
number = "8",

}

Download

TY - JOUR

T1 - Calculus of continuous matrix product states

AU - Haegeman, Jutho

AU - Cirac, J. Ignacio

AU - Osborne, Tobias J.

AU - Verstraete, Frank

PY - 2013/8/20

Y1 - 2013/8/20

N2 - We discuss various properties of the variational class of continuous matrix product states, a class of Ansatz states for one-dimensional quantum fields that was recently introduced as the direct continuum limit of the highly successful class of matrix product states. We discuss both attributes of the physical states, e.g., by showing in detail how to compute expectation values, as well as properties intrinsic to the representation itself, such as the gauge freedom. We consider general translation noninvariant systems made of several particle species and derive certain regularity properties that need to be satisfied by the variational parameters. We also devote a section to the translation invariant setting in the thermodynamic limit and show how continuous matrix product states possess an intrinsic ultraviolet cutoff. Finally, we introduce a new set of states, which are tangent to the original set of continuous matrix product states. For the case of matrix product states, this construction has recently proven relevant in the development of new algorithms for studying time evolution and elementary excitations of quantum spin chains. We thus lay the foundation for similar developments for one-dimensional quantum fields.

AB - We discuss various properties of the variational class of continuous matrix product states, a class of Ansatz states for one-dimensional quantum fields that was recently introduced as the direct continuum limit of the highly successful class of matrix product states. We discuss both attributes of the physical states, e.g., by showing in detail how to compute expectation values, as well as properties intrinsic to the representation itself, such as the gauge freedom. We consider general translation noninvariant systems made of several particle species and derive certain regularity properties that need to be satisfied by the variational parameters. We also devote a section to the translation invariant setting in the thermodynamic limit and show how continuous matrix product states possess an intrinsic ultraviolet cutoff. Finally, we introduce a new set of states, which are tangent to the original set of continuous matrix product states. For the case of matrix product states, this construction has recently proven relevant in the development of new algorithms for studying time evolution and elementary excitations of quantum spin chains. We thus lay the foundation for similar developments for one-dimensional quantum fields.

UR - http://www.scopus.com/inward/record.url?scp=84884580987&partnerID=8YFLogxK

U2 - 10.1103/PhysRevB.88.085118

DO - 10.1103/PhysRevB.88.085118

M3 - Article

AN - SCOPUS:84884580987

VL - 88

JO - Physical Review B - Condensed Matter and Materials Physics

JF - Physical Review B - Condensed Matter and Materials Physics

SN - 1098-0121

IS - 8

M1 - 085118

ER -