Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravity

Abstract To adopt a practical method to calculate the action of geometrical operators on quantum states is a crucial task in loop quantum gravity. In this paper, the graphical calculus based on the original Brink graphical method is applied to loop quantum gravity along the line of previous work. Th...

Full description

Bibliographic Details
Main Authors: Jinsong Yang, Yongge Ma
Format: Article
Language:English
Published: SpringerOpen 2017-04-01
Series:European Physical Journal C: Particles and Fields
Online Access:http://link.springer.com/article/10.1140/epjc/s10052-017-4713-0
id doaj-f40b84e96073425e9fcf505649772923
record_format Article
spelling doaj-f40b84e96073425e9fcf5056497729232020-11-25T00:39:57ZengSpringerOpenEuropean Physical Journal C: Particles and Fields1434-60441434-60522017-04-0177415210.1140/epjc/s10052-017-4713-0Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravityJinsong Yang0Yongge Ma1Department of Physics, Guizhou UniversityDepartment of Physics, Beijing Normal UniversityAbstract To adopt a practical method to calculate the action of geometrical operators on quantum states is a crucial task in loop quantum gravity. In this paper, the graphical calculus based on the original Brink graphical method is applied to loop quantum gravity along the line of previous work. The graphical method provides a very powerful technique for simplifying complicated calculations. The closed formula of the volume operator and the actions of the Euclidean Hamiltonian constraint operator and the so-called inverse volume operator on spin-network states with trivalent vertices are derived via the graphical method. By employing suitable and non-ambiguous graphs to represent the action of operators as well as the spin-network states, we use the simple rules of transforming graphs to obtain the resulting formula. Comparing with the complicated algebraic derivation in some literature, our procedure is more concise, intuitive and visual. The resulting matrix elements of the volume operator is compact and uniform, fitting for both gauge-invariant and gauge-variant spin-network states. Our results indicate some corrections to the existing results for the Hamiltonian operator and inverse volume operator in the literature.http://link.springer.com/article/10.1140/epjc/s10052-017-4713-0
collection DOAJ
language English
format Article
sources DOAJ
author Jinsong Yang
Yongge Ma
spellingShingle Jinsong Yang
Yongge Ma
Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravity
European Physical Journal C: Particles and Fields
author_facet Jinsong Yang
Yongge Ma
author_sort Jinsong Yang
title Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravity
title_short Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravity
title_full Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravity
title_fullStr Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravity
title_full_unstemmed Graphical calculus of volume, inverse volume and Hamiltonian operators in loop quantum gravity
title_sort graphical calculus of volume, inverse volume and hamiltonian operators in loop quantum gravity
publisher SpringerOpen
series European Physical Journal C: Particles and Fields
issn 1434-6044
1434-6052
publishDate 2017-04-01
description Abstract To adopt a practical method to calculate the action of geometrical operators on quantum states is a crucial task in loop quantum gravity. In this paper, the graphical calculus based on the original Brink graphical method is applied to loop quantum gravity along the line of previous work. The graphical method provides a very powerful technique for simplifying complicated calculations. The closed formula of the volume operator and the actions of the Euclidean Hamiltonian constraint operator and the so-called inverse volume operator on spin-network states with trivalent vertices are derived via the graphical method. By employing suitable and non-ambiguous graphs to represent the action of operators as well as the spin-network states, we use the simple rules of transforming graphs to obtain the resulting formula. Comparing with the complicated algebraic derivation in some literature, our procedure is more concise, intuitive and visual. The resulting matrix elements of the volume operator is compact and uniform, fitting for both gauge-invariant and gauge-variant spin-network states. Our results indicate some corrections to the existing results for the Hamiltonian operator and inverse volume operator in the literature.
url http://link.springer.com/article/10.1140/epjc/s10052-017-4713-0
work_keys_str_mv AT jinsongyang graphicalcalculusofvolumeinversevolumeandhamiltonianoperatorsinloopquantumgravity
AT yonggema graphicalcalculusofvolumeinversevolumeandhamiltonianoperatorsinloopquantumgravity
_version_ 1725292207993257984