Article (Scientific journals)
Determinant representation of the domain-wall boundary condition partition function of a Richardson–Gaudin model containing one arbitrary spin
Faribault, Alexandre; Tschirhart, Hugo; Muller, Nicolas
2016In Journal of Physics. A, Mathematical and Theoretical
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Keywords :
Integrability; Form Factors; Spin-models
Abstract :
[en] In this work we present a determinant expression for the domain-wall boundary condition partition function of rational (XXX) Richardson–Gaudin models which, in addition to N-1 spins 1/2, contains one arbitrarily large spin S. The proposed determinant representation is written in terms of a set of variables which, from previous work, are known to define eigenstates of the quantum integrable models belonging to this class as solutions to quadratic Bethe equations. Such a determinant can be useful numerically since systems of quadratic equations are much simpler to solve than the usual highly nonlinear Bethe equations. It can therefore offer significant gains in stability and computation speed.
Disciplines :
Physics
Author, co-author :
Faribault, Alexandre
Tschirhart, Hugo ;  University of Luxembourg > Faculty of Science, Technology and Communication (FSTC) > Physics and Materials Science Research Unit
Muller, Nicolas
External co-authors :
yes
Language :
English
Title :
Determinant representation of the domain-wall boundary condition partition function of a Richardson–Gaudin model containing one arbitrary spin
Publication date :
26 March 2016
Journal title :
Journal of Physics. A, Mathematical and Theoretical
ISSN :
1751-8121
Publisher :
IoP
Peer reviewed :
Peer Reviewed verified by ORBi
Focus Area :
Physics and Materials Science
Available on ORBilu :
since 07 December 2017

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