Using fermionic representation of spin degrees of freedom within the
Popov-Fedotov approach we develop an algorithm for Monte Carlo sampling of
skeleton Feynman diagrams for Heisenberg type models. Our scheme works without
modifications for any dimension of space, lattice geometry, and interaction
range, i.e. it is suitable for dealing with frustrated magnetic systems at
finite temperature. As a practical application we compute uniform magnetic
susceptibility of the antiferromagnetic Heisenberg model on the triangular
lattice and compare our results with the best available high-temperature
expansions. We also report results for the momentum-dependence of the static
magnetic susceptibility throughout the Brillouin zone.
Description
Bold Diagrammatic Monte Carlo technique for frustrated spin systems
%0 Generic
%1 kulagin2012diagrammatic
%A Kulagin, Sergey
%A Prokof'ev, Nikolay
%A Starykh, Oleg
%A Svistunov, Boris
%A Varney, Christopher N.
%D 2012
%K diagrammatic frustrated montecarlo spin
%T Bold Diagrammatic Monte Carlo technique for frustrated spin systems
%U http://arxiv.org/abs/1211.3631
%X Using fermionic representation of spin degrees of freedom within the
Popov-Fedotov approach we develop an algorithm for Monte Carlo sampling of
skeleton Feynman diagrams for Heisenberg type models. Our scheme works without
modifications for any dimension of space, lattice geometry, and interaction
range, i.e. it is suitable for dealing with frustrated magnetic systems at
finite temperature. As a practical application we compute uniform magnetic
susceptibility of the antiferromagnetic Heisenberg model on the triangular
lattice and compare our results with the best available high-temperature
expansions. We also report results for the momentum-dependence of the static
magnetic susceptibility throughout the Brillouin zone.
@misc{kulagin2012diagrammatic,
abstract = {Using fermionic representation of spin degrees of freedom within the
Popov-Fedotov approach we develop an algorithm for Monte Carlo sampling of
skeleton Feynman diagrams for Heisenberg type models. Our scheme works without
modifications for any dimension of space, lattice geometry, and interaction
range, i.e. it is suitable for dealing with frustrated magnetic systems at
finite temperature. As a practical application we compute uniform magnetic
susceptibility of the antiferromagnetic Heisenberg model on the triangular
lattice and compare our results with the best available high-temperature
expansions. We also report results for the momentum-dependence of the static
magnetic susceptibility throughout the Brillouin zone.},
added-at = {2012-11-19T04:33:41.000+0100},
author = {Kulagin, Sergey and Prokof'ev, Nikolay and Starykh, Oleg and Svistunov, Boris and Varney, Christopher N.},
biburl = {https://www.bibsonomy.org/bibtex/2b4ef9e1b31f7680a4e220610a523b906/kyungminlee},
description = {Bold Diagrammatic Monte Carlo technique for frustrated spin systems},
interhash = {a679c2c509c80411a67090e122170450},
intrahash = {b4ef9e1b31f7680a4e220610a523b906},
keywords = {diagrammatic frustrated montecarlo spin},
note = {cite arxiv:1211.3631Comment: 15 pages, 16 figures},
timestamp = {2012-11-19T04:33:41.000+0100},
title = {Bold Diagrammatic Monte Carlo technique for frustrated spin systems},
url = {http://arxiv.org/abs/1211.3631},
year = 2012
}