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@ARTICLE{Jin:133029,
author = {Jin, Fengping and Neuhaus, T and Michielsen, K and
Miyashita, S and Novotny, M A and Katsnelson, M I and De
Raedt, H},
title = {{E}quilibration and thermalization of classical systems},
journal = {New journal of physics},
volume = {15},
number = {3},
issn = {1367-2630},
address = {[Bad Honnef]},
publisher = {Dt. Physikalische Ges.},
reportid = {FZJ-2013-01597},
pages = {033009},
year = {2013},
abstract = {Numerical evidence is presented that the canonical
distribution for a subsystem of a closed classical system of
a ring of coupled harmonic oscillators (integrable system)
or magnetic moments (nonintegrable system) follows directly
from the solution of the time-reversible Newtonian equation
of motion in which the total energy is strictly conserved.
Without performing ensemble averaging or introducing
fictitious thermostats, it is shown that this observation
holds even though the whole system may contain as little as
a few thousand particles. In other words, we demonstrate
that the canonical distribution holds for subsystems of
experimentally relevant sizes and observation times.},
cin = {JSC},
ddc = {530},
cid = {I:(DE-Juel1)JSC-20090406},
pnm = {411 - Computational Science and Mathematical Methods
(POF2-411)},
pid = {G:(DE-HGF)POF2-411},
typ = {PUB:(DE-HGF)16},
UT = {WOS:000316184400002},
doi = {10.1088/1367-2630/15/3/033009},
url = {https://juser.fz-juelich.de/record/133029},
}
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