On the Boltzmann-Grad Limit for Smooth Hard-Sphere Systems

J 2018

On the Boltzmann-Grad Limit for Smooth Hard-Sphere Systems

TESSAROTTO, Massimo, Claudio CREMASCHINI, Michael MOND, Claudio ASCI, Alessandro SORANZO et. al.

Basic information

Original name

On the Boltzmann-Grad Limit for Smooth Hard-Sphere Systems

Authors

TESSAROTTO, Massimo (380 Italy, guarantor, belonging to the institution), Claudio CREMASCHINI (380 Italy, belonging to the institution), Michael MOND (376 Israel), Claudio ASCI (380 Italy), Alessandro SORANZO (380 Italy) and Gino TIRONI (380 Italy)

Edition

Foundations of Physics, 2018, 0015-9018

Other information

Language

English

Type of outcome

Článek v odborném periodiku

Field of Study

10305 Fluids and plasma physics

Country of publisher

United States of America

Confidentiality degree

není předmětem státního či obchodního tajemství

References:

URL

Impact factor

Impact factor: 1.344

RIV identification code

RIV/47813059:19240/18:A0000273

Organization unit

Faculty of Philosophy and Science in Opava

DOI

http://dx.doi.org/10.1007/s10701-018-0144-5

UT WoS

000427593500001

Keywords in English

Boltzmann equation; Hard-sphere classical dynamical system; Boltzmann H-theorem; Master kinetic equation

Abstract

V originále

The problem is posed of the prescription of the so-called Boltzmann-Grad limit operator (L_{BG}) for the N-body system of smooth hard-spheres which undergo unary, binary as well as multiple elastic instantaneous collisions. It is proved, that, despite the non-commutative property of the operator L_{BG}, the Boltzmann equation can nevertheless be uniquely determined. In particular, consistent with the claim of Uffink and Valente (Found Phys 45:404, 2015) that there is 'no time-asymmetric ingredient' in its derivation, the Boltzmann equation is shown to be time-reversal symmetric. The proof is couched on the "ab initio" axiomatic approach to the classical statistical mechanics recently developed (Tessarotto et al. in Eur Phys J Plus 128:32, 2013). Implications relevant for the physical interpretation of the Boltzmann H-theorem and the phenomenon of decay to kinetic equilibrium are pointed out.

Citovat

TESSAROTTO, Massimo, Claudio CREMASCHINI, Michael MOND, Claudio ASCI, Alessandro SORANZO and Gino TIRONI. On the Boltzmann-Grad Limit for Smooth Hard-Sphere Systems. Foundations of Physics. 2018, vol. 48, No 3, p. 271-294. ISSN 0015-9018. Available from: https://dx.doi.org/10.1007/s10701-018-0144-5.

@article{30099,
   author = {Tessarotto, Massimo and Cremaschini, Claudio and Mond, Michael and Asci, Claudio and Soranzo, Alessandro and Tironi, Gino},
   article_number = {3},
   doi = {http://dx.doi.org/10.1007/s10701-018-0144-5},
   keywords = {Boltzmann equation; Hard-sphere classical dynamical system; Boltzmann H-theorem; Master kinetic equation},
   language = {eng},
   issn = {0015-9018},
   journal = {Foundations of Physics},
   title = {On the Boltzmann-Grad Limit for Smooth Hard-Sphere Systems},
   url = {https://link.springer.com/article/10.1007%2Fs10701-018-0144-5},
   volume = {48},
   year = {2018}
}

TY  - JOUR
ID  - 30099
AU  - Tessarotto, Massimo - Cremaschini, Claudio - Mond, Michael - Asci, Claudio - Soranzo, Alessandro - Tironi, Gino
PY  - 2018
TI  - On the Boltzmann-Grad Limit for Smooth Hard-Sphere Systems
JF  - Foundations of Physics
VL  - 48
IS  - 3
SP  - 271-294
EP  - 271-294
SN  - 00159018
KW  - Boltzmann equation
KW  - Hard-sphere classical dynamical system
KW  - Boltzmann H-theorem
KW  - Master kinetic equation
UR  - https://link.springer.com/article/10.1007%2Fs10701-018-0144-5
L2  - https://link.springer.com/article/10.1007%2Fs10701-018-0144-5
N2  - The problem is posed of the prescription of the so-called Boltzmann-Grad limit operator (L_{BG}) for the N-body system of smooth hard-spheres which undergo unary, binary as well as multiple elastic instantaneous collisions. It is proved, that, despite the non-commutative property of the operator L_{BG}, the Boltzmann equation can nevertheless be uniquely determined. In particular, consistent with the claim of Uffink and Valente (Found Phys 45:404, 2015) that there is 'no time-asymmetric ingredient' in its derivation, the Boltzmann equation is shown to be time-reversal symmetric. The proof is couched on the "ab initio" axiomatic approach to the classical statistical mechanics recently developed (Tessarotto et al. in Eur Phys J Plus 128:32, 2013). Implications relevant for the physical interpretation of the Boltzmann H-theorem and the phenomenon of decay to kinetic equilibrium are pointed out.
ER  -

TESSAROTTO, Massimo, Claudio CREMASCHINI, Michael MOND, Claudio ASCI, Alessandro SORANZO and Gino TIRONI. On the Boltzmann-Grad Limit for Smooth Hard-Sphere Systems. \textit{Foundations of Physics}. 2018, vol.~48, No~3, p.~271-294. ISSN~0015-9018. Available from: https://dx.doi.org/10.1007/s10701-018-0144-5.

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