Entropy formula of N-body system

Authors
Shim, Jae Wan
Issue Date
2020-08
Publisher
Nature Publishing Group
Citation
Scientific Reports, v.10, no.1
Abstract
We prove a proposition that the entropy of the system composed of finite N molecules of ideal gas is the q-entropy or Havrda-Charvat-Tsallis entropy, which is also known as Tsallis entropy, with the entropic index q = D(N-1)-4/D(N-1)-2 in D-dimensional space. The indispensable infinity assumption used by Boltzmann and others in their derivation of entropy formulae is not involved in our derivation, therefore our derived formula is exact. The analogy of the N-body system brings us to obtain the entropic index of a combined system q(C) formed from subsystems having different entropic indexes q(A) and q(B) as 1/1-q(C) = 1/1-q(A) + 1/1-q(B) + D+2/2. It is possible to use the number N for the physical measure of deviation from Boltzmann entropy.
Keywords
EXTENSIVE STATISTICAL-MECHANICS; NONEXTENSIVITY; DYNAMICS
ISSN
2045-2322
URI
https://pubs.kist.re.kr/handle/201004/118318
DOI
10.1038/s41598-020-71103-w
Appears in Collections:
KIST Article > 2020
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