H-theorem

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Boltzmann's H-theorem[edit]

Boltzmann's H-theorem states that the entropy of a closed system can only increase in the course of time, and must approach a limit as time tends to infinity.

${\displaystyle \sigma \geq 0}$

where ${\displaystyle \sigma }$ is the entropy source strength, given by (Eq 36 Chap IX Ref. 2)

${\displaystyle \sigma =-k\sum _{i,j}\int C(f_{i},f_{j})\ln f_{i}d{\mathbf {u} }_{i}}$

where the function C() represents binary collisions. At equilibrium, ${\displaystyle \sigma =0}$.

Boltzmann's H-function[edit]

Boltzmann's H-function is defined by (Eq. 5.66 Ref. 3):

${\displaystyle H=\iint f({\mathbf {V} },{\mathbf {r} },t)\ln f({\mathbf {V} },{\mathbf {r} },t)~d{\mathbf {r} }d{\mathbf {V} }}$

where ${\displaystyle {\mathbf {V} }}$ is the molecular velocity. A restatement of the H-theorem is

${\displaystyle {\frac {dH}{dt}}\leq 0}$

Gibbs's H-function[edit]

See also[edit]

• Boltzmann equation
• Second law of thermodynamics

References[edit]

1. L. Boltzmann "", Wiener Ber. 63 pp. 275- (1872)
2. Sybren R. De Groot and Peter Mazur "Non-Equilibrium Thermodynamics", Dover Publications
3. Robert Zwanzig "Nonequilibrium Statistical Mechanics", Oxford University Press (2001)

Related reading

• Philip T. Gressman and Robert M. Strain "Global classical solutions of the Boltzmann equation with long-range interactions", Proceedings of the National Academy of Sciences of the United States of America 107 pp. 5744-5749 (2010)
• James C. Reid, Denis J. Evans, and Debra J. Searles "Communication: Beyond Boltzmann's H-theorem: Demonstration of the relaxation theorem for a non-monotonic approach to equilibrium", Journal of Chemical Physics 136 021101 (2012)