Grand potential

The grand potential is a quantity used in statistical mechanics, especially for irreversible processes in open systems.

Grand potential is defined by: $Phi_{G} stackrel{mathrm{def{=} E - T S - mu N$ Where E is the energy, T is the temperature of the system, S is the entropy, μ is the chemical potential, and N is the number of particles in the system.

The change in the grand potential is given by: $dPhi_{G} = - S dT - N dmu - P dV$ Where P is pressure and V is volume.

When the system is in thermodynamic equilibrium, Φ_G is a minimum. This can be seen by considering that dΦ_G is zero if the volume is fixed and the temperature and chemical potential have stopped evolving.

For an ideal gas,: $Phi_{G} = - k_{B} T ln(Xi) = - k_{B} T Z_{1} e^{eta mu}$ where Ξ is the grand partition function, k_B is Boltzmann constant, Z₁ is the partition function for 1 particle and β is equal to 1 / k_BT.

Landau free energy

Some authors refer to the "Landau free energy" or Landau potential as: [Lee, Joon Chang. (2002) book "Thermal Physics - Entropy and Free Energies" (ch. 5). New Jersey: World Scientific] [Reference on "Landau potential" is found in the book "States of Matter" by David Goodstein (page 19) as $Omega = F- mu N ,;$ where "F" is the Helmholtz free energy. For homogeneous systems, one obtains $Omega = -PV ,;$ ]

: $Omega stackrel{mathrm{def{=} F - mu N = U - T S - mu N$

named after Russian physicist Lev Landau, which may be a synonym for the grand potential, depending on system stipulations.

References

See also

* Gibbs energy
* Helmholtz energy

External links

* [http://theory.ph.man.ac.uk/~judith/stat_therm/node88.html Grand Potential (Manchester University)]

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