Microcanonical ensemble: Difference between revisions

Microcanonical ensemble

Ensemble variables[edit]

(One component system, 3-dimensional system, ... ):

• ${\displaystyle \left.N\right.}$: number of particles

• ${\displaystyle \left.V\right.}$: is the volume

• ${\displaystyle \left.E\right.}$: is the internal energy (kinetic + potential)

Partition function[edit]

${\displaystyle Q_{NVE}={\frac {1}{h^{3N}N!}}\iint d(p)^{3N}d(q)^{3N}\delta (H(p,q)-E).}$

where:

• ${\displaystyle \left.h\right.}$ is the Planck constant

• ${\displaystyle \left(q\right)^{3N}}$ represents the 3N Cartesian position coordinates.

• ${\displaystyle \left(p\right)^{3N}}$ represents the 3N momenta.

• ${\displaystyle H\left(p,q\right)}$ represents the Hamiltonian, i.e. the total energy of the system as a function of coordinates and momenta.

• ${\displaystyle \delta \left(x\right)}$ is the Dirac delta distribution

Thermodynamics[edit]

${\displaystyle \left.S=k_{B}\log Q_{NVE}\right.}$

where:

• ${\displaystyle \left.S\right.}$ is the entropy.

• ${\displaystyle \left.k_{B}\right.}$ is the Boltzmann constant

References[edit]

Related reading

• D. Frenkel and B. Smit, "Understanding Molecular Simulation: From Algorithms to Applications", Academic Press
• Philipp Schierz, Johannes Zierenberg and Wolfhard Janke "Molecular Dynamics and Monte Carlo simulations in the microcanonical ensemble: Quantitative comparison and reweighting techniques", Journal of Chemical Physics 143 134114 (2015)