Path integral formulation

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The Path integral formulation is an elegant method by which quantum mechanical contributions can be incorporated within a classical simulation using Feynman path integrals (Refs. 1-7). Such simulations are particularly applicable to light atoms and molecules such as hydrogen, helium, neon and argon, as well as quantum rotators such as methane and water.

Principles

In the path integral formulation the canonical partition function (in one dimension) is written as (Ref. 4 Eq. 1)

where is the Euclidian action, given by (Ref. 4 Eq. 2)

where is the path in time and is the Hamiltonian. This leads to (Ref. 4 Eq. 3)

where the Euclidean time is discretised in units of

and (Ref. 4 Eq. 4)

.

where is the Trotter number. In the Trotter limit, where these equations become exact. In the case where these equations revert to a classical simulation. It has long been recognised that there is an isomorphism between this discretised quantum mechanical description, and the classical statistical mechanics of polyatomic fluids, in particular flexible ring molecules (Ref. 3), due to the periodic boundary conditions in imaginary time. It can be seen from the first term of the above equation that each particle interacts with is neighbours and via a harmonic spring. The second term provides the internal potential energy. Thus in three dimensions one has the density operator

which thanks to the Trotter formula we can tease out , where

and

The internal energy is given by

The average kinetic energy is known as the primitive estimator, i.e.

Harmonic oscillator

The density matrix for a harmonic oscillator is given by (Ref. 1 Eq. 10-44)

Related reading

Rotational degrees of freedom

In the case of systems having () rotational degrees of freedom the Hamiltonian can be written in the form (Ref. 8 Eq. 2.1):

where the rotational part of the kinetic energy operator is given by (Ref. 8 Eq. 2.2)

where are the components of the angular momentum operator, and are the moments of inertia. For a rigid three dimensional asymmetric top the kernel is given by (Ref. 9 Eq. 5):

where are the Euler angles, is the Wigner D-matrix and are the eigenenergies.

Techniques

Path integral Monte Carlo

Path integral Monte Carlo (PIMC)

Path integral molecular dynamics

Path integral molecular dynamics (PIMD)

Centroid molecular dynamics

Centroid molecular dynamics (CMD)

Ring polymer molecular dynamics

Ring polymer molecular dynamics (RPMD)

Normal mode PIMD

Grand canonical Monte Carlo

A path integral version of the Widom test-particle method for grand canonical Monte Carlo simulations:

Applications

References

  1. R. P. Feynman and A. R. Hibbs "Path-integrals and Quantum Mechanics", McGraw-Hill, New York (1965) ISBN 0-07-020650-3
  2. R. P. Feynman "Statistical Mechanics", Benjamin, Reading, Massachusetts, (1972) ISBN 0-201-36076-4 Chapter 3.
  3. David Chandler and Peter G. Wolynes "Exploiting the isomorphism between quantum theory and classical statistical mechanics of polyatomic fluids", Journal of Chemical Physics 74 pp. 4078-4095 (1981)
  4. B. J. Berne and ­D. Thirumalai "On the Simulation of Quantum Systems: Path Integral Methods", Annual Review of Physical Chemistry 37 pp. 401-424 (1986)
  5. D. M. Ceperley "Path integrals in the theory of condensed helium", Reviews of Modern Physics 67 279 - 355 (1995)
  6. Charusita Chakravarty "Path integral simulations of atomic and molecular systems", International Reviews in Physical Chemistry 16 pp. 421-444 (1997)
  7. M. J. Gillan "The path-integral simulation of quantum systems" in "Computer Modelling of Fluids Polymers and Solids" eds. C. R. A. Catlow, S. C. Parker and M. P. Allen, NATO ASI Series C 293 pp. 155-188 (1990) ISBN 978-0-7923-0549-1
  8. Dominik Marx and Martin H Müser "Path integral simulations of rotors: theory and applications", Journal of Physics: Condensed Matter 11 pp. R117-R155 (1999)
  9. M. H. Müser and B. J. Berne "Path-Integral Monte Carlo Scheme for Rigid Tops: Application to the Quantum Rotator Phase Transition in Solid Methane", Physical Review Letters 77 pp. 2638-2641 (1996)

External links