Science Abstract
Abstract
New path integral molecular dynamics (PIMD) and path integral
hybrid Monte Carlo (PIHMC) algorithms are developed. It is
shown that the use of a simple noncanonical change of
variables that naturally divides the quadratic part of the
action into long and short wavelength modes and multiple
time scale integration techniques results in very efficient
algorithms. The PIMD method also employs a constant
temperature MD technique that has been shown to give
canonical averages even for stiff systems. The new methods
are applied to the simple quantum mechanical harmonic
oscillator and to electron solvation in fluid helium and
xenon. Comparisons are made with PIMC and the more basic
PIMD and PIHMC methods.