NHC Abstract
Abstract
Nosé has derived a set of dynamical equations that can be shown
to give canonically distributed positions and momenta provided the phase
space average can be taken into the trajectory average, i.e., the system
is ergodic [S. Nosé, J. Chem. Phys. 81, 511 (1984),
W.G. Hoover, Phys. Rev. A 31, 1695 (1985)]. Unfortunately,
the Nosé-Hoover dynamics is not ergodic for small or stiff
systems. Here a modification of the dynamics is proposed which includes
not a single thermostat variable but a chain of thermostat variables,
Nosé-Hoover chains. The ``new'' dynamics gives the canonical distribution
where the simple formalism fails. In addition, the new method is
easier to use than an extension [D. Kusnezov, A. Bulgac, and
W. Bauer, Ann. Phys. 204, 155 (1990)] which also gives
the canonical distribution for stiff cases.