We introduce a multiscale Monte Carlo algorithm to simulate dense simple
fluids. The probability of an update follows a power law distribution in its
length scale. The collective motion of clusters of particles requires
generalization of the Metropolis update rule to impose detailed balance. We
apply the method to the simulation of a Lennard-Jones fluid and show
improvements in efficiency over conventional Monte Carlo and molecular
dynamics, eliminating hydrodynamic slowing down.Comment: 4 pages, 3 figures, revtex4. New figure added, labeling of figure 2
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