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Article overview
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Higher order and infinite Trotter-number extrapolations in path integral Monte Carlo | L. Brualla
; K. Sakkos
; J. Boronat
; J. Casulleras
; | Date: |
21 Apr 2004 | Subject: | Statistical Mechanics | cond-mat.stat-mech | Abstract: | Improvements beyond the primitive approximation in the path integral Monte Carlo method are explored both in a model problem and in real systems. Two different strategies are studied: the Richardson extrapolation on top of the path integral Monte Carlo data and the Takahashi-Imada action. The Richardson extrapolation, mainly combined with the primitive action, always reduces the number-of-beads dependence, helps in determining the approach to the dominant power law behavior, and all without additional computational cost. The Takahashi-Imada action has been tested in two hard-core interacting quantum liquids at low temperature. The results obtained show that the fourth-order behavior near the asymptote is conserved, and that the use of this improved action reduces the computing time with respect to the primitive approximation. | Source: | arXiv, cond-mat/0404493 | Services: | Forum | Review | PDF | Favorites |
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