Numerical Study of a Field Theory for Directed Percolation

A. Chaktabarty; C. Bezuidenhout; C. W. Gardiner; D. ben-Avraham; D. Elderfield; D. Elderfield; E. T. Gawlinski; E. V. Albano; F. Petruccione; F. Schlögl; G. Grinstein; H. Guo; H. K. Janssen; H. K. Janssen; H. Park; H. Takayasu; I. Jensen; I. Jensen; I. Jensen; I. Jensen; I. Jensen; I. Jensen; I. Jensen; I. Jensen; I. Jensen; J. F. F. Mendes; J. W. Essam; K. Moser; L. Ramírez-Piscina; P. Grassberger; P. Grassberger; P. Grassberger; P. Grassberger; P. Grassberger; R. C. Brower; R. Dickman; R. Dickman; R. Durrett; R. M. Ziff; Ronald Dickman; T. Aukrust; T. Aukrust; T. E. Harris; T. M. Liggett; T. M. Rogers

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Numerical Study of a Field Theory for Directed Percolation

Abstract

A numerical method is devised for study of stochastic partial differential equations describing directed percolation, the contact process, and other models with a continuous transition to an absorbing state. Owing to the heightened sensitivity to fluctuationsattending multiplicative noise in the vicinity of an absorbing state, a useful method requires discretization of the field variable as well as of space and time. When applied to the field theory for directed percolation in 1+1 dimensions, the method yields critical exponents which compare well against accepted values.Comment: 18 pages, LaTeX, 6 figures available upon request LC-CM-94-00

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