Title of article
A quasi-random walk method for one-dimensional reaction–diffusion equations Original Research Article
Author/Authors
S. Ogawa، نويسنده , , C. Lécot، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
8
From page
487
To page
494
Abstract
Probabilistic methods are presented to solve one-dimensional nonlinear reaction–diffusion equations. Computational particles are used to approximate the spatial derivative of the solution. The random walk principle is used to model the diffusion term. We investigate the effect of replacing pseudo-random numbers by quasi-random numbers in the random walk steps. This cannot be implemented in a straightforward fashion, because of correlations. If the particles are reordered according to their position at each time step, this has the effect of breaking correlations. For simple demonstration problems, the error is found to be significantly less when quasi-random sequences are used than when a standard random walk calculation is performed using pseudo-random points.
Keywords
reaction–diffusion equations , Kolmogorov equation , Random walk , Nagumo’s equation
Journal title
Mathematics and Computers in Simulation
Serial Year
2003
Journal title
Mathematics and Computers in Simulation
Record number
854035
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