Stability and asymptotic behavior of a numerical solution corresponding to a diffusion-reaction equation solved by a finite difference scheme (Crank-Nicolson)

Y Cherruault,J.M Valleton,J.C Vincent,M Choubane

doi:10.1016/0898-1221(90)90217-8

Stability and asymptotic behavior of a numerical solution corresponding to a diffusion-reaction equation solved by a finite difference scheme (Crank-Nicolson)

Y Cherruault, J.M Valleton + Show 2 more

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https://doi.org/10.1016/0898-1221(90)90217-8

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Journal: Computers and Mathematics with Applications	Publication Date: Jan 1, 1990
Citations: 16	License type: elsevier-specific: oa user license

#Crank-Nicolson Technique #Diffusion-reaction Processes + Show 8 more

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Abstract

In this paper some partial differential equations arising in biochemistry are studied from the numerical point of view. These nonlinear equations (based on diffusion-reaction processes) are solved by using a Crank-Nicolson technique and convergence is proved by using lower and upper solutions. Stability and asymptotic behavior are also examined. A numerical algorithm has been deduced and is presently used by chemists.

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