NUMERICAL SOLUTION OF A 2D- DIFFUSION REACTION PROBLEM MODELLING THE DENSITY OF DI-VACANCIES AND VACANCIES IN A METAL
A decomposition solution of a diffusion reaction problem, which models the density of di-vacancies and vacancies in a metal is presented. The results are compared with the numerical solutions. Zero - diffusion solutions are obtained numerically and some figures are illustrated..
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- Adomian,G., (1994), Solving Frontier Problems of Physics: the Decomposition Method, Kluwer
- Academic Publishers, Boston. Ali,E.J., (2012), A New Technique of Initial Boundary Value Problems Using Adomian Decompo- sition Method, Int. Math. Forum., 7 (17), pp. 799–814.
- Brandes,E.A. and Brook,G.B., (1992), Smithells Metals Reference Book, Seventh Edition
- Butterworth-Heinemann, Oxford. Cherruault,Y. and Adomian,G., (1993), Decomposition methods: a new proof of convergence, Math. Comp. Model., 18, pp.103-106.
- Dieter,G.E., (1986), Mechanical Metallurgy, Third Edition, McGraw-Hill, New York.
- Dudarev,S.L., (2013), Density Functional Theory Models for Radiation Damage , Annu. Rev. Mater. Res., 43, pp.35-61.
- Hare,G. and Roelofs,L.D., (2002), Diffusion of vacancies and adatoms on stepped crystalline sur- faces , Surface Science., 511, pp.283-293.
- Hoang,S., Baraille,R., Talagrand,O., Nguyen,T.L., and De Mey,P., (1997), Approximation approach for nonlinear filtering problem with time dependent noises, Kybernetika., 33(5), pp.557-576.
- Kailas,S.V., Material Science: Diffusion.pdf. Retrieved from http://www.nptel.ac.in/courses/ /pdf/LectureNotes/MLN05.pdf Kaya,D. and Yokus,A., (2002), A numerical comparison of partial solutions in the decomposition method for linear and nonlinear partial differential equations, Math. Comput. Simulat., 60, pp.507
- Kaya,D. and Aassila,M., (2002), An application for a generalized KdV equation by the decompo- sition method, Phys.Lett. A., 299, pp.201-206.
- Malik,R., Burch,D., Bazant,M., and Ceder,G. , Particle Size Dependence of the Ionic Diffusivity, DOI: 10.1021/nl1023595, Retrieved from pubs.acs.org/NanoLett.
- Pamuk,S. , (2005), The decomposition method for continuous population models for single and interacting species, Applied Mathematics and Computation., 163(1), pp.79-88.
- Pamuk,S., (2005), An application for linear and nonlinear heat equations by Adomians decompo- sition method, Applied Mathematics and Computation, 163(1), pp.89-96.
- Pamuk,S., (2005), Solution of the porous media equation by Adomians decomposition method
- Physics Letters A., 344 (2-4), pp.184-188. Sewell,G., (1988), The numerical Solution of Ordinary and Partial Differential Equations. Aca- demic Press, New York.
- Shewmon,P.G., (1989), Diffusion in Solids, Second Edition, The Minerals, Metals and Materials
- Society, Warrendale, PA. Sterne,P.A., J. van Ek, and Howell,R.H., (1997), Electronic Structure Calculations of Vacancies and Their Influence on Materials Properties, UCRL-JC-127349, Preprint.
- Serdal Pamuk, for the photograph and short biography, see TWMS J. Appl. and Eng. Math., V.3, No.2, 2013.
- ISSN: 2146-1147
- Başlangıç: 2010
- Yayıncı: Turkic World Mathematical Society