Document Zbl 0515.65061

Baluch, M. H.; Mohsen, M. F. N.; Ali, A. I.

Method of weighted residuals as applied to nonlinear differential equations. (English) Zbl 0515.65061

Appl. Math. Modelling 7, 362-365 (1983).

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MSC:

65L10	Numerical solution of boundary value problems involving ordinary differential equations
34B15	Nonlinear boundary value problems for ordinary differential equations

Keywords:

convergence criterion; method of weighted residuals; Runge-Kutta scheme

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References:

[1]	Bellman, R. E.; Kalaba, R. E., Quasilinearization and non-linear boundary value problems (1965), Elsevier: Elsevier New York · Zbl 0139.10702
[2]	Keller, H. B., Numerical methods for two point boundary value problems (1968), Ginn-Blaisdell: Ginn-Blaisdell Waltham, Massachusetts · Zbl 0172.19503
[3]	Meyer, G. H., Initial value methods for boundary value problems (1973), Academic Press: Academic Press New York · Zbl 0304.34018
[4]	Na, T. Y., Computational methods in engineering boundary value problems (1979), Academic Press: Academic Press New York · Zbl 0456.76002
[5]	Brebbia, C. A.; Walker, S., Boundary element techniques in engineering (1980), Newnes-Butterworths: Newnes-Butterworths London · Zbl 0444.73065
[6]	Brebbia, C. A., The boundary element method for engineers (1978), Pentech Press: Pentech Press London · Zbl 0414.65060
[7]	Kubicek, H.; Hlavacek, V., Solution of nonlinear boundary value problems — part VIII, Chem. Engng Sci., 29, 1695 (1974)

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