In this paper numerical methods for the initial value problems of general second order differential equations are derived. The methods depend upon the parameters p and q which are the new additional values of the coefficients of y? and y in the given differential equation. Here, we report a new two step fourth order method. As p tends to zero and q ? (2?/h)2 the method is absolutely stable. Numerical results are presented for Bessel's, Legendre's and general second order differential equations.
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Date
Additive parameters methods for the numerical integration of y? = f (t, y, y?)
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Publisher
Elsevier
Abstract
1996
Description
Keywords
Differential equations, Finite difference method, Numerical methods, Additive parameters, General second order initial value problems, Integration
Citation
Journal of Computational and Applied Mathematics, 1996, 67, 2, pp. 271-276