WSEAS Transactions on Mathematics
Print ISSN: 1109-2769, E-ISSN: 2224-2880
Volume 19, 2020
On Some Comparison of Computing Indefinite Integrals with the Solution of the Initial-value Problem for ODE
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Abstract: The initial-value problem for the ODE is one of the classical mathematical problems, which was fundamentally investigated by many authors. This problem has been basically studied by using the quadrature formulas. Note that in the construction of quadrature formulas are used interpolation polynomials with different properties. Here, has been established some connection between the ODE and definite integrals, by using of which have constructed effective methods for computing of definite integrals. By using some multistep methods have demonstrated the advantage of the multistep methods. And also demonstrated the advantages of the proposed here methods in the construction of which didn’t use the theory of interpolation polynomials. Quadrature methods are studied as the special case of the multistep methods. And also have determined the maximal order of the quadrature method. Here received the apriori estimation for the errors of quadrature methods. Proposed concrete methods some of which have applied to the computing of the model definite integral.
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Keywords: The initial-value problem, integral equation, quadrature formula, ODE, finite-difference methods
Pages: 208-215
DOI: 10.37394/23206.2020.19.19