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A new approach for solving a complex-valued differential equation

✍ Scribed by L. Cveticanin

Book ID
104031279
Publisher
Elsevier Science
Year
2004
Tongue
English
Weight
271 KB
Volume
278
Category
Article
ISSN
0022-460X

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✦ Synopsis

In this paper two analytical approximate solving procedures for a complex-valued differential equation are developed. One of the methods represents the generalization of the Krylov-Bogolubov method for a strong differential equation with complex function. The second method is based on the first integrals of the system. The differential equation is transformed introducing the perturbed first integrals and the polar coordinates. The solution is obtained applying the straightforward series expansion. The solution for the special case of without impact initial conditions is considered. The method is applied on the system with strong cubic non-linearity. The small gyroscopic function and damping function are introduced. The analytical approximate solution is compared with numerical exact one and shows a good agreement.

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## Abstract There have been many numerical solution approaches to ordinary differential equations in the literature. However, very few are effective in solving non‐linear ordinary differential equations (ODEs), particularly when they are of order higher than one. With modern symbolic calculation pa