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A novel application of radial basis functions for solving a model of first-order integro-ordinary differential equation

โœ Scribed by K. Parand; S. Abbasbandy; S. Kazem; J.A. Rad

Publisher
Elsevier Science
Year
2011
Tongue
English
Weight
531 KB
Volume
16
Category
Article
ISSN
1007-5704

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โœฆ Synopsis

In this paper two common collocation approaches based on radial basis functions (RBFs) have been considered; one is computed through the differentiation process (DRBF) and the other one is computed through the integration process (IRBF). We investigate these two approaches on the Volterra's Population Model which is an integro-differential equation without converting it to an ordinary differential equation. To solve the problem, we use four well-known radial basis functions: Multiquadrics (MQ), Inverse multiquadrics (IMQ), Gaussian (GA) and Hyperbolic secant (sech) which is a newborn RBF. Numerical results and residual norm รฐkRรฐtรžk 2 รž show good accuracy and rate of convergence of two common approaches.

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