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Collocation method using sinc and Rational Legendre functions for solving Volterra’s population model

✍ Scribed by K. Parand; Z. Delafkar; N. Pakniat; A. Pirkhedri; M. Kazemnasab Haji

Publisher: Elsevier Science
Year: 2011
Tongue: English
Weight: 286 KB
Volume: 16
Category: Article
ISSN: 1007-5704
DOI: 10.1016/j.cnsns.2010.08.018

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✦ Synopsis

This paper proposes two approximate methods to solve Volterra's population model for population growth of a species in a closed system. Volterra's model is a nonlinear integro-differential equation on a semi-infinite interval, where the integral term represents the effect of toxin. The proposed methods have been established based on collocation approach using Sinc functions and Rational Legendre functions. They are utilized to reduce the computation of this problem to some algebraic equations. These solutions are also compared with some well-known results which show that they are accurate.

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Numerical approximations for population

Numerical approximations for population growth model by rational Chebyshev and Hermite functions collocation approach: A comparison

✍ K. Parand; A. R. Rezaei; A. Taghavi 📂 Article 📅 2010 🏛 John Wiley and Sons 🌐 English ⚖ 197 KB

This paper aims to compare rational Chebyshev (RC) and Hermite functions (HF) collocation approach to solve Volterra's model for population growth of a species within a closed system. This model is a nonlinear integro-differential equation where the integral term represents the effect of toxin. This