Numerical Analysis of the Chebyshev Collocation Method for Functional Volterra Integral Equations

J. S. Azevedo; S. M. Afonso; M. P. G. Silva

doi:10.5540/tema.2020.021.03.521

Trends in Computational and Applied Mathematics (Nov 2020)

Numerical Analysis of the Chebyshev Collocation Method for Functional Volterra Integral Equations

J. S. Azevedo,
S. M. Afonso,
M. P. G. Silva

Affiliations

J. S. Azevedo: Universidade Federal da Bahia - UFBA, Instituto de Ciencias, Tecnologia e Inovação Centro, 42802-721, Camaçari-BA, Brazil
S. M. Afonso: UNESP
M. P. G. Silva: UFRB

DOI: https://doi.org/10.5540/tema.2020.021.03.521
Journal volume & issue: Vol. 21, no. 3

Abstract

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The collocation method based on Chebyshev basis functions, coupled Picard iterative process, is proposed to solve a functional Volterra integral equation of the second kind. Using the Banach Fixed Point Theorem, we prove theorems on the existence and uniqueness solutions in the L2-norm. We also provide the convergence and stability analysis of the proposed method, which indicates that the numerical errors in the L2-norm decay exponentially, provided that the kernel function is sufficiently smooth. Numerical results are presented and they confirm the theoretical prediction of the exponential rate of convergence.

Published in Trends in Computational and Applied Mathematics

ISSN: 2676-0029 (Online)
Publisher: Sociedade Brasileira de Matemática Aplicada e Computacional
Country of publisher: Brazil
LCC subjects: Science: Mathematics
Website: https://tema.sbmac.org.br/tema

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