Collocation methods for two dimensional weakly singular integral equations

Ivan G. Graham

doi:10.1017/S0334270000002800

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Given a Fredhoim integral equation of the second kind, which is defined over a certain region ⊆ R2, we define and , two different numerical approximations to its solution, using the collocation and iterated collocation methods respectively. We describe without proof some known results concerning the general convergence properties of and when the kernel and solution of the integral equation are smooth. Then, we prove rigorously order of convergence estimates for and which are applicable in the practically siginificant case when is a rectangle, and the kernel of the integral equation is weakly singular. These estimates are illustrated by the numerical solution of a two dimensional weakly singular equation which arises in electrical engineering.

References

[1]Chandler, G. A., “Product integration methods for weakly singular second kind integral equations”, submitted for publication.Google Scholar

[2]Dewar, F. A., Solution of Fredholm integral equations by the Galerkin and iterated Galerkin methods (M. Sc. Thesis, University of New South Wales, 1980).Google Scholar

[3]Graham, I. G. and Sloan, I. H., “On the compactness of certain integral operators”, J. Math. Anal. Appl. 68 (1979), 580–594.CrossRef Google Scholar

[4]Graham, I. G., ”, in The application and numerical solution of integral equations (eds. Anderssen, R. S., de Hoog, F. R., and Lukas, M. A.) (Alphen aan den Rijn: Sijthoff and Noordhoff, 1980).Google Scholar

[5]Graham, I. G., The numerical solution of Fredholm integral equations of the second kind (Ph. D. Thesis, University of New South Wales, 1980).CrossRef Google Scholar

[6]Kantorovich, L. V. and Akilov, G. P., Functional analysis in normed spaces (London/New York: Pergamon, 1964).Google Scholar

[7]Kufner, A., John, O., and Fucik, S., Function spaces (Leyden: Noordhoff International, 1977).Google Scholar

[8]Munteanu, M. J. and Schumaker, L. L., “Direct and inverse theorems for multidimensional spline approximation”, Indiana Univ. Math. J. 23 (1973), 461–470.CrossRef Google Scholar

[9]Schneider, C., “Product integration for weakly singular integral equations”, Math. of Comp., to appear.Google Scholar

[10]Sloan, I. H., Noussair, E. and Burn, B. J., “Projection methods for equations of the second kind”, J. Math. Anal. Appl. 69 (1979), 84–103.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Atkinson, K. Graham, I. and Sloan, I. 1983. Piecewise Continuous Collocation for Integral Equations. SIAM Journal on Numerical Analysis, Vol. 20, Issue. 1, p. 172.

Hideaki, Kaneko 1985. A schauder decomposition and weakly singular integral equations in Lp. Numerical Functional Analysis and Optimization, Vol. 7, Issue. 2-3, p. 221.

Graham, Ivan G 1985. Estimates for the modulus of smoothness. Journal of Approximation Theory, Vol. 44, Issue. 2, p. 95.

Golberg, M. A. 1990. Numerical Solution of Integral Equations. p. 71.

de Doncker, E. and Kapenga, J. 1991. Numerical Linear Algebra, Digital Signal Processing and Parallel Algorithms. p. 467.

Vainikko, G. 1992. On the Piecewise Constant Collocation Method for Multidimensional Weakly Singular Integral Equations. Journal of Integral Equations and Applications, Vol. 4, Issue. 4,

Mirkin, Michael V. and Bard, Allen J. 1992. Multidimensional integral equations. Journal of Electroanalytical Chemistry, Vol. 323, Issue. 1-2, p. 1.

Bazm, S. and Babolian, E. 2012. Numerical solution of nonlinear two-dimensional Fredholm integral equations of the second kind using Gauss product quadrature rules. Communications in Nonlinear Science and Numerical Simulation, Vol. 17, Issue. 3, p. 1215.

Ghasemi, M. Fardi, M. and Khoshsiar Ghaziani, R. 2013. Solution of system of the mixed Volterra–Fredholm integral equations by an analytical method. Mathematical and Computer Modelling, Vol. 58, Issue. 7-8, p. 1522.

Assari, Pouria Adibi, Hojatollah and Dehghan, Mehdi 2014. A meshless method based on the moving least squares (MLS) approximation for the numerical solution of two-dimensional nonlinear integral equations of the second kind on non-rectangular domains. Numerical Algorithms, Vol. 67, Issue. 2, p. 423.

Aziz, Imran Siraj-ul-Islam and Khan, Fawad 2014. A new method based on Haar wavelet for the numerical solution of two-dimensional nonlinear integral equations. Journal of Computational and Applied Mathematics, Vol. 272, Issue. , p. 70.

Mirzaee, Farshid and Hadadiyan, Elham 2016. Application of two-dimensional hat functions for solving space-time integral equations. Journal of Applied Mathematics and Computing, Vol. 51, Issue. 1-2, p. 453.

Assari, Pouria and Dehghan, Mehdi 2017. A meshless method for the numerical solution of nonlinear weakly singular integral equations using radial basis functions. The European Physical Journal Plus, Vol. 132, Issue. 5,

JAFARZADEH, Yousef and KERAMATI, Bagher 2017. Convergence Analysis of Parabolic Basis Functions for Solving Systems of Linear and Nonlinear Fredholm Integral Equations. TURKISH JOURNAL OF MATHEMATICS, Vol. 41, Issue. , p. 787.

Maleknejad, K. and Saeedipoor, E. 2017. Hybrid function method and convergence analysis for two-dimensional nonlinear integral equations. Journal of Computational and Applied Mathematics, Vol. 322, Issue. , p. 96.

Fazli, A. Allahviranloo, T. and Javadi, Sh. 2017. Numerical solution of nonlinear two-dimensional Volterra integral equation of the second kind in the reproducing kernel space. Mathematical Sciences, Vol. 11, Issue. 2, p. 139.

Assari, Pouria and Dehghan, Mehdi 2018. A meshless local discrete collocation (MLDC) scheme for solving 2‐dimensional singular integral equations with logarithmic kernels. International Journal of Numerical Modelling: Electronic Networks, Devices and Fields, Vol. 31, Issue. 3,

Assari, Pouria and Dehghan, Mehdi 2018. The approximate solution of nonlinear Volterra integral equations of the second kind using radial basis functions. Applied Numerical Mathematics, Vol. 131, Issue. , p. 140.

Assari, Pouria Asadi-Mehregan, Fatemeh and Dehghan, Mehdi 2019. On the numerical solution of Fredholm integral equations utilizing the local radial basis function method. International Journal of Computer Mathematics, Vol. 96, Issue. 7, p. 1416.

Assari, Pouria 2019. On the numerical solution of two-dimensional integral equations using a meshless local discrete Galerkin scheme with error analysis. Engineering with Computers, Vol. 35, Issue. 3, p. 893.

Download full list

Article contents

Collocation methods for two dimensional weakly singular integral equations

Abstract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests