SOLVING OF ONE-DIMENSIONAL HYPERSINGULAR INTEGRAL EQUATION USING HAAR’S WAVELETS

Kogtenev, D. A.; Zamarashkin, N. L.

doi:10.31857/S0374064124090071

PII

10.31857/S0374064124090071-1

DOI

10.31857/S0374064124090071

Publication type

Article

Status

Published

Authors

D. A. Kogtenev

Affiliation: Marchuk Institute of Numerical Mathematics of RAS

N. L. Zamarashkin

Affiliation: Marchuk Institute of Numerical Mathematics of RAS

Volume/ Edition

Volume 60 / Issue number 9

Pages

1241-1260

Abstract

We constructed a numerical method for the one-dimensional hypersingular integral equation which uses sparse matrix approximations. This method has the same convergence order as conventional methods for hypersingular integral equations but the new method is more effective in both memory and arithmetic operations.

Keywords

гиперсингулярное интегральное уравнение вейвлет Хаара кратномасштабный метод для интегрального уравнения

Date of publication

18.09.2025

Year of publication

2025

Number of purchasers

Views

References

1. Гахов, Ф.Д. Краевые задачи / Ф.Д. Гахов. — М. : Физматлит, 1958. — 545 c.
2. Сетуха, А.В. Численные методы в интегральных уравнениях и их приложения / А.В. Сетуха. — М. : Аргамак-Медиа, 2014. — 256 c.
3. Захаров, Е.В. Численное решение трёхмерных задач дифракции элетромагнитных волн на системе идеально проводящих поверхностей методом гиперсингулярных интегральных уравнений / Е.В. Захаров, Г.В. Рыжаков, А.В Сетуха // Дифференц. уравнения. — 2014. — Т. 55, № 9. — С. 1253–1263.
4. Beylkin, G. Fast wavelet transforms and numerical algorithms. I / G. Beylkin, R. Koifman, V. Rokhlin // Comm. Pure Appl. Math. — 1991. — V. 44. — P. 141–183.
5. Chen, Z. Multiscale Methods for Fredholm Integral Equations / Z. Chen, C.A. Micchelli, Y. Xu. — Cambridge : Cambridge University Press, 2015.
6. Aparinov, A.A. Low rank methods of approximation in an electromagnetic problem / A.A Aparinov, A.V Setukha, S.L. Stavtsev // Lobachevskii J. Math. — 2019. — V. 40, № 11. — P. 1771–1780.
7. Amaratunga, K. Surface wavelets: a multiresolution signal processing tool for 3D computational modelling / K. Amaratunga, J.E. Castrillon-Candas // Int. J. Numer. Meth. Engng. — 2001. — V. 55, № 3. — P. 239–271.
8. Saad, Y. GMRES: a generalized minimal residual algorithm for solving nonsymmetric linear systems / Y. Saad, M.H. Schultz // SIAM J. Sci. Stat. Comput. — 1986. — V. 7, № 3. — P. 856–869.

GOST	Kogtenev D., Zamarashkin N. SOLVING OF ONE-DIMENSIONAL HYPERSINGULAR INTEGRAL EQUATION USING HAAR’S WAVELETS // Differential Equations. – 2024. – V. 60. – Issue number 9 C. 1241-1260 . URL: https://differeqras.ru/10-31857-s0374064124090071-1/?version_id=112459. DOI: 10.31857/S0374064124090071
MLA	Kogtenev, D. A, Zamarashkin, N. L "SOLVING OF ONE-DIMENSIONAL HYPERSINGULAR INTEGRAL EQUATION USING HAAR’S WAVELETS." Differential Equations. 60.9 (2024).:1241-1260. DOI: 10.31857/S0374064124090071
APA	Kogtenev D., Zamarashkin N. (2024). SOLVING OF ONE-DIMENSIONAL HYPERSINGULAR INTEGRAL EQUATION USING HAAR’S WAVELETS. Differential Equations. vol. 60, no. 9, pp.1241-1260 DOI: 10.31857/S0374064124090071

RAS MathematicsДифференциальные уравнения Differential Equations

SOLVING OF ONE-DIMENSIONAL HYPERSINGULAR INTEGRAL EQUATION USING HAAR’S WAVELETS

You can

References

Indexing

RAS MathematicsДифференциальные уравнения Differential Equations

SOLVING OF ONE-DIMENSIONAL HYPERSINGULAR INTEGRAL EQUATION USING HAAR’S WAVELETS

You can

References

Indexing

Via social network