© 2019 IOP Publishing Ltd. We propose a method of wavelet-quadratures for the solution of a singular integral equation of the first kind with a Cauchy kernel on a segment of the real axis, which is a mathematical model of many applied problems. To solve this equation, a computational scheme is constructed, based on the approximation of the unknown function by Chebyshev wavelets of the second kind and using the quadrature Gauss formula. Uniform estimates of the error of approximate solutions are obtained, which take into account the structural properties of the initial data. A numerical experiment was carried out using the Wolfram Mathematica package
In this paper a quadrature method for Cauchy singular integral equations having constant coefficient...
Wavelet analysis is a recently developed mathematical tool for many problems. In this paper, an effi...
Introduction In this chapter we will explain how wavelets can be used to solve integral equations. T...
© 2019 IOP Publishing Ltd. We propose a method of wavelet-quadratures for the solution of a singular...
© 2018, Pleiades Publishing, Ltd. In this article we consider a singular integral equation of the fi...
In this article we consider a singular integral equation ofthe rst kind with a Cauchy kernel on a se...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
A computational method for solving Fredholm integral equations of the first kind is presented. The m...
© 2020, Pleiades Publishing, Ltd. Abstract: On a real segment, we consider a boundary value problem ...
In recent years, wavelets have found their way into many different fields of science and engineerin...
The numerical solution of partial differential equations involves the computation of integrals of pr...
AbstractAn approximate method is developed for solving singular integral equations of the first kind...
An approximate method is developed for solving singular integral equations of the first kind, over a...
Application of the wavelet-weighted Gaussian quadrature formula to the singular and nearly singular ...
In this paper a quadrature method for Cauchy singular integral equations having constant coefficient...
Wavelet analysis is a recently developed mathematical tool for many problems. In this paper, an effi...
Introduction In this chapter we will explain how wavelets can be used to solve integral equations. T...
© 2019 IOP Publishing Ltd. We propose a method of wavelet-quadratures for the solution of a singular...
© 2018, Pleiades Publishing, Ltd. In this article we consider a singular integral equation of the fi...
In this article we consider a singular integral equation ofthe rst kind with a Cauchy kernel on a se...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
A computational method for solving Fredholm integral equations of the first kind is presented. The m...
© 2020, Pleiades Publishing, Ltd. Abstract: On a real segment, we consider a boundary value problem ...
In recent years, wavelets have found their way into many different fields of science and engineerin...
The numerical solution of partial differential equations involves the computation of integrals of pr...
AbstractAn approximate method is developed for solving singular integral equations of the first kind...
An approximate method is developed for solving singular integral equations of the first kind, over a...
Application of the wavelet-weighted Gaussian quadrature formula to the singular and nearly singular ...
In this paper a quadrature method for Cauchy singular integral equations having constant coefficient...
Wavelet analysis is a recently developed mathematical tool for many problems. In this paper, an effi...
Introduction In this chapter we will explain how wavelets can be used to solve integral equations. T...