AbstractThe classical collocation method for Cauchy-type singular integral equations of the second kind on an interval using Gaussian quadrature rules with respect to Jacobi nodes is investigated. In general, the nodes and the weights of the quadrature rules can only be evaluated approximately. In the present paper the question is answered how precise our knowledge about them must be in order to ensure that the corresponding algebraic system of equations is solvable yet and its solution is close to the solution of the exact system
We consider a finite section (Galerkin) and a collocation method for Cauchy singular integral equati...
AbstractThe convergence and stability of a discrete collocation method for Cauchy singular integral ...
The dissertation consists of two parts. In the first part approximate methods for multidimensional w...
AbstractThe classical collocation method for Cauchy-type singular integral equations of the second k...
AbstractSeveral quadrature-collocation schemes to solve the singular integral equation with Cauchy p...
AbstractThe application of a collocation method with respect to the Chebyshev nodes of second kind t...
This paper is concerned with the stability of collocation methods for Cauchy singular integral equat...
We consider a collocation method for Cauchy singular integral equations on the interval based on wei...
In this paper we consider a polynomial collocation method for the numerical solution of Cauchy singu...
The aim of this paper is to propose a numerical method approximating the solutions of a system of CS...
This paper deals with the numerical solution of a class of systems of Cauchy singular integral equat...
AbstractSolving singular integral equations of Cauchy-type numerically involves solution of a linear...
A simple quadrature rule for the solution of second-kind singular integral equations with variable c...
AbstractA Cauchy type singular integral equation can be numerically solved by the use of an appropri...
AbstractCauchy singular integral equations on an interval are studied in weighted spaces of continuo...
We consider a finite section (Galerkin) and a collocation method for Cauchy singular integral equati...
AbstractThe convergence and stability of a discrete collocation method for Cauchy singular integral ...
The dissertation consists of two parts. In the first part approximate methods for multidimensional w...
AbstractThe classical collocation method for Cauchy-type singular integral equations of the second k...
AbstractSeveral quadrature-collocation schemes to solve the singular integral equation with Cauchy p...
AbstractThe application of a collocation method with respect to the Chebyshev nodes of second kind t...
This paper is concerned with the stability of collocation methods for Cauchy singular integral equat...
We consider a collocation method for Cauchy singular integral equations on the interval based on wei...
In this paper we consider a polynomial collocation method for the numerical solution of Cauchy singu...
The aim of this paper is to propose a numerical method approximating the solutions of a system of CS...
This paper deals with the numerical solution of a class of systems of Cauchy singular integral equat...
AbstractSolving singular integral equations of Cauchy-type numerically involves solution of a linear...
A simple quadrature rule for the solution of second-kind singular integral equations with variable c...
AbstractA Cauchy type singular integral equation can be numerically solved by the use of an appropri...
AbstractCauchy singular integral equations on an interval are studied in weighted spaces of continuo...
We consider a finite section (Galerkin) and a collocation method for Cauchy singular integral equati...
AbstractThe convergence and stability of a discrete collocation method for Cauchy singular integral ...
The dissertation consists of two parts. In the first part approximate methods for multidimensional w...