AbstractThe computation of the Hadamard finite-part integral is considered as an ill-posed problem and treated by a product integration technique. It is shown that, with an appropriate choice of the mesh width, the method is a regularizing algorithm in the sense of Tikhonov, and an order of convergence is derived
AbstractStenger's formula is adapted for singular integrals defined as Hadamard finite part. Converg...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
We consider equations of the form f{hook}(x)=g(x)+f{hook}bak(x,t) f{hook}(t) (t-x)αdt, a \u3e x \u3...
AbstractThe computation of the Hadamard finite-part integral is considered as an ill-posed problem a...
AbstractIn this paper we construct product quadrature rules, based on spline interpolation, for the ...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
AbstractSome algorithms are described for the numerical evaluation of Hadamard finite part integrals...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
AbstractAn algorithm for the approximate evaluation of integrals defined by Cauchy principal value o...
AbstractWe consider equations of the form ƒ(x)=g(x)+ƒbak(x,t)ƒ(t)(t−x)αdt, a > x > b, for integral α...
AbstractStenger's formula is adapted for singular integrals defined as Hadamard finite part. Converg...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
We consider equations of the form f{hook}(x)=g(x)+f{hook}bak(x,t) f{hook}(t) (t-x)αdt, a \u3e x \u3...
AbstractThe computation of the Hadamard finite-part integral is considered as an ill-posed problem a...
AbstractIn this paper we construct product quadrature rules, based on spline interpolation, for the ...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
In the present paper we introduce and study an extended product quadrature rule to approximate Hadam...
AbstractSome algorithms are described for the numerical evaluation of Hadamard finite part integrals...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
AbstractAn algorithm for the approximate evaluation of integrals defined by Cauchy principal value o...
AbstractWe consider equations of the form ƒ(x)=g(x)+ƒbak(x,t)ƒ(t)(t−x)αdt, a > x > b, for integral α...
AbstractStenger's formula is adapted for singular integrals defined as Hadamard finite part. Converg...
In this paper we consider a simple method for calculating integrals possessing strong singularities,...
We consider equations of the form f{hook}(x)=g(x)+f{hook}bak(x,t) f{hook}(t) (t-x)αdt, a \u3e x \u3...
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