AbstractWe consider quadrature formulas for the numerical evaluation, with error estimate, of integrals of the form ⨍abf(x)x−λdx, −∞<a<λ<b<+∞, and we discuss them, pointing out the computational aspects. Then we present an automatic integrator and we compare our numerical results with the ones of another published integrator for Cauchy principal value integrals
Abstract Si dimostra un teorema di convergenza relativo a formule di quadratura di tipo gaussiano ...
AbstractThe authors develop an algorithm for the numerical evaluation of Cauchy principal value inte...
AbstractA subroutine is presented for the evaluation of Cauchy principal value integrals. Based on a...
AbstractWe consider quadrature formulas for the numerical evaluation, with error estimate, of integr...
The quadrature formulae of Chawla & Jayarajan (1975) have been extended in a simple manner for t...
Abstract: The authors develop an algorithm for the numerical evaluation of Cauchy principal value in...
AbstractFor the numerical evaluation of Cauchy principal value integrals of the form , λε(−1, 1), f ...
For the numerical approximation of Cauchy principal value integrals, we consider so-called modified ...
Abstract: In this paper the authors examine the convergence of an interpolatory type quadrature rul...
AbstractFor the numerical approximation of Cauchy principal value integrals, we consider the so-call...
AbstractThe problem of the numerical evaluation of Cauchy principal value integrals of oscillatory f...
This paper presents a new interpolatory type quadrature rule for approximating the weighted Cauchy p...
Abstract: In a previous paper the authors proposed a modified Gaussian rule * m (wf;t)to compute th...
We propose a new quadrature rule for Cauchy principal value integrals, based on quadratic spline qua...
AbstractIn a recent paper (this journal (1990)), the authors proposed product integration formulas, ...
Abstract Si dimostra un teorema di convergenza relativo a formule di quadratura di tipo gaussiano ...
AbstractThe authors develop an algorithm for the numerical evaluation of Cauchy principal value inte...
AbstractA subroutine is presented for the evaluation of Cauchy principal value integrals. Based on a...
AbstractWe consider quadrature formulas for the numerical evaluation, with error estimate, of integr...
The quadrature formulae of Chawla & Jayarajan (1975) have been extended in a simple manner for t...
Abstract: The authors develop an algorithm for the numerical evaluation of Cauchy principal value in...
AbstractFor the numerical evaluation of Cauchy principal value integrals of the form , λε(−1, 1), f ...
For the numerical approximation of Cauchy principal value integrals, we consider so-called modified ...
Abstract: In this paper the authors examine the convergence of an interpolatory type quadrature rul...
AbstractFor the numerical approximation of Cauchy principal value integrals, we consider the so-call...
AbstractThe problem of the numerical evaluation of Cauchy principal value integrals of oscillatory f...
This paper presents a new interpolatory type quadrature rule for approximating the weighted Cauchy p...
Abstract: In a previous paper the authors proposed a modified Gaussian rule * m (wf;t)to compute th...
We propose a new quadrature rule for Cauchy principal value integrals, based on quadratic spline qua...
AbstractIn a recent paper (this journal (1990)), the authors proposed product integration formulas, ...
Abstract Si dimostra un teorema di convergenza relativo a formule di quadratura di tipo gaussiano ...
AbstractThe authors develop an algorithm for the numerical evaluation of Cauchy principal value inte...
AbstractA subroutine is presented for the evaluation of Cauchy principal value integrals. Based on a...
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