AbstractConvergence results are proved for product integration rules based on approximating splines. These results are both for bounded and unbounded integrands. Pointwise and uniform convergence results are proved for sequences of Cauchy principal values of these approximating splines
AbstractConvergence results are proved for Cauchy principal value integrals of the Schoenberg variat...
AbstractOptimal nodal spline interpolantsWfof ordermwhich have local support can be used to interpol...
This paper provides a product integration rule for highly oscillating integrands, based on equally s...
AbstractConvergence results are proved for product integration rules based on approximating splines....
AbstractIn a recent paper (this journal (1990)), the authors proposed product integration formulas, ...
AbstractIn this paper we prove the uniform convergence of some quadrature formulas based on spline a...
AbstractWe consider product integrals of the form (kf) := ∫−11k(x)f(x)dx,where kf ∈ L1 but f is unbo...
AbstractIn this paper product quadrature rules, based on cubic spline interpolation, are obtained fo...
AbstractIn this paper we consider the numerical evaluation of one-dimensional Cauchy principal value...
AbstractIn this paper we construct product quadrature rules, based on spline interpolation, for the ...
AbstractFor the numerical evaluation of Cauchy principal value integrals of the form , λε(−1, 1), f ...
We propose a new quadrature rule for Cauchy principal value integrals, based on quadratic spline qua...
AbstractThis paper is concerned with the practical evaluation of the product integral ∫1− 1f(x)k(x)d...
Product integration methods for Cauchy principal value integrals based on piecewise Lagrangian inter...
AbstractA method based on piecewise cubic interpolatory polynomials for the numerical solution of si...
AbstractConvergence results are proved for Cauchy principal value integrals of the Schoenberg variat...
AbstractOptimal nodal spline interpolantsWfof ordermwhich have local support can be used to interpol...
This paper provides a product integration rule for highly oscillating integrands, based on equally s...
AbstractConvergence results are proved for product integration rules based on approximating splines....
AbstractIn a recent paper (this journal (1990)), the authors proposed product integration formulas, ...
AbstractIn this paper we prove the uniform convergence of some quadrature formulas based on spline a...
AbstractWe consider product integrals of the form (kf) := ∫−11k(x)f(x)dx,where kf ∈ L1 but f is unbo...
AbstractIn this paper product quadrature rules, based on cubic spline interpolation, are obtained fo...
AbstractIn this paper we consider the numerical evaluation of one-dimensional Cauchy principal value...
AbstractIn this paper we construct product quadrature rules, based on spline interpolation, for the ...
AbstractFor the numerical evaluation of Cauchy principal value integrals of the form , λε(−1, 1), f ...
We propose a new quadrature rule for Cauchy principal value integrals, based on quadratic spline qua...
AbstractThis paper is concerned with the practical evaluation of the product integral ∫1− 1f(x)k(x)d...
Product integration methods for Cauchy principal value integrals based on piecewise Lagrangian inter...
AbstractA method based on piecewise cubic interpolatory polynomials for the numerical solution of si...
AbstractConvergence results are proved for Cauchy principal value integrals of the Schoenberg variat...
AbstractOptimal nodal spline interpolantsWfof ordermwhich have local support can be used to interpol...
This paper provides a product integration rule for highly oscillating integrands, based on equally s...
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