AbstractIn this paper, a mixed quadrature rule of degree of precision seven is formed for analytic functions by taking two constituent rules each of degree of precision five. Here the integral of analytic function is converted to real definite integrals with the help of double transformations. Then the mixed quadrature rule is tested in adaptive environment and it is obviously superior to that of Gauss–Legendre three-point rule
AbstractThe adaptive quadrature method requires a fixed integration formula with an error estimator ...
AbstractAn automatic quadrature method is presented for approximating the indefinite integral of fun...
AbstractThe classical bounds on the truncation error of quadrature formulas obtained by Peano's Theo...
AbstractIn this paper, a mixed quadrature rule of degree of precision seven is formed for analytic f...
A mixed quadrature rule of higher precision for approximate evaluation of real definite integrals ha...
AbstractA simple method is given for constructing quadrature rules for the numerical integration of ...
The term numerical integration covers several different tasks, including numerical evaluation of int...
A straightforward three-point quadrature formula of closed type is derived that improves on Simpson'...
In this research paper, a new family of numerical integration of closed newton cotes is introduced w...
This paper reviews current quadrature methods for approximate calculation of integrals within S-Plus...
AbstractThis paper is concerned with the numerical integration of functions with poles near the inte...
AbstractIntegral representations of hypergeometric and confluent hypergeometric functions with real ...
AbstractIt is shown that appropiate linear quadrature rules can handle integrands with singularities...
AbstractLet G be a domain in the complex plane, which is symmetric with respect to the real axis and...
This paper presents a Gaussian Quadrature method for the evaluation of the triple integral View the ...
AbstractThe adaptive quadrature method requires a fixed integration formula with an error estimator ...
AbstractAn automatic quadrature method is presented for approximating the indefinite integral of fun...
AbstractThe classical bounds on the truncation error of quadrature formulas obtained by Peano's Theo...
AbstractIn this paper, a mixed quadrature rule of degree of precision seven is formed for analytic f...
A mixed quadrature rule of higher precision for approximate evaluation of real definite integrals ha...
AbstractA simple method is given for constructing quadrature rules for the numerical integration of ...
The term numerical integration covers several different tasks, including numerical evaluation of int...
A straightforward three-point quadrature formula of closed type is derived that improves on Simpson'...
In this research paper, a new family of numerical integration of closed newton cotes is introduced w...
This paper reviews current quadrature methods for approximate calculation of integrals within S-Plus...
AbstractThis paper is concerned with the numerical integration of functions with poles near the inte...
AbstractIntegral representations of hypergeometric and confluent hypergeometric functions with real ...
AbstractIt is shown that appropiate linear quadrature rules can handle integrands with singularities...
AbstractLet G be a domain in the complex plane, which is symmetric with respect to the real axis and...
This paper presents a Gaussian Quadrature method for the evaluation of the triple integral View the ...
AbstractThe adaptive quadrature method requires a fixed integration formula with an error estimator ...
AbstractAn automatic quadrature method is presented for approximating the indefinite integral of fun...
AbstractThe classical bounds on the truncation error of quadrature formulas obtained by Peano's Theo...