Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/46326/1/211_2005_Article_BF02162084.pd
Abstract: An account of the error and the convergence theory is given for Gauss-Laguerre and Gauss-R...
summary:The paper is concerned with the efficient evaluation of the integral $\int^\infty_0 f(x)J_n(...
In this research, some new and efficient quadrature rules are proposed involving the combination of ...
Procedures for numerical evaluation of integrals have been devised but rela-tively few methods of ob...
AbstractError estimates are a very important aspect of numerical integration. It is desirable to kno...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
AbstractWe discuss the approximation of integrals of type I(f;t)=∫Rf(x)K(x,t)e−x2|x|αdx,α>−1, K is t...
AbstractWith existing numerical integration methods and algorithms it is difficult in general to obt...
AbstractWe consider the remainder term of the Gauss–Turán quadrature formulaeRn,s(f)=∫-11w(t)f(t)dt-...
In two BIT papers error expansions in the Gauss and Gauss-Turan quadrature formulas with the Chebysh...
We study the error of Gauss-Turan quadrature formulae when functions which are analytic on a neighbo...
Error bounds for Gaussian quadrature are given in terms of the number of quadrature points and smoot...
AbstractWe describe methods for the numerical calculation of integrals with verified error bounds. T...
AbstractWe investigate the behaviour of the maximum error in applying Gaussian quadrature to the Che...
In this paper we present an extension of our previous research, focusing on a method to numerically ...
Abstract: An account of the error and the convergence theory is given for Gauss-Laguerre and Gauss-R...
summary:The paper is concerned with the efficient evaluation of the integral $\int^\infty_0 f(x)J_n(...
In this research, some new and efficient quadrature rules are proposed involving the combination of ...
Procedures for numerical evaluation of integrals have been devised but rela-tively few methods of ob...
AbstractError estimates are a very important aspect of numerical integration. It is desirable to kno...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
AbstractWe discuss the approximation of integrals of type I(f;t)=∫Rf(x)K(x,t)e−x2|x|αdx,α>−1, K is t...
AbstractWith existing numerical integration methods and algorithms it is difficult in general to obt...
AbstractWe consider the remainder term of the Gauss–Turán quadrature formulaeRn,s(f)=∫-11w(t)f(t)dt-...
In two BIT papers error expansions in the Gauss and Gauss-Turan quadrature formulas with the Chebysh...
We study the error of Gauss-Turan quadrature formulae when functions which are analytic on a neighbo...
Error bounds for Gaussian quadrature are given in terms of the number of quadrature points and smoot...
AbstractWe describe methods for the numerical calculation of integrals with verified error bounds. T...
AbstractWe investigate the behaviour of the maximum error in applying Gaussian quadrature to the Che...
In this paper we present an extension of our previous research, focusing on a method to numerically ...
Abstract: An account of the error and the convergence theory is given for Gauss-Laguerre and Gauss-R...
summary:The paper is concerned with the efficient evaluation of the integral $\int^\infty_0 f(x)J_n(...
In this research, some new and efficient quadrature rules are proposed involving the combination of ...
DOI
Add to ORKG