The error in the trapezoidal rule quadrature formula can be attributed to discretization in the interior and non-periodicity at the boundary. Using a contour integral, we derive a unified bound for the combined error from both sources for analytic integrands. The bound gives the Euler–Maclaurin formula in one limit and the geometric convergence of the trapezoidal rule for periodic analytic functions in another
We analyze the behavior of Euler-Maclaurin-basedintegrationschemes with the intention of deriving ac...
The trigonometric interpolants to a periodic function f in equispaced points converge if f is Dini-c...
AbstractIn this paper we describe and justify a method for integrating over implicitly defined curve...
It is well known that the trapezoidal rule converges geometrically when applied to analytic function...
AbstractThe present work makes the case for viewing the Euler–Maclaurin formula as an expression for...
In many applied problems, efficient calculation of quadratures with high accuracy is required. The e...
Following on from our recent investigation of series and products using the Euler–Maclaurin formula,...
Consider the evaluation of If:=^^f201f(x) dx . Among all the quadrature rules for the appr...
This paper deals with the error analysis of the trapezoidal rule for the computation of Fourier type...
The trapezoidal quadrature rule on a uniform grid has spectral accuracy when integrating C ∞ periodi...
The Euler-Maclaurin summation formula for the approximate evaluation of I = \int01f(x) dx comprise...
AbstractIn the present paper, we use a generalization of the Euler–Maclaurin summation formula for i...
AbstractThe classical bounds on the truncation error of quadrature formulas obtained by Peano's Theo...
AbstractThis paper is concerned with the numerical integration of functions by piecewise polynomial ...
AbstractWe consider a family of two-point quadrature formulae and establish sharp estimates for the ...
We analyze the behavior of Euler-Maclaurin-basedintegrationschemes with the intention of deriving ac...
The trigonometric interpolants to a periodic function f in equispaced points converge if f is Dini-c...
AbstractIn this paper we describe and justify a method for integrating over implicitly defined curve...
It is well known that the trapezoidal rule converges geometrically when applied to analytic function...
AbstractThe present work makes the case for viewing the Euler–Maclaurin formula as an expression for...
In many applied problems, efficient calculation of quadratures with high accuracy is required. The e...
Following on from our recent investigation of series and products using the Euler–Maclaurin formula,...
Consider the evaluation of If:=^^f201f(x) dx . Among all the quadrature rules for the appr...
This paper deals with the error analysis of the trapezoidal rule for the computation of Fourier type...
The trapezoidal quadrature rule on a uniform grid has spectral accuracy when integrating C ∞ periodi...
The Euler-Maclaurin summation formula for the approximate evaluation of I = \int01f(x) dx comprise...
AbstractIn the present paper, we use a generalization of the Euler–Maclaurin summation formula for i...
AbstractThe classical bounds on the truncation error of quadrature formulas obtained by Peano's Theo...
AbstractThis paper is concerned with the numerical integration of functions by piecewise polynomial ...
AbstractWe consider a family of two-point quadrature formulae and establish sharp estimates for the ...
We analyze the behavior of Euler-Maclaurin-basedintegrationschemes with the intention of deriving ac...
The trigonometric interpolants to a periodic function f in equispaced points converge if f is Dini-c...
AbstractIn this paper we describe and justify a method for integrating over implicitly defined curve...