AbstractThe order of the trapezoidal rule can be raised by making a substitution that transforms the integrand into a new integrand which has a smooth periodic extension. The exponent in the rate at which the transformed weights approach zero near the endpoints is called the damping power of the transformation. Currently used polynomial transformations of damping power m have order m+1 if m is odd, and order m+2 if m is even. We prove that the highest possible order is m+1 if m is odd, but 2m+2 if m is even, and give new polynomial transformations that achieve the optimal order
We present two algorithms for multivariate numerical integration of smooth periodic functions. The c...
AbstractThe Fourier series of a smooth function on a compact interval usually has slow convergence d...
Asymptotic expansions for oscillatory integrals typically depend on the values and derivatives of th...
AbstractThe order of the trapezoidal rule can be raised by making a substitution that transforms the...
AbstractThis paper is concerned with the numerical integration of functions by piecewise polynomial ...
AbstractWe present two algorithms for multivariate numerical integration of smooth periodic function...
Variable transformations for numerical integration have been used for improving the accuracy of the ...
AbstractClass Sm variable transformations with integer m, for accurate numerical computation of fini...
AbstractWe examine a single-step implicit-integration algorithm which is obtained by a modification ...
AbstractThe author proposes some stable and convergent two-point integration formulae which are part...
The error in the trapezoidal rule quadrature formula can be attributed to discretization in the inte...
Consider the evaluation of If:=^^f201f(x) dx . Among all the quadrature rules for the appr...
We present a family of high order trapezoidal rule-based quadratures for a class of singular integra...
We propose a variant of the numerical method of steepest descent for oscillatory integrals by using ...
The Euler-Maclaurin summation formula for the approximate evaluation of I = \int01f(x) dx comprise...
We present two algorithms for multivariate numerical integration of smooth periodic functions. The c...
AbstractThe Fourier series of a smooth function on a compact interval usually has slow convergence d...
Asymptotic expansions for oscillatory integrals typically depend on the values and derivatives of th...
AbstractThe order of the trapezoidal rule can be raised by making a substitution that transforms the...
AbstractThis paper is concerned with the numerical integration of functions by piecewise polynomial ...
AbstractWe present two algorithms for multivariate numerical integration of smooth periodic function...
Variable transformations for numerical integration have been used for improving the accuracy of the ...
AbstractClass Sm variable transformations with integer m, for accurate numerical computation of fini...
AbstractWe examine a single-step implicit-integration algorithm which is obtained by a modification ...
AbstractThe author proposes some stable and convergent two-point integration formulae which are part...
The error in the trapezoidal rule quadrature formula can be attributed to discretization in the inte...
Consider the evaluation of If:=^^f201f(x) dx . Among all the quadrature rules for the appr...
We present a family of high order trapezoidal rule-based quadratures for a class of singular integra...
We propose a variant of the numerical method of steepest descent for oscillatory integrals by using ...
The Euler-Maclaurin summation formula for the approximate evaluation of I = \int01f(x) dx comprise...
We present two algorithms for multivariate numerical integration of smooth periodic functions. The c...
AbstractThe Fourier series of a smooth function on a compact interval usually has slow convergence d...
Asymptotic expansions for oscillatory integrals typically depend on the values and derivatives of th...