AbstractThis paper presents a new efficient parameter method for integration of the highly oscillatory integral ∫01f(x)eiωg(x)dx with an irregular oscillator. The effectiveness and accuracy are tested by means of numerical examples for the case where g(x) has stationary points
This paper surveys recent advances in the allied challenges of discretizing highly oscillatory ordin...
Highly oscillatory integrals require special techniques for their effective evaluation. Various stud...
AbstractThis paper presents a new efficient parameter method for integration of the highly oscillato...
We present a numerically stable way to compute oscillatory integrals of the form ∫1-1 ƒ(x)eiωg(x) dx...
In this paper we consider two alternative strategies for evaluating the highly oscillatory integrals...
AbstractIn Part I the extended Clenshaw–Curtis method for finite Fourier integrals is discussed, and...
New methods are proposed for evaluation of one-dimensional highly oscillatory integrals with and wit...
We consider the integration of one-dimensional highly oscillatory functions. Based on analytic conti...
The aim of this paper is to derive new methods for numerically approximating the integral of a highl...
This article presents a method for the numerical quadrature of highly oscillatory integrals with sta...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
We present a numerically stable way to compute oscillatory integrals of the form $\int{-1}^{1} f(x)e...
We present an efficient approach to evaluate multivariate highly oscillatory integrals on piecewise ...
Summary. The last few years have witnessed substantive developments in the com-putation of highly os...
AbstractHighly oscillatory integrals require special techniques for their effective evaluation. Vari...
This paper surveys recent advances in the allied challenges of discretizing highly oscillatory ordin...
Highly oscillatory integrals require special techniques for their effective evaluation. Various stud...
AbstractThis paper presents a new efficient parameter method for integration of the highly oscillato...
We present a numerically stable way to compute oscillatory integrals of the form ∫1-1 ƒ(x)eiωg(x) dx...
In this paper we consider two alternative strategies for evaluating the highly oscillatory integrals...
AbstractIn Part I the extended Clenshaw–Curtis method for finite Fourier integrals is discussed, and...
New methods are proposed for evaluation of one-dimensional highly oscillatory integrals with and wit...
We consider the integration of one-dimensional highly oscillatory functions. Based on analytic conti...
The aim of this paper is to derive new methods for numerically approximating the integral of a highl...
This article presents a method for the numerical quadrature of highly oscillatory integrals with sta...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
We present a numerically stable way to compute oscillatory integrals of the form $\int{-1}^{1} f(x)e...
We present an efficient approach to evaluate multivariate highly oscillatory integrals on piecewise ...
Summary. The last few years have witnessed substantive developments in the com-putation of highly os...
AbstractHighly oscillatory integrals require special techniques for their effective evaluation. Vari...
This paper surveys recent advances in the allied challenges of discretizing highly oscillatory ordin...
Highly oscillatory integrals require special techniques for their effective evaluation. Various stud...
AbstractThis paper presents a new efficient parameter method for integration of the highly oscillato...