Oscillatory integrals such as Fourier transforms arise in many fields of sciences and engineering. Examples are acoustics, electromagnetism, mechanics and seismology. Numerical techniques to approximate integrals are well known. Classical quadrature rules are accurate when the integrand is smooth and slowly varying. However those methods fail for highly oscillatory cases. Cauchy's Theorem allows us to deform the path of integration into the complex plane. The problem is then solved by deforming the path so that the integrand is not oscillatory anymore. This is done by the method of steepest descent. One efficient technique to approximate non oscillatory integrals along the real line is Gaussian quadrature. This approach crucially relies on ...
We investigate a Gaussian quadrature rule and the corresponding orthogonal polynomials for the oscil...
The research is concerned with the proposal and the development of a general method for computing ra...
AbstractThe authors develop an algorithm for the numerical evaluation of Cauchy principal value inte...
The value of a highly oscillatory integral is typically determined asymptotically by the behavior of...
The value of a highly oscillatory integral is typically determined asymptotically by the behaviour o...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
Abstract: The authors develop an algorithm for the numerical evaluation of Cauchy principal value in...
We consider the integration of one-dimensional highly oscillatory functions. Based on analytic conti...
AbstractNumerical methods for strongly oscillatory and singular functions are given in this paper. B...
In the present work we study aproximation methods for values of integrals with strongly oscillating ...
Abstract. In this paper we demonstrate that the numerical method of steepest descent fails when appl...
Classical quadrature methods, i.e. methods for numerical integration,require discretizations that be...
We propose a variant of the numerical method of steepest descent for oscillatory integrals by using ...
AbstractIn this paper we consider polynomials orthogonal with respect to an oscillatory weight funct...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
We investigate a Gaussian quadrature rule and the corresponding orthogonal polynomials for the oscil...
The research is concerned with the proposal and the development of a general method for computing ra...
AbstractThe authors develop an algorithm for the numerical evaluation of Cauchy principal value inte...
The value of a highly oscillatory integral is typically determined asymptotically by the behavior of...
The value of a highly oscillatory integral is typically determined asymptotically by the behaviour o...
We construct and analyze Gauss-type quadrature rules with complex- valued nodes and weights to appro...
Abstract: The authors develop an algorithm for the numerical evaluation of Cauchy principal value in...
We consider the integration of one-dimensional highly oscillatory functions. Based on analytic conti...
AbstractNumerical methods for strongly oscillatory and singular functions are given in this paper. B...
In the present work we study aproximation methods for values of integrals with strongly oscillating ...
Abstract. In this paper we demonstrate that the numerical method of steepest descent fails when appl...
Classical quadrature methods, i.e. methods for numerical integration,require discretizations that be...
We propose a variant of the numerical method of steepest descent for oscillatory integrals by using ...
AbstractIn this paper we consider polynomials orthogonal with respect to an oscillatory weight funct...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
We investigate a Gaussian quadrature rule and the corresponding orthogonal polynomials for the oscil...
The research is concerned with the proposal and the development of a general method for computing ra...
AbstractThe authors develop an algorithm for the numerical evaluation of Cauchy principal value inte...