论文信息 - On the Quadrature of Multivariate Highly Oscillatory Integrals Over Non-polytope Domains

On the Quadrature of Multivariate Highly Oscillatory Integrals Over Non-polytope Domains

In this paper, we present a Levin-type method for approximating multivariate highly oscillatory integrals, subject to a non-resonance condition. Unlike existing methods, we do not require the knowledge of moments, which enables us to derive an approximation when the oscillator is complicated, and when the domain is neither a simplex nor a polytope. The accuracy of this method improves as the frequency of oscillations increases. A special case of this method has the property that the asymptotic order increases with each additional sample point.

Sheehan Olver | S. Olver

[1] Ward Cheney,et al. A course in approximation theory , 1999 .

[2] Arieh Iserles,et al. Quadrature methods for multivariate highly oscillatory integrals using derivatives , 2006, Math. Comput..

[3] M. Powell,et al. Approximation theory and methods , 1984 .

[4] W. Rudin. Principles of mathematical analysis , 1964 .

[5] F. A. Seiler,et al. Numerical Recipes in C: The Art of Scientific Computing , 1989 .

[6] Sheehan Olver,et al. Moment-free numerical integration of highly oscillatory functions , 2006 .

[7] A. Iserles,et al. On Quadrature Methods for Highly Oscillatory Integrals and Their Implementation , 2004 .

[8] David Levin,et al. Analysis of a collocation method for integrating rapidly oscillatory functions , 1997 .

[9] A. Iserles,et al. Efficient quadrature of highly oscillatory integrals using derivatives , 2005, Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences.

[10] Timothy S. Murphy,et al. Harmonic Analysis: Real-Variable Methods, Orthogonality, and Oscillatory Integrals , 1993 .

[11] A. ISERLES,et al. ON THE COMPUTATION OF HIGHLY OSCILLATORY MULTIVARIATE INTEGRALS WITH CRITICAL POINTS , 2005 .

[12] F. Olver. Asymptotics and Special Functions , 1974 .