Paper Info
Title
On the Convolution Quadrature Rule for Integral Transforms with Oscillatory Bessel Kernels.
Abstract
Lubich's convolution quadrature rule provides efficient approximations to integrals with special kernels. Particularly, when it is applied to computing highly oscillatory integrals, numerical tests show it does not suffer from fast oscillation. This paper is devoted to studying the convergence property of the convolution quadrature rule for highly oscillatory problems. With the help of operational calculus, the convergence rate of the convolution quadrature rule with respect to the frequency is derived. Furthermore, its application to highly oscillatory integral equations is also investigated. Numerical results are presented to verify the effectiveness of the convolution quadrature rule in solving highly oscillatory problems. It is found from theoretical and numerical results that the convolution quadrature rule for solving highly oscillatory problems is efficient and high-potential.
Year
DOI
Venue
2018
10.3390/sym10070239
SYMMETRY-BASEL
Keywords
Field
DocType
highly oscillatory,convolution quadrature rule,volterra integral equation,Bessel kernel,convergence
Oscillatory integral,Mathematical analysis,Convolution,Rate of convergence,Operational calculus,Integral transform,Gaussian quadrature,Mathematics,Bessel function,Volterra integral equation
Journal
Volume
Issue
ISSN
10
7
2073-8994
Citations 
PageRank 
References 
1
0.37
12
Authors
2
Name
Order
Citations
PageRank
Junjie Ma111.38
Huilan Liu221.07