论文信息 - Indefinite integration of oscillatory functions by the Chebyshev series expansion

Indefinite integration of oscillatory functions by the Chebyshev series expansion

Abstract An automatic quadrature scheme is presented for evaluating the indefinite integral of oscillatory function ∫ x 0 ƒ(t)e iωt dt, 0⩽x⩽1 , of a given function ƒ( t ), which is usually assumed to be smooth. The function ƒ( t ) is expanded in the Chebyshev series to make an efficient evaluation of the indefinite integral. Combining the automatic quadrature method obtained and Sidi's extrapolation method makes an effective quadrature scheme for oscillatory infinite integral ∫ ∞ a ƒ( x ) cos ω x d x for which numerical examples are also presented.

Tatsuo Torii | Takemitsu Hasegawa | T. Hasegawa | T. Torii

[1] Avram Sidi,et al. The numerical evaluation of very oscillatory infinite integrals by extrapolation , 1982 .

[2] Philip Rabinowitz,et al. Methods of Numerical Integration , 1985 .

[3] Tatsuo Torii,et al. Generalized Chebyshev interpolation and its application to automatic quadrature , 1983 .

[4] W. Gautschi. Computational Aspects of Three-Term Recurrence Relations , 1967 .

[5] Avram Sidi,et al. Some Properties of a Generalization of the Richardson Extrapolation Process , 1979 .

[6] Siegfried Filippi,et al. Angenäherte Tschebyscheff-Approximation einer Stammfunktion — eine Modifikation des Verfahrens von Clenshaw und Curtis , 1964 .

[7] Avram Sidi,et al. An algorithm for a special case of a generalization of the Richardson extrapolation process , 1982 .

[8] Yudell L. Luke,et al. Algorithms for the Computation of Mathematical Functions , 1977 .

[9] Avram Sidi,et al. Extrapolation Methods for Oscillatory Infinite Integrals , 1980 .

[10] C. W. Clenshaw,et al. A method for numerical integration on an automatic computer , 1960 .