Tau-method approximations for the Bessel function \(Y_ 0 (z)\)
From MaRDI portal
Publication:1900539
DOI10.1016/0898-1221(95)00120-NzbMath0834.65004MaRDI QIDQ1900539
Publication date: 31 March 1996
Published in: Computers \& Mathematics with Applications (Search for Journal in Brave)
tablespolynomial approximationnumerical experimentserror boundsFaber polynomialsBessel functionBessel differential equationtau-method
Computation of special functions and constants, construction of tables (65D20) Numerical methods for initial value problems involving ordinary differential equations (65L05) Special ordinary differential equations (Mathieu, Hill, Bessel, etc.) (34B30) Bessel and Airy functions, cylinder functions, ({}_0F_1) (33C10) Tables in numerical analysis (65A05)
Related Items
Tau-method approximations for the Bessel function \(Y_ 1 (z)\), A note on the tau-method approximations for the Bessel functions \(Y_ 0(z)\) and \(Y_ 1(z)\), Chebyshev series approximations for the Bessel function \(Y_n(z)\) of complex argument, Symbolic and numerical computation on Bessel functions of complex argument and large magnitude
Cites Work
- Unnamed Item
- Polynomial approximations in the complex plane
- Complex polynomial approximation by the Lanczos \(\tau\)-method: Dawson's integral
- Least squares data fitting using shape preserving piecewise approximations
- Chebyshev Methods for Ordinary Differential Equations
- Computation of Faber Series With Application to Numerical Polynomial Approximation in the Complex Plane
- The Faber Polynomials for Circular Sectors
- Complex Chebyshev Polynomials on Circular Sectors with Degree Six or Less
- A numerical method for the computation of Faber polynomials for starlike domains
- The Lanczos Tau-method
- Chebyshev Expansions for the Bessel Function J n (z) in the Complex Plane
- The Tau Method
- Faber Polynomials and the Faber Series
- Trigonometric Interpolation of Empirical and Analytical Functions
