chebyshev1_rule (original) (raw)
chebyshev1_rule, a MATLAB code which generates a specific Gauss-Chebyshev type 1 quadrature rule, based on user input.
The rule is written to three files for easy use as input to other programs.
The Gauss Chevbyshev type 1 quadrature rule is used as follows:
Integral ( A <= x <= B ) f(x) / sqrt ( ( x - A ) * ( B - x ) ) dx
is to be approximated by
Sum ( 1 <= i <= order ) w(i) * f(x(i))
Usage:
chebyshev1_rule ( order, a, b, 'filename' )
where
- order is the number of points in the quadrature rule.
- a is the left endpoint;
- b is the right endpoint.
- filename specifies the output files:filename_w.txt,filename_x.txt, and filename_r.txt, containing the weights, abscissas, and interval limits.
Licensing:
The computer code and data files described and made available on this web page are distributed under the MIT license
Languages:
chebyshev1_rule is available ina C++ version anda FORTRAN90 version anda MATLAB version.
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Reference:
- Milton Abramowitz, Irene Stegun,
Handbook of Mathematical Functions,
National Bureau of Standards, 1964,
ISBN: 0-486-61272-4,
LC: QA47.A34. - Philip Davis, Philip Rabinowitz,
Methods of Numerical Integration,
Second Edition,
Dover, 2007,
ISBN: 0486453391,
LC: QA299.3.D28. - Sylvan Elhay, Jaroslav Kautsky,
Algorithm 655: IQPACK, FORTRAN Subroutines for the Weights of Interpolatory Quadrature,
ACM Transactions on Mathematical Software,
Volume 13, Number 4, December 1987, pages 399-415. - Jaroslav Kautsky, Sylvan Elhay,
Calculation of the Weights of Interpolatory Quadratures,
Numerische Mathematik,
Volume 40, 1982, pages 407-422. - Roger Martin, James Wilkinson,
The Implicit QL Algorithm,
Numerische Mathematik,
Volume 12, Number 5, December 1968, pages 377-383. - Arthur Stroud, Don Secrest,
Gaussian Quadrature Formulas,
Prentice Hall, 1966,
LC: QA299.4G3S7.
Source Code:
- <chebyshev1%5Frule.m> the source code.
Last revised on 09 December 2018.