Result 1 to 19 of 19 total
A robust implementation of the Carathéodory-Fejér method for rational approximation. (English)
BIT 51, No. 4, 1039-1050 (2011).
1
A generalized eigenvalue problem for quasi-orthogonal rational functions. (English)
Numer. Math. 117, No. 3, 463-506 (2011).
2
Computing near-best fixed pole rational interpolants. (English)
J. Comput. Appl. Math. 235, No. 4, 1077-1084 (2010).
3
Validated special functions software. (English)
Fukuda, Komei (ed.) et al., Mathematical software ‒ ICMS 2010. Third international congress on mathematical software, Kobe, Japan, September 13‒17, 2010. Proceedings. Berlin: Springer (ISBN 978-3-642-15581-9/pbk). Lecture Notes in Computer Science 6327, 32-34 (2010).
4
Computing near-best fixed pole rational interpolants (English)
J. Computational Applied Mathematics 235, No. 4, 1077-1084 (2010).
5
Validated special functions software (English)
ICMS, 32-34 (2010).
6
Continued fractions for special functions: Handbook and software. (English)
Cuyt, Annie (ed.) et al., Numerical validation in current hardware architectures. International Dagstuhl seminar, Dagstuhl Castle, Germany, January 6‒11, 2008. Revised papers. Berlin: Springer (ISBN 978-3-642-01590-8/pbk). Lecture Notes in Computer Science 5492, 27-40 (2009).
7
Algorithm 882: Near-best fixed pole rational interpolation with applications in spectral methods. (English)
ACM Trans. Math. Softw. 35, No. 2 (2008).
8
Integrating products of Bessel functions with an additional exponential or rational factor (English)
Computer Physics Communications 178, No. 8, 578-590 (2008).
9
Rational Gauss-Chebyshev quadrature formulas for complex poles outside [-1, 1] (English)
Math. Comput. 77, No. 262, 967-983 (2008).
10
Continued fractions for special functions: handbook and software (English)
Numerical Validation in Current Hardware Architectures, 27-40 (2008).
11
Eigenvalue problems to compute almost optimal points for rational interpolation with prescribed poles. (English)
Numer. Algorithms 45, No. 1-4, 89-99 (2007).
12
Computing orthogonal rational functions with poles near the boundary (English)
Computers & Mathematics with Applications 53, No. 9, 1421-1428 (2007).
13
A Matlab implementation of an algorithm for computing integrals of products of Bessel functions. (English)
Iglesias, Andrés (ed.) et al., Mathematical software ‒ ICMS 2006. Second international congress on mathematical software, Castro Urdiales, Spain, September 1‒3, 2006. Proceedings. Berlin: Springer (ISBN 978-3-540-38084-9/pbk). Lecture Notes in Computer Science 4151, 284-295 (2006).
14
Algorithm 858: Computing infinite range integrals of an arbitrary product of Bessel functions. (English)
ACM Trans. Math. Softw. 32, No. 4, 580-596 (2006).
15
On computing rational Gauss-Chebyshev quadrature formulas (English)
Math. Comput. 75, No. 253, 307-326 (2006).
16
A MATLAB implementation of an algorithm for computing integrals of products of Bessel functions (English)
ICMS, 284-295 (2006).
17
Computing orthogonal rational functions on a halfline. (English)
Proceedings of the fifth international conference on functional analysis and approximation theory, Acquafredda di Maratea (Potenza), Italy, June 16‒23, 2004. Palermo: Circolo Matemàtico di Palermo. Supplemento ai Rendiconti del Circolo Matemàtico di Palermo. Serie II 76, 621-634 (2005).
18
An interpolation algorithm for orthogonal rational functions. (English)
J. Comput. Appl. Math. 164-165, 749-762 (2004).
19
Result 1 to 19 of 19 total
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