Algorithm 973: Extended Rational Fejér Quadrature Rules Based on Chebyshev Orthogonal Rational Functions. | 0 | 0.34 | 2017 |
Baxter's difference systems and orthogonal rational functions. | 0 | 0.34 | 2012 |
How poles of orthogonal rational functions affect their Christoffel functions. | 0 | 0.34 | 2012 |
The existence and construction of rational Gauss-type quadrature rules. | 2 | 0.41 | 2012 |
An extension of the associated rational functions on the unit circle | 1 | 0.39 | 2011 |
A numerical solution of the constrained weighted energy problem | 2 | 0.38 | 2010 |
Orthogonal rational functions and rational modifications of a measure on the unit circle | 5 | 0.59 | 2009 |
Rational Szegýo quadratures associated with Chebyshev weight functions | 8 | 0.68 | 2009 |
Computing rational Gauss-Chebyshev quadrature formulas with complex poles: The algorithm | 6 | 0.62 | 2009 |
Algorithm 882: Near-Best Fixed Pole Rational Interpolation with Applications in Spectral Methods | 12 | 0.91 | 2008 |
Rational Gauss-Chebyshev quadrature formulas for complex poles outside [-1, 1] | 10 | 0.93 | 2008 |