Directory UMM :Data Elmu:jurnal:J-a:Journal of Computational And Applied Mathematics:Vol105.Issue1-2.1999:
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The modications mentioned in Sections 4 and 5 have been carried out in the rst kind associated functional for the classical ones, by studying the modication of the order of the
Our recent attempts to learn more about the convergence behavior of Stieltjes type and other variable element continued fractions and our related attempts to decide whether or not
The greater part of them are based on an implicit method, usually a classical Runge–Kutta (RK) method or a multistep RK method, in which the implicit relations are solved by
In this note we discuss the relationship between the method of Lorentzen and Waadeland [1, 2] and the method of Waadeland [7–11] for accelerating the convergence of ordinary
The coecients of this equation are given in terms of the polynomials and which appear in the q-Pearson dierence equation D q ( ) = dening the weight of the q-classical
For classical orthogonal polynomials of a discrete variable, the recurrence coecients are known explicitly and Theorem 8.1 can be used to obtain the zero distributions... Then is
Krawtchouk and Hahn polynomials), in terms of the coecients and of the Pearson equation satised by the weight function %, and the coecients of the three-term recurrence relation
The so-called classical continuous (Jacobi, Laguerre, Hermite) and discrete (Charlier, Meixner, Kravchuk, Hahn) orthogonal polynomials appear at dierent levels of the Askey tableau
