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Asymptotics and zero distribution of Padé polynomials associated with the exponential function

✍ Scribed by Kathy A. Driver; Nico M. Temme

Publisher
Elsevier Science
Year
1998
Tongue
English
Weight
872 KB
Volume
89
Category
Article
ISSN
0377-0427

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✦ Synopsis

The polynomials P, and Q,~ having degrees n and m, respectively, with P, monic, that solve the approximation problem Pn(z)e -z + Qm(z) = C(z n+m+l ) will be investigated for their asymptotic behavior, in particular in connection with the distribution of their zeros. The symbol C means that the left-hand side should vanish at the origin at least to the order n + m + 1. This problem is discussed in great detail in a series of papers by Saff and Varga. In the present paper, we show how their results can be obtained by using uniform expansions of integrals in which Airy functions are the main approximants. We give approximations of the zeros of P, and Q,~ in terms of zeros of certain Airy functions, as well of those of the remainder defined by E,,,,(z) = Pn(z)e -z + Qm(z).

📜 SIMILAR VOLUMES

On Polynomials Related with Hermite–Padé
On Polynomials Related with Hermite–Padé Approximations to the Exponential Function
✍ Kathy A. Driver; Nico M. Temme 📂 Article 📅 1998 🏛 Elsevier Science 🌐 English ⚖ 445 KB

We investigate the polynomials P n , Q m , and R s , having degrees n, m, and s, respectively, with P n monic, that solve the approximation problem We give a connection between the coefficients of each of the polynomials P n , Q m , and R s and certain hypergeometric functions, which leads to a sim