Publications of Paul Erdos

Zentralblatt MATH

Publications of (and about) Paul Erdös

Zbl.No: 272.41007
Autor: Erdös, Paul; Reddy, A.R.
Title: Rational approximation to certain entire functions in [0,+oo). (In English)
Source: Bull. Am. Math. Soc. 79, 992-993 (1973).
Review: Let f(z) = sum ^oo_{k = 0}a_kz^k, a₀ > 0 and a_k \geq 0 (k \geq 1) be an entire function. Denote

\lambda_0,n = \lambda_0,n(1/f) = inf_{p_n in \pi_n} |{1 \over f(x)}-{1 \over p_n(x)} |_{L_oo [0, oo)}

where \pi_n denotes the clan of all polynomials of degree at most n. By using the above notation the authors announce the following. (i) For each \epsilon > 0, there exists infinitely many m for which \lambda_0,m \leq \exp ({-m \over (log m)^1+\epsilon} ). ii) For each \epsilon > 0 there exist a subsequence of natural numbers for which \lambda_0,m \geq \exp (- \epsilon m). (iii) Let a_j = q^{j^k}, where 0 < q < 1, 2 \leq k < oo. Then

q = liminf(\lambda_0,n)^{n^{1/k}} \leq limsup(\lambda_0,n)^{n^{k/1}} \leq q^{1-2^{1-k}}.

Classif.: * 41A20 Approximation by rational functions
41A50 Best approximation
41A25 Degree of approximation, etc.

Books Problems Set Theory Combinatorics Extremal Probl/Ramsey Th.

Graph Theory Add.Number Theory Mult.Number Theory Analysis Geometry

Probabability Personalia About Paul Erdös Publication Year Home Page

Books	Problems	Set Theory	Combinatorics	Extremal Probl/Ramsey Th.
Graph Theory	Add.Number Theory	Mult.Number Theory	Analysis	Geometry
Probabability	Personalia	About Paul Erdös	Publication Year	Home Page