Publications of Paul Erdos

Zentralblatt MATH

Publications of (and about) Paul Erdös

Zbl.No: 106.27702
Autor: Erdös, Pál
Title: An inequality for the maximum of trigonometric polynomials (In English)
Source: Ann. Pol. Math. 12, 151-154 (1962).
Review: Let

f_n(\theta) = sum_{k = 1}ⁿ (a_k \cos k\theta+b_k \sin k \theta)

be a trigonometric polynomial with real coefficients. Put M = max_{0 \leq \theta < 2a} |f_n (\theta)|. The author conjectures that there exists an absolute constant c > 0 such that

(1) M \geq {1+c \over \sqrt 2} \left{sum_{k = 1}ⁿ (a_k²+b_k²) \right}^½,

with c \leq \sqrt 2-1.
Theorem: Assume that max_{1 \leq k \leq n} (max |a_k|,|b_k|) = 1 and that sum_{k = 1}ⁿ (a_k²+b_k²) = An. Then there exists a c = c_A > 0 depending on A for which lim_{A ––> 0} c_A = 0 and \TagsOnLeft

M > {1+c_A \over \sqrt 2} \left{sum_{k = 1}ⁿ (a_k²+b_k²) \right}^½. (2)

Reviewer: Y.M.Chen
Classif.: * 42A05 Trigonometric polynomials
Index Words: approximation and series expansion

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