Constructive function theory: Difference between revisions

In [[mathematical analysis]], '''constructive function theory''' is a field which studies the connection between the smoothness of a [[Function (mathematics)|function]] and its degree of [[approximation theory|approximation]][.<ref>{{cite web|url=http://encyclopedia2.thefreedictionary.com/Constructive+Theory+of+Functions|title=Constructive <sup>[1<nowiki>]Theory of Functions}}</nowikiref>]</supref>[http://eom{{SpringerEOM|id=Constructive_theory_of_functions|title=Constructive theory of functions|first=S.springerA.de/c/c025430.htm ^{[2<nowiki>]|last=Telyakovskii}}</nowikiref>]}. It is closely related to [[approximation theory]]. The term was coined by [[Sergei Bernstein]].

Let ''f'' be a 2''2ππ''-periodic function. Then ''f'' is ''α''-[[Hölder condition|Hölder]] for some ''0&nbsp;<&nbsp;''α<1''&nbsp;<&nbsp;1 if and only if for every natural ''n'' there exists a [[trigonometric polynomial]] ''P_n'' of degree ''n'' such that

: <math> \max_{0 \leq x \leq 2\pi} | f(x) - P_n(x) | \leq \frac{C(f)}{n^\alpha}~, </math>

where ''C''(''f)'') is a positive number depending on ''f''. The "only if" is due to [[Dunham Jackson]], see [[Jackson's inequality]]; the "if" part is due to [[Sergei Bernstein]], see [[Bernstein's theorem (approximation theory)]].

* {{Cite book |first=N. I. |last=Achiezer (Akhiezer),|author-link=Naum Akhiezer|title=Theory of approximation, Translated by |translator=Charles J. Hyman |publisher=Frederick Ungar Publishing Co., |___location=New York |year=1956 x+307 pp.}}

[[Category:MathematicalSmooth analysisfunctions]]