Constructive function theory

In mathematical analysis, constructive function theory is a field which studies the connection between the smoothness of a function and its degree of approximation^[1]^[2]. It is closely related to approximation theory. The term was coined by Sergei Bernstein.

Example

Let f be a 2π-periodic function. Then f is α-Hölder for some 0 < α < 1 if and only if for every natural n there exists a trigonometric polynomial P_n of degree n such that

\max _{0\leq x\leq 2\pi }|f(x)-P_{n}(x)|\leq {\frac {C(f)}{n^{\alpha }}},

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).

Notes

^ http://encyclopedia2.thefreedictionary.com/Constructive+Theory+of+Functions. {{cite web}}: Missing or empty |title= (help)
^ http://eom.springer.de/c/c025430.htm. {{cite web}}: Missing or empty |title= (help)

References

N. I. Achiezer (Akhiezer), Theory of approximation, Translated by Charles J. Hyman Frederick Ungar Publishing Co., New York 1956 x+307 pp.

[1] ttp://encyclopedia2.thefreedictionary.com/Constructive+Theory+of+Functions. {{cite web}}: Missing or empty |title= (help)

[2] ttp://eom.springer.de/c/c025430.htm. {{cite web}}: Missing or empty |title= (help)

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