Uniformly convex space

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In mathematics, uniformly convex spaces are common examples of reflexive Banach spaces. These include all Hilbert spaces and the L^p spaces for $1<p<\infty.$ The concept of uniform convexity was first introduced by James A. Clarkson in 1936.

1 Definition
2 Properties
3 See also
4 References

[edit] Definition

A uniformly convex space is a Banach space so that, for every $ε > 0$ there is some $δ > 0$ so that for any two vectors with $\|x\|\le1$ and $\|y\|\le 1,$

$\|x+y\|>2-\delta$

implies

$\|x-y\|<\epsilon.$

Intuitively, the center of a line segment inside the unit ball must lie deep inside the unit ball unless the segment is short.

[edit] Properties

The Milman–Pettis theorem states that every uniformly convex space is reflexive.

[edit] See also

Modulus and characteristic of convexity
Hanner's inequalities say that L^p spaces $(1<p<\infty)$ are uniformly convex.

[edit] References

J. A. Clarkson, Uniformly convex spaces, Trans. Amer. Math. Soc. 40 (1936), 396–414.
O. Hanner, On the uniform convexity of $L p$ and $l p$ , Ark. Mat. 3 (1956), 239–244.

Categories: Convex analysis | Banach spaces

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This page was last modified 22:59, 4 June 2008 by Wikipedia user TakuyaMurata. Based on work by Wikipedia user(s) Sullivan.t.j, Charles Matthews, Playtime, Oleg Alexandrov and Hanche and Anonymous user(s) of Wikipedia.
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