Auerbach's lemma

From Wikipedia, the free encyclopedia
Jump to: navigation, search

In mathematics, Auerbach's lemma, named after Herman Auerbach, is a theorem in functional analysis which asserts that certain property of Euclidean spaces holds for general finite-dimensional normed vector spaces.


Let (V, ||·||) be an n-dimensional normed vector space. Then there exists basis {e1, ..., en} of V such that

||ei|| = 1 and ||ei|| = 1 for i = 1, ..., n

where {e1, ..., en} is a basis of V* dual to {e1, ..., en}, i. e. ei(ej) = δij.

A basis with this property is called an Auerbach basis.

If V is a Euclidean space (or even infinite-dimensional Hilbert space) then this result is obvious as one may take for {ei} any orthonormal basis of V (the dual basis is then {(ei|·)}).


The lemma has a corollary with implications to approximation theory.

Let V be an n-dimensional subspace of a normed vector space (X, ||·||). Then there exists a projection P of X onto V such that ||P|| ≤ n.


Let {e1, ..., en} be an Auerbach basis of V and {e1, ..., en} corresponding dual basis. By Hahn–Banach theorem each ei extends to f iX* such that

||f i|| = 1.

Now set

P(x) = ∑ f i(x) ei.

It's easy to check that P is indeed a projection onto V and that ||P|| ≤ n (this follows from triangle inequality).


  • Joseph Diestel, Hans Jarchow, Andrew Tonge, Absolutely Summing Operators, p. 146.