Converse nonimplication

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In mathematics, Mazur's lemma is a result in the theory of Banach spaces. It shows that any weakly convergent sequence in a Banach space has a sequence of convex combinations of its members that converges strongly to the same limit, and is used in the proof of Tonelli's theorem.

Statement of the lemma

Let (X, || ||) be a Banach space and let (un)nN be a sequence in X that converges weakly to some u0 in X:

unu0 as n.

That is, for every continuous linear functional f in X, the continuous dual space of X,

f(un)f(u0) as n.

Then there exists a function N : N → N and a sequence of sets of real numbers

{α(n)k|k=n,,N(n)}

such that α(n)k ≥ 0 and

k=nN(n)α(n)k=1

such that the sequence (vn)nN defined by the convex combination

vn=k=nN(n)α(n)kuk

converges strongly in X to u0, i.e.

vnu00 as n.

References

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