Egerov's Theorem

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Statement

Suppose is a locally finite Borel measure and is a sequence of measurable functions defined on a measurable set with and a.e. on E.

Then: Given we may find a closed subset such that and uniformly on

Proof

WLOG assume for all since the set of points at which is a null set. Fix and for we define Now for fixed we have that and . Therefore using continuity from below we may find a such that . Now choose so that and define . By countable subadditivity we have that .

Now fix any . We choose such that . Since if then . And by definition if then whenever . Hence uniformly on .

Finally, since is measurable, using HW5 problem 6 there exists a closed set such that . Therefore and on

References

Stein & Shakarchi Real Analysis: Measure Theory, Integration, and Hilbert Spaces (Princeton Lectures in Analysis) (Bk. 3)