- categories: Measure Theory, Real Analysis, Theorem
The Hardy–Littlewood maximal inequality provides a bound on the measure of the set where the Hardy–Littlewood maximal function exceeds a given threshold, in terms of the norm of the original function.
Statement :
Let (locally integrable function on ). Then there exists a constant , depending only on the dimension , such that for any :
where is the Hardy–Littlewood Maximal Function
Proof Outline:
The proof relies on the Vitali covering lemma and some properties of the maximal function.
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Decomposition of the set: Consider the set . By the definition of , for each , there is a ball centered at such that:
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Vitali covering lemma: Use the Vitali covering lemma to select a countable, disjoint subcollection of these balls that still cover most of the set up to a set of measure zero.
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Estimate using the disjoint balls: For each ball , we know:
Summing over the disjoint collection , we get:
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Conclusion: Since are disjoint and cover most of , we have:
Thus, the measure of the set where is controlled by times the norm of .