- categories: Measure Theory, Theorem
Let be a measure space, and let be a non-negative measurable function. For any , the inequality states:
Intuition:
Markov’s inequality tells us that the “size” (measure) of the set where a function exceeds a certain threshold is bounded by the average value (integral) of divided by .
Proof:
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Define the set: Let be the set where exceeds the threshold . We want to find an upper bound for .
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Bound on the set : By definition of , for all , we have . Thus, we can write:
where is the indicator function of the set , which is if and otherwise.
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Integrate both sides: Now integrate both sides over the entire space with respect to the measure :
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Simplify the right-hand side: Since is only on the set and elsewhere, the integral on the right-hand side simplifies to:
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Final inequality: Therefore, we have:
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Rearrange to obtain Markov’s inequality: Dividing both sides by (where ), we obtain: