Markov's inequality
In probability theory, Markov's inequality gives an upper bound for the probability that a non-negative function of a random variable is greater than or equal to some positive constant. It is named after the Russian mathematician Andrey Markov.Markov's inequality (and other similar inequalities) relate probabilities to expectationss, and provide (frequently) loose but still useful bounds for the distribution function of a random variable.
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2 A Generalisation |
Markov's inequality states that if X is a random variable and a is some positive constant, then
Markov's inequality is actually just one of a wider class of inequalities relating probabilities and expectations, that are all examples of a single theorem.
Let X be a random variable and a be some positive constant (a > 0). If
Let A be the set {x: h(x) ≥ a}, and let IA(x) be the indicator function of A. (That is, IA(x) = 1 if x ∈ A, and is 0 otherwise.) Then,
Definition
A Generalisation
Theorem
then
Proof
The theorem follows by taking the expectation of both sides of this equation, and observing that
Examples
