F.5 JENSEN'S INEQUALITY
Theorem F.10 (Jensen's inequality). Let X be a random variable defined on an open interval with cdf fX(x), and let g(x) be a convex function. Then
Proof. From the definition of a convex function (see Appendix B), there exists a line c(x) = a(x−xo) + g(xo) such that 
for all x in the open interval. As a result for random variable X:
Letting 
in c(X) gives
(F.40) 
Substituting this result into (F.39) completes the proof. If g(x) is strictly convex, then (F.38) has strict inequality except when 
with probability one.
If g(x) is instead a concave function, the inequality in (F.38) is reversed. The following example gives a result in information theory (see Chapter 10) that is also useful for the expectation-maximization algorithm described in Chapter 9.
Example F.3. Consider random variable X with pdf fX(x) and let g(x) be a nonnegative function (which ...
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