Difference between revisions of "Jensen's Inequality"
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In fact, the [[power mean inequality]], a generalization of AM-GM, follows from Jensen's inequality. | In fact, the [[power mean inequality]], a generalization of AM-GM, follows from Jensen's inequality. | ||
− | =Problems= | + | ==Problems== |
− | ==Introductory== | + | ===Introductory=== |
− | ===Problem 1=== | + | ====Problem 1==== |
Prove AM-GM using Jensen's Inequality | Prove AM-GM using Jensen's Inequality | ||
− | ===Problem 2=== | + | ====Problem 2==== |
Prove that <math>x_1^{\lambda_1}x_2^{\lambda_2} \cdots x_n^{\lambda_n} \leq \lambda_1 x_1 + \lambda_2 x_2 +\cdots+ \lambda_n x_n</math> when <math>\lambda_1 + \cdots + \lambda_n = 1</math> | Prove that <math>x_1^{\lambda_1}x_2^{\lambda_2} \cdots x_n^{\lambda_n} \leq \lambda_1 x_1 + \lambda_2 x_2 +\cdots+ \lambda_n x_n</math> when <math>\lambda_1 + \cdots + \lambda_n = 1</math> | ||
Revision as of 01:19, 30 December 2021
Jensen's Inequality is an inequality discovered by Danish mathematician Johan Jensen in 1906.
Contents
Inequality
Let be a convex function of one real variable. Let and let satisfy . Then
If is a concave function, we have:
Proof
We only prove the case where is concave. The proof for the other case is similar.
Let . As is concave, its derivative is monotonically decreasing. We consider two cases.
If , then If , then By the fundamental theorem of calculus, we have Evaluating the integrals, each of the last two inequalities implies the same result: so this is true for all . Then we have as desired.
Example
One of the simplest examples of Jensen's inequality is the quadratic mean - arithmetic mean inequality. Taking , which is convex (because and ), and , we obtain
Similarly, arithmetic mean-geometric mean inequality (AM-GM) can be obtained from Jensen's inequality by considering .
In fact, the power mean inequality, a generalization of AM-GM, follows from Jensen's inequality.
Problems
Introductory
Problem 1
Prove AM-GM using Jensen's Inequality
Problem 2
Prove that when
Intermediate
- Prove that for any , we have .
- Show that in any triangle we have
Olympiad
- Let be positive real numbers. Prove that
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