Muirhead's Inequality

Revision as of 22:38, 25 June 2006 by Dschafer (talk | contribs) (Wiki-fied and moved majorization definition)

Muirhead's Inequality states that if a sequence $A$ majorizes a sequence $B$, then given a set of positive integers $\displaystyle x_1,x_2,\cdots,x_n$:

$\displaystyle \sum_{sym} {x_1}^{a_1}{x_2}^{a_2}\cdots {x_n}^{a_n}\geq \sum_{sym} {x_1}^{b_1}{x_2}^{b_2}\cdots {x_n}^{b_n}$


The inequality is easier to understand given an example. Since the sequence $\displaystyle (5,1)$ majorizes $\displaystyle (4,2)$, Muirhead's inequality states that for any positive $\displaystyle x,y$,

$\displaystyle x^5y^1+y^5x^1\geq x^4y^2+y^4x^2$

Usage on Olympiad Problems

A common bruteforce technique with inequalities is to clear denominators, multiply everything out, and apply Muirhead's or Schur's. However, it is worth noting that any inequality that can be proved directly with Muirhead can also be proved using the Arithmetic Mean-Geometric Mean inequality. In fact, IMO gold medalist Thomas Mildorf says it is unwise to use Muirhead in an Olympiad solution; one should use an application of AM-GM instead. Thus, it is suggested that Muirhead be used only to verify that an inequality can be proved with AM-GM before demonstrating the full AM-GM proof.

As an example, the above inequality can be proved using AM-GM as follows:

$\displaystyle \frac{x^4+x^4+x^4+y^4}{4}\geq\sqrt[4]{x^{12}y^4}=x^3y$

$\displaystyle \frac{x^4+y^4+y^4+y^4}{4}\geq\sqrt[4]{x^4y^{12}}=xy^3$

Adding these,

$\displaystyle x^4+y^4\geq x^3y+xy^3$

Multiplying both sides by $\displaystyle xy$ (as both $\displaystyle x$ and $\displaystyle y$ are positive),

$\displaystyle x^5y+xy^5\geq x^4y^2+x^2y^4$

as desired.

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