Schur's Inequality

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Schur's Inequality is an inequality that holds for positive numbers. It is named for Issai Schur.

Theorem

Schur's inequality states that for all non-negative $a,b,c \in \mathbb{R}$ and $r>0$ :

${a^r(a-b)(a-c)+b^r(b-a)(b-c)+c^r(c-a)(c-b) \geq 0}$

The four equality cases occur when $a=b=c$ or when two of $a,b,c$ are equal and the third is ${0}$ .

Common Cases

The $r=1$ case yields the well-known inequality: $a^3+b^3+c^3+3abc \geq a^2 b+a^2 c+b^2 a+b^2 c+c^2 a+c^2 b$

When $r=2$ , an equivalent form is: $a^4+b^4+c^4+abc(a+b+c) \geq a^3 b+a^3 c+b^3 a+b^3 c+c^3 a+c^3 b$

Proof

WLOG, let ${a \geq b \geq c}$ . Note that $a^r(a-b)(a-c)+b^r(b-a)(b-c)$ $= a^r(a-b)(a-c)-b^r(a-b)(b-c) = (a-b)(a^r(a-c)-b^r(b-c))$ . Clearly, $a^r \geq b^r \geq 0$ , and $a-c \geq b-c \geq 0$ . Thus, $(a-b)(a^r(a-c)-b^r(b-c)) \geq 0 \rightarrow a^r(a-b)(a-c)+b^r(b-a)(b-c) \geq 0$ . However, $c^r(c-a)(c-b) \geq 0$ , and thus the proof is complete.

Generalized Form

It has been shown by Valentin Vornicu that a more general form of Schur's Inequality exists. Consider $a,b,c,x,y,z \in \mathbb{R}$ , where ${a \geq b \geq c}$ , and either $x \geq y \geq z$ or $z \geq y \geq x$ . Let $k \in \mathbb{Z}^{+}$ , and let $f:\mathbb{R} \rightarrow \mathbb{R}_{0}^{+}$ be either convex or monotonic. Then,