Schur's Inequality
Schur's Inequality states that for all non-negative and :
The four equality cases occur when or when two of are equal and the third is .
Common Cases
The case yields the well-known inequality:
When , an equivalent form is:
Proof
WLOG, let . Note that . Clearly, , and . Thus, . However, , 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 , where , and either or . Let , and let be either convex or monotonic. Then,
.
The standard form of Schur's is the case of this inequality where .
References
- Mildorf, Thomas; Olympiad Inequalities; January 20, 2006; <http://www.mit.edu/~tmildorf/Inequalities.pdf>
- Vornicu, Valentin; Olimpiada de Matematica... de la provocare la experienta; GIL Publishing House; Zalau, Romania.