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Line 7: If <math>f</math> is Schur-convex and all first partial derivatives exist, then the following holds, where <math> f_{(i)}(x) </math> denotes the partial derivative with respect to <math> x_i </math>: :<math> ~~\begin{equation}~~ (x_1 - x_2)(f_{(1)}(x) - f_{(2)}(x)) \ge 0 ~~\end{equation}~~ </math> for all <math> x </math>. Since <math> f </math> is a symmetric function, the above condition implies all the similar conditions for the remaining indexes! == Examples ==

Schur-convex function: Difference between revisions