Differentiable Convex Functions
If a function attains its minimum on a convex set at , and is differentiable at , then for all .
If attains its minimum on at , and is differentiable at , then . Or, more precisely, if is differentiable from the right at and .
Suppose is the unit ball and a differentiable attains its a minimum at with Then for all This is true if and only if By Cauchy-Schwartz this means that , with
As an aside, if a differentiable function attains its minimum on the unit sphere at then attains is minimum over at . Setting the derivative equal to zero shows that we must have , which again translates to , with