Some applications of arcwise connnected functions for minimax inequalities and equalities (Q1120117)

The authors present a version of minimax equality for functions which are arcwise connected convex, which means that the inequality defining convexity is of the form: f(H(t))\(\leq (1-t)f(x_ 1)+tf(x_ 2)\) for all \(t\in [0,1]\), where H is some arc joining \(x_ 1\) and \(x_ 2\).