A non-convex relaxed version of minimax theorems

Abstract

Given a subset A× B of a locally convex space X× Y (with A compact) and a function f:A× B→R such that f(·,y), y∈ B, are concave and upper semicontinuous, the minimax inequality x∈ A ∈fy∈ B f(x,y) ≥ ∈fy∈ B x∈ A0 f(x,y) is shown to hold provided that A0 be the set of x∈ A such that f(x,·) is proper, convex and lower semi-contiuous. Moreover, if in addition A× B⊂ f-1(R), then we can take as A0 the set of x∈ A such that f(x,·) is convex. The relation to Moreau's biconjugate representation theorem is discussed, and some applications to\ convex duality are provided. Key words. Minimax theorem, Moreau theorem, conjugate function, convex optimization.