Abstract
For a locally convex space E and f :E→R¯, we introduce and study surrogate conjugate functionals of f, which en¬compass the quasi-conjugates [1] , pseudo-conjugates [2] and semi-conjugates [3] of f. Also, we introduce and study surro¬gate convexity of sets GcE and of functionals f:E→R¯ and show their connections with surrogate conjugation and with W-conve-xity of sets [4] and of functionals [5], where WcR¯E. We outline some further developments (surrogate conjugates at a point, surrogate subdifferentials) and an application to optimization. A basic role is played by the concept of a universally defined multifunction A:RXE*→2E