Relaxation in Optimization Theory and Variational Calculus

Background generalities: order and topology; linear and convex analysis; optimization theory; functions and measure spaces; means of continuous functions; some differential and integral equations; non-cooperative game theory. Theory of convex compactifications: convex compactifications; canonical form of convex compactifications; approximation of convex compactifications; extension of mappings. Young measures and their generalizations: classical Young measures; various generalizations; approximation theory; extensions of Nemytskii mappings. Relaxation in optimization theory: abstract optimization problems; optimization problems on Lebesgue spaces; example - optimal control of dynamical systems; example - elliptic optimal control problems; example - parabolic optimal control problems; example - optimal control of integral equations. relaxation in variational calculus I: convex compactifications of Sobolev spaces; relaxation of variational problems - p > 1 ; optimality conditions for relaxed problems; relaxation of variational problems - p = 1; convex approximation of relaxed problems. relaxation in variational calculus II: prerequisites around quasiconvexity; gradient generalized Young functionals; relaxation scheme and its FEM-approximation; further approximation - an inner case; further approximation - an outer case; double-well problem - sample calculations. Relaxation in game theory: abstract game-theoretical problems; games on Lebesgue spaces; example - games with dynamical systems; example - elliptic games; bibliography; list of symbols. (Part contents).