Existence theorems for optimal solutions in semi-algebraic optimization

Abstract

Consider the problem of minimizing a lower semi-continuous semi-algebraic function f Rn R \+∞\ on an unbounded closed semi-algebraic set S ⊂ Rn. Employing adequate tools of semi-algebraic geometry, we first establish some properties of the tangency variety of the restriction of f on S. Then we derive verifiable necessary and sufficient conditions for the existence of optimal solutions of the problem as well as the boundedness from below and coercivity of the restriction of f on S. We also present a computable formula for the optimal value of the problem.