Polynomial Optimization with Real Varieties

Abstract

We consider the optimization problem of minimizing a polynomial f(x) subject to polynomial constraints h(x)=0, g(x)>=0. Lasserre's hierarchy is a sequence of sum of squares relaxations for finding the global minimum. Let K be the feasible set. We prove the following results: i) If the real variety VR(h) is finite, then Lasserre's hierarchy has finite convergence, no matter the complex variety VC(h) is finite or not. This solves an open question in Laurent's survey. ii) If K and VR(h) have the same vanishing ideal, then the finite convergence of Lasserre's hierarchy is independent of the choice of defining polynomials for the real variety VR(h). iii) When K is finite, a refined version of Lasserre's hierarchy (using the preordering of g) has finite convergence.