We consider linear optimization over a nonempty convex semi-algebraic feasible region F. Semidefinite programming is an example. If F is compact, then for almost every linear objective there is a unique optimal solution, lying on a unique \active" manifold, around which F is \partly smooth", and the second-order sufficient conditions hold. Perturbing the objective results in smooth variation of the optimal solution. The active manifold consists, locally, of these perturbed optimal solutions; it is independent of the representation of F, and is eventually identified by a variety of iterative algorithms such as proximal and projected gradient schemes. These results extend to unbounded sets F
Convex algebraic geometry concerns the interplay between optimization theory and real algebraic geo...
This thesis studies the problem of extending the concept of γ-active constraints to Convex Semi-In...
The Lasserre hierarchy of semidefinite programming approximations to convex polynomial optimization ...
We consider linear optimization over a nonempty convex semi-algebraic feasible region F. Semidefinit...
International audienceWe consider linear optimization over a nonempty convex semialgebraic feasible ...
We consider linear optimization over a nonempty convex semialgebraic feasible region F. Semidefinite...
We consider linear optimization over a fixed compact convex feasi-ble region that is semi-algebraic ...
We consider a convex semi-infinite programming (SIP) problem whose objective and constraint function...
We derive a new genericity result for nonlinear semidefinite programming (NLSDP). Namely, almost all...
We consider semidefinite programs (SDPs) of size n with equality constraints. In order to overcome s...
The optimal value of a polynomial optimization over a compact semialgebraic set can be approximated ...
We consider convex problems of semi-infinite programming (SIP) using an approach based on the impli...
International audienceWe consider the class of polynomial optimization problems $\inf \{f(x):x\in K\...
We establish new necessary and sufficient optimality conditions for global optimization problems. In...
Abstract This paper is devoted to the study of optimality conditions for strict minimizers of higher...
Convex algebraic geometry concerns the interplay between optimization theory and real algebraic geo...
This thesis studies the problem of extending the concept of γ-active constraints to Convex Semi-In...
The Lasserre hierarchy of semidefinite programming approximations to convex polynomial optimization ...
We consider linear optimization over a nonempty convex semi-algebraic feasible region F. Semidefinit...
International audienceWe consider linear optimization over a nonempty convex semialgebraic feasible ...
We consider linear optimization over a nonempty convex semialgebraic feasible region F. Semidefinite...
We consider linear optimization over a fixed compact convex feasi-ble region that is semi-algebraic ...
We consider a convex semi-infinite programming (SIP) problem whose objective and constraint function...
We derive a new genericity result for nonlinear semidefinite programming (NLSDP). Namely, almost all...
We consider semidefinite programs (SDPs) of size n with equality constraints. In order to overcome s...
The optimal value of a polynomial optimization over a compact semialgebraic set can be approximated ...
We consider convex problems of semi-infinite programming (SIP) using an approach based on the impli...
International audienceWe consider the class of polynomial optimization problems $\inf \{f(x):x\in K\...
We establish new necessary and sufficient optimality conditions for global optimization problems. In...
Abstract This paper is devoted to the study of optimality conditions for strict minimizers of higher...
Convex algebraic geometry concerns the interplay between optimization theory and real algebraic geo...
This thesis studies the problem of extending the concept of γ-active constraints to Convex Semi-In...
The Lasserre hierarchy of semidefinite programming approximations to convex polynomial optimization ...