A hierarchy of convex relaxations for semialgebraic problems is introduced. For questions reducible to a finite number of polynomial equalities and inequalities, it is shown how to construct a complete family of polynomially sized semidefinite programming conditions that prove infeasibility. The main tools employed are a semidefinite programming formulation of the sum of squares decomposition for multivariate polynomials, and some results from real algebraic geometry. The techniques provide a constructive approach for finding bounded degree solutions to the Positivstellensatz, and are illustrated with examples from diverse application fields
We consider the problem of minimizing a polynomial over a semialgebraic set defined by polynomial eq...
For an arbitrary finite family of semialgebraic/definable functions, we consider the corresponding i...
39 pages, 15 tablesWe consider polynomial optimization problems (POP) on a semialgebraic set contain...
A hierarchy of convex relaxations for semialgebraic problems is introduced. For questions reducible ...
33 pages, 2 figures, 5 tablesIn a first contribution, we revisit two certificates of positivity on (...
We present an extension of the scalar polynomial optimization by sum-of squares de-compositions [5] ...
An exact semidefinite linear programming (SDP) relaxation of a nonlinear semidef-inite programming p...
The Lasserre hierarchy of semidefinite programming approximations to convex polynomial optimization ...
Many problems of systems control theory boil down to solving polynomial equations, polynomial inequa...
We consider the general feasibility problem for semidefinite programming: Determine whether a given ...
A polynomial SDP (semidefinite programs) minimizes a polynomial objective function over a feasible r...
It is the intention of the authors of this paper to provide the reader with a general view of convex...
In semidefinite programming one minimizes a linear function subject to the constraint that an affine...
We consider the problem of minimizing a polynomial over a semialgebraic set defined by polynomial eq...
For an arbitrary finite family of semialgebraic/definable functions, we consider the corresponding i...
39 pages, 15 tablesWe consider polynomial optimization problems (POP) on a semialgebraic set contain...
A hierarchy of convex relaxations for semialgebraic problems is introduced. For questions reducible ...
33 pages, 2 figures, 5 tablesIn a first contribution, we revisit two certificates of positivity on (...
We present an extension of the scalar polynomial optimization by sum-of squares de-compositions [5] ...
An exact semidefinite linear programming (SDP) relaxation of a nonlinear semidef-inite programming p...
The Lasserre hierarchy of semidefinite programming approximations to convex polynomial optimization ...
Many problems of systems control theory boil down to solving polynomial equations, polynomial inequa...
We consider the general feasibility problem for semidefinite programming: Determine whether a given ...
A polynomial SDP (semidefinite programs) minimizes a polynomial objective function over a feasible r...
It is the intention of the authors of this paper to provide the reader with a general view of convex...
In semidefinite programming one minimizes a linear function subject to the constraint that an affine...
We consider the problem of minimizing a polynomial over a semialgebraic set defined by polynomial eq...
For an arbitrary finite family of semialgebraic/definable functions, we consider the corresponding i...
39 pages, 15 tablesWe consider polynomial optimization problems (POP) on a semialgebraic set contain...