We revisit the classic supporting hyperplane illustration of the duality gap for non-convex optimization problems. It is refined by dissecting the duality gap into two terms: the first measures the degree of near-optimality in a Lagrangian relaxation, while the second measures the degree of near-complementarity in the Lagrangian relaxed constraints. We also give an example of how this dissection may be exploited in the design of a solution approach within discrete optimization.Funding: Linkoping University</p
Since a vector program has not just an optimal value but a set of optimal ones, the analysis of dual...
International audienceA newly defined notion of convex closedness regarding a set is used in order t...
In this paper we consider the problem of minimizing a nonconvex quadratic function, subject to two q...
We revisit the classic supporting hyperplane illustration of the duality gap for non-convex optimiza...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
134 pagesNonconvex optimizations are ubiquitous in many application fields. One important aspect of ...
We consider multistage stochastic optimization models. Logical or integrality constraints, frequentl...
Since a vector program has not just an optimal value but a set of optimal ones, the analysis of dua...
We show that various duals that occur in optimization and constraint satisfaction can be classified ...
We introduce and study a new dual condition which characterizes zero duality gap in nonsmooth convex...
International audienceLagrangian relaxation is usually considered in the combinatorial optimization ...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
The Lagrangian function in the conventional theory for solving constrained optimization problems is ...
Many duality theories of optimization problem arised in last decades were born as independent theori...
International audienceThe Shapley-Folkman theorem shows that Minkowski averages of uniformly bounded...
Since a vector program has not just an optimal value but a set of optimal ones, the analysis of dual...
International audienceA newly defined notion of convex closedness regarding a set is used in order t...
In this paper we consider the problem of minimizing a nonconvex quadratic function, subject to two q...
We revisit the classic supporting hyperplane illustration of the duality gap for non-convex optimiza...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
134 pagesNonconvex optimizations are ubiquitous in many application fields. One important aspect of ...
We consider multistage stochastic optimization models. Logical or integrality constraints, frequentl...
Since a vector program has not just an optimal value but a set of optimal ones, the analysis of dua...
We show that various duals that occur in optimization and constraint satisfaction can be classified ...
We introduce and study a new dual condition which characterizes zero duality gap in nonsmooth convex...
International audienceLagrangian relaxation is usually considered in the combinatorial optimization ...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
The Lagrangian function in the conventional theory for solving constrained optimization problems is ...
Many duality theories of optimization problem arised in last decades were born as independent theori...
International audienceThe Shapley-Folkman theorem shows that Minkowski averages of uniformly bounded...
Since a vector program has not just an optimal value but a set of optimal ones, the analysis of dual...
International audienceA newly defined notion of convex closedness regarding a set is used in order t...
In this paper we consider the problem of minimizing a nonconvex quadratic function, subject to two q...