Add to ORKGAdded constraint sampling result, simplified sampling results, reformat, etcThe Shapley-Folkman theorem shows that Minkowski averages of uniformly bounded sets tend to be convex when the number of terms in the sum becomes much larger than the ambient dimension. In optimization, Aubin and Ekeland [1976] show that this produces an a priori bound on the duality gap of separable nonconvex optimization problems involving finite sums. This bound is highly conservative and depends on unstable quantities, and we relax it in several directions to show that non convexity can have a much milder impact on finite sum minimization problems such as empirical risk minimization and multi-task classification. As a byproduct, we show a new version of Maurey's...
The minimax theorem for a convex-concave bifunction is a fundamental theorem in optimization and con...
305 pagesThis thesis concerns the foundations of first-order optimization theory. In recent years, t...
Optimization algorithms and Monte Carlo sampling algorithms have provided the computational foundati...
International audienceThe Shapley-Folkman theorem shows that Minkowski averages of uniformly bounded...
Let us define for a compact set A ⊂ R n the sequence A(k) = a 1 + · · · + a k k : a 1 ,. .. , a k ∈ ...
134 pagesNonconvex optimizations are ubiquitous in many application fields. One important aspect of ...
In this paper non-convexity in economics has been revisited. Shapley-Folkman-Lyapunov theorem has be...
International audienceLet us define for a compact set A⊂Rn the sequenceA(k)={(a1+⋯+ak)/k : a1, …, ak...
We consider the problem of minimizing a sum of non-convex functions over a compact domain, subject t...
Random sampling is an e±cient method to deal with constrained optimization problems in computational...
Thesis (Ph.D.)--University of Washington, 2015The thesis studies convex optimization over the Banach...
The convex sets strict separation is very useful to obtain mathematical optimization results. The mi...
The approximate Carath\'eodory problem in general form is as follows: Given two symmetric convex bod...
We consider the scenario approach theory to deal with convex optimization programs affected by uncer...
This paper deals with the sampled scenarios approach to robust convex programming. It has been shown...
The minimax theorem for a convex-concave bifunction is a fundamental theorem in optimization and con...
305 pagesThis thesis concerns the foundations of first-order optimization theory. In recent years, t...
Optimization algorithms and Monte Carlo sampling algorithms have provided the computational foundati...
International audienceThe Shapley-Folkman theorem shows that Minkowski averages of uniformly bounded...
Let us define for a compact set A ⊂ R n the sequence A(k) = a 1 + · · · + a k k : a 1 ,. .. , a k ∈ ...
134 pagesNonconvex optimizations are ubiquitous in many application fields. One important aspect of ...
In this paper non-convexity in economics has been revisited. Shapley-Folkman-Lyapunov theorem has be...
International audienceLet us define for a compact set A⊂Rn the sequenceA(k)={(a1+⋯+ak)/k : a1, …, ak...
We consider the problem of minimizing a sum of non-convex functions over a compact domain, subject t...
Random sampling is an e±cient method to deal with constrained optimization problems in computational...
Thesis (Ph.D.)--University of Washington, 2015The thesis studies convex optimization over the Banach...
The convex sets strict separation is very useful to obtain mathematical optimization results. The mi...
The approximate Carath\'eodory problem in general form is as follows: Given two symmetric convex bod...
We consider the scenario approach theory to deal with convex optimization programs affected by uncer...
This paper deals with the sampled scenarios approach to robust convex programming. It has been shown...
The minimax theorem for a convex-concave bifunction is a fundamental theorem in optimization and con...
305 pagesThis thesis concerns the foundations of first-order optimization theory. In recent years, t...
Optimization algorithms and Monte Carlo sampling algorithms have provided the computational foundati...