We study combinatorial problems with ellipsoidal uncertainty in the objective function concerning their theoretical and practical solvability. Ellipsoidal uncertainty is a natural model when the coefficients are normally distributed random variables. Robust versions of typical combinatorial problems can be very hard to solve compared to their linear versions. Complexity and approaches differ fundamentally depending on whether uncorrelated or correlated uncertainty occurs. We distinguish between these two cases and consider first the unconstrained binary optimization under uncorrelated ellipsoidal uncertainty. For this we develop an algorithm which computes an optimal solution by merely sorting the variables and, correspondingly, has a runn...
Probabilistic guarantees on constraint satisfaction for robust counterpart optimization are studied ...
In this paper, we consider a network of processors aiming at cooperatively solving a convex feasibil...
We consider combinatorial optimization problems with nonlinear objective functions. Solution approa...
We consider robust counterparts of uncertain combinatorial optimization problems, where the differen...
We address combinatorial optimization problems with uncertain coefficients varying over ellipsoidal ...
Combinatorial optimization captures a wide range of applications such as infrastructure design and s...
Data uncertainty in real-life problems is a current challenge in many areas, including Operations Re...
This thesis primarily focuses on studying the copositive programming reformulations of difficult opt...
This thesis addresses the Robust counterpart of binary linear problems with ellipsoidal uncertainty ...
This paper briefly describes three well-established frameworks for handling uncertainty in optimizat...
In this paper, we discuss the problem of approximating ellipsoid uncertainty sets with bounded (gamm...
International audienceWe consider robust combinatorial optimization problems where the decision make...
peer reviewedThe problem of finding the least squares solution s to a system of equations Hs = y is ...
We consider a bilevel continuous knapsack problem where the leader controls the capacity of the knap...
In robust combinatorial optimization with discrete uncertainty, approximation algorithms based on co...
Probabilistic guarantees on constraint satisfaction for robust counterpart optimization are studied ...
In this paper, we consider a network of processors aiming at cooperatively solving a convex feasibil...
We consider combinatorial optimization problems with nonlinear objective functions. Solution approa...
We consider robust counterparts of uncertain combinatorial optimization problems, where the differen...
We address combinatorial optimization problems with uncertain coefficients varying over ellipsoidal ...
Combinatorial optimization captures a wide range of applications such as infrastructure design and s...
Data uncertainty in real-life problems is a current challenge in many areas, including Operations Re...
This thesis primarily focuses on studying the copositive programming reformulations of difficult opt...
This thesis addresses the Robust counterpart of binary linear problems with ellipsoidal uncertainty ...
This paper briefly describes three well-established frameworks for handling uncertainty in optimizat...
In this paper, we discuss the problem of approximating ellipsoid uncertainty sets with bounded (gamm...
International audienceWe consider robust combinatorial optimization problems where the decision make...
peer reviewedThe problem of finding the least squares solution s to a system of equations Hs = y is ...
We consider a bilevel continuous knapsack problem where the leader controls the capacity of the knap...
In robust combinatorial optimization with discrete uncertainty, approximation algorithms based on co...
Probabilistic guarantees on constraint satisfaction for robust counterpart optimization are studied ...
In this paper, we consider a network of processors aiming at cooperatively solving a convex feasibil...
We consider combinatorial optimization problems with nonlinear objective functions. Solution approa...