In this paper, we consider the challenging problem of riskaware proactive scheduling with the objective of minimizing robust makespan. State-of-the-art approaches based on probabilistic constrained optimization lead to Mixed Integer Linear Programs that must be heuristically approximated. We optimize the robust makespan via a coherent risk measure, Conditional Value-at-Risk (CVaR). Since traditional CVaR optimization approaches assuming linear spaces does not suit our problem, we propose a general branch-and-bound framework for combinatorial CVaR minimization. We then design an approximate complete algorithm, and employ resource reasoning to enable constraint propagation for multiple samples. Empirical results show that our algorithm outper...
In this work, we consider RCPSP/max with durational uncertainty. We focus on computing robust Partia...
The objective of this thesis has been the study of risk analysis and optimization under uncertainty....
The work describes conditional value at risk, its robustification with respect to the probability di...
We study optimization problems with value-at-risk (VaR) constraints. Because it lacks subadditivity,...
The resource-constrained project scheduling problem (RCPSP) with stochastic activity durations invol...
Temporal uncertainty in large-scale logistics forces one to trade off between lost efficiency throug...
Most decisions related to industrial plant design and scheduling, that strongly influences the the f...
We consider the problem of designing policies for Markov decision processes (MDPs) with dynamic cohe...
We review and develop different tractable approximations to individual chance-constrained problems i...
In this paper we review the different tractable approximations of individual chance constraint probl...
International audienceThis paper develops a safety analysis method for stochastic systems that is se...
In this paper, we present a new method for finding robust solutions to mixed-integer linear programs...
We review and develop different tractable approximations to individual chance constrained problems i...
Temporal uncertainty in large-scale logistics forces one to trade off between lost efficiency throug...
It is unrealistic to formulate the problems arising under uncertain environments as deterministic op...
In this work, we consider RCPSP/max with durational uncertainty. We focus on computing robust Partia...
The objective of this thesis has been the study of risk analysis and optimization under uncertainty....
The work describes conditional value at risk, its robustification with respect to the probability di...
We study optimization problems with value-at-risk (VaR) constraints. Because it lacks subadditivity,...
The resource-constrained project scheduling problem (RCPSP) with stochastic activity durations invol...
Temporal uncertainty in large-scale logistics forces one to trade off between lost efficiency throug...
Most decisions related to industrial plant design and scheduling, that strongly influences the the f...
We consider the problem of designing policies for Markov decision processes (MDPs) with dynamic cohe...
We review and develop different tractable approximations to individual chance-constrained problems i...
In this paper we review the different tractable approximations of individual chance constraint probl...
International audienceThis paper develops a safety analysis method for stochastic systems that is se...
In this paper, we present a new method for finding robust solutions to mixed-integer linear programs...
We review and develop different tractable approximations to individual chance constrained problems i...
Temporal uncertainty in large-scale logistics forces one to trade off between lost efficiency throug...
It is unrealistic to formulate the problems arising under uncertain environments as deterministic op...
In this work, we consider RCPSP/max with durational uncertainty. We focus on computing robust Partia...
The objective of this thesis has been the study of risk analysis and optimization under uncertainty....
The work describes conditional value at risk, its robustification with respect to the probability di...