Add to ORKGWe examine multistage optimization problems, in which one or more decision makers solve a sequence of interdependent optimization problems. In each stage the corresponding decision maker determines values for a set of variables, which in turn parameterizes the subsequent problem by modifying its constraints and objective function. The optimization literature has covered multistage optimization problems in the form of bilevel programs, interdiction problems, robust optimization, and two-stage stochastic programming. One of the main differences among these research areas lies in the relationship between the decision makers. We analyze the case in which the decision makers are self-interested agents seeking to optimize their own objective func...
The primary focus of this dissertation is on optimization problems that involve uncertainty unfoldin...
Development of interactive Decision Support Systems requires new approaches and numerical algorithms...
A general technique is developed to restart nonderivative algorithms in unconstrained optimization. ...
We examine multistage optimization problems, in which one or more decision makers solve a sequence o...
We study bilevel optimization problems that model decentralized decision-making settings with two in...
We introduce a unified framework for the study of multilevel mixed integer linear optimization probl...
Bilevel optimization problems are very challenging optimization models arising in many important pra...
We consider a subfamily of mixed-integer linear bilevel problems that we call Generalized Interdicti...
We introduce a unified framework for the study of multilevel mixed integer linear optimization probl...
Bilevel programming is a special branch of mathematical programming that deals with optimization pro...
In this dissertation we study several non-convex and stochastic optimization problems. The common th...
In recent years, decision rules have been established as the preferred solution method for addressin...
Bilevel optimization is a field of mathematical programming in which some variables are constrained ...
This thesis presents the mixed integer bilevel programming problems where some optimality conditions...
A research approach is presented for solving stochastic, multi-objective optimization problems. Firs...
The primary focus of this dissertation is on optimization problems that involve uncertainty unfoldin...
Development of interactive Decision Support Systems requires new approaches and numerical algorithms...
A general technique is developed to restart nonderivative algorithms in unconstrained optimization. ...
We examine multistage optimization problems, in which one or more decision makers solve a sequence o...
We study bilevel optimization problems that model decentralized decision-making settings with two in...
We introduce a unified framework for the study of multilevel mixed integer linear optimization probl...
Bilevel optimization problems are very challenging optimization models arising in many important pra...
We consider a subfamily of mixed-integer linear bilevel problems that we call Generalized Interdicti...
We introduce a unified framework for the study of multilevel mixed integer linear optimization probl...
Bilevel programming is a special branch of mathematical programming that deals with optimization pro...
In this dissertation we study several non-convex and stochastic optimization problems. The common th...
In recent years, decision rules have been established as the preferred solution method for addressin...
Bilevel optimization is a field of mathematical programming in which some variables are constrained ...
This thesis presents the mixed integer bilevel programming problems where some optimality conditions...
A research approach is presented for solving stochastic, multi-objective optimization problems. Firs...
The primary focus of this dissertation is on optimization problems that involve uncertainty unfoldin...
Development of interactive Decision Support Systems requires new approaches and numerical algorithms...
A general technique is developed to restart nonderivative algorithms in unconstrained optimization. ...