Add to ORKGIn this dissertation we study several non-convex and stochastic optimization problems. The common theme is the use of mixed-integer programming (MIP) techniques including valid inequalities and reformulation to solve these problems. We first study a strategic capacity planning model which captures the trade-off between the incentive to delay capacity installation to wait for improved technology and the need for some capacity to be installed to meet current demands. This problem is naturally formulated as a MIP with a bilinear objective. We develop several linear MIP formulations, along with classes of strong valid inequalities. We also present a specialized branch-and-cut algorithm to solve a compact concave formulation. Computational re...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
Multistage optimization under uncertainty refers to sequential decision-making with the presence of ...
Based on the recent successes in stochastic linear programming and mixed integer programming, in th...
Stochastic Integer Programming is a variant of Linear Programming which incorporates integer and sto...
In this thesis we investigate the design and complexity analysis of the algorithms to solve convex p...
Optimization has been an important tool in statistics for a long time. For example, the problem of p...
In this thesis we investigate the design and complexity analysis of the algorithms to solve convex p...
This thesis was submitted for the degree of Doctor of Philosophy and awarded by Brunel University.In...
The primary focus of this dissertation is on optimization problems that involve uncertainty unfoldin...
We propose a new class of stochastic integer programs whose special features are dominance constrain...
This paper addresses a general class of two-stage stochastic programs with integer recourse and disc...
We propose a new class of stochastic integer programs whose special features are dominance constrain...
Many planning problems involve choosing a set of optimal decisions for a system in the face of uncer...
We consider a class of multicriteria stochastic optimization problems that features benchmarking con...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
Multistage optimization under uncertainty refers to sequential decision-making with the presence of ...
Based on the recent successes in stochastic linear programming and mixed integer programming, in th...
Stochastic Integer Programming is a variant of Linear Programming which incorporates integer and sto...
In this thesis we investigate the design and complexity analysis of the algorithms to solve convex p...
Optimization has been an important tool in statistics for a long time. For example, the problem of p...
In this thesis we investigate the design and complexity analysis of the algorithms to solve convex p...
This thesis was submitted for the degree of Doctor of Philosophy and awarded by Brunel University.In...
The primary focus of this dissertation is on optimization problems that involve uncertainty unfoldin...
We propose a new class of stochastic integer programs whose special features are dominance constrain...
This paper addresses a general class of two-stage stochastic programs with integer recourse and disc...
We propose a new class of stochastic integer programs whose special features are dominance constrain...
Many planning problems involve choosing a set of optimal decisions for a system in the face of uncer...
We consider a class of multicriteria stochastic optimization problems that features benchmarking con...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
Multistage optimization under uncertainty refers to sequential decision-making with the presence of ...
Based on the recent successes in stochastic linear programming and mixed integer programming, in th...