Convex programming has been a research topic for a long time, both theoretically and algorithmically. Frequently, these programs lack complete data or contain rapidly shifting data. In response, we consider solving parametric programs, which allow for fast evaluation of the optimal solutions once the data is known. It has been established that, when the objective and constraint functions are convex in both variables and parameters, the optimal solutions can be estimated via linear interpolation. Many applications of parametric optimization violate the necessary convexity assumption. However, the linear interpolation is still useful; as such, we extend this interpolation to more general parametric programs in which the objective and constra...
An algorithm for convex parametric QPs is studied. The algorithm explores the parameter space by ste...
Mathematical optimization, or mathematical programming, has been studied for several decades. Resear...
This thesis contains five chapters. The notations, terminologies, definitions and numbering of equat...
In this Master’s thesis, we study the role of convexification as it is used in un- constrained optim...
We provide a concise introduction to some methods for solving nonlinear optimization problems. This ...
This work contributes to modeling, theoretical, and practical aspects of structured Mathematical Pro...
Optimization is the process of maximizing or minimizing a desired objective function while satisfyin...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
This book presents state-of-the-art results and methodologies in modern global optimization, and has...
Multiobjective quadratic programs (MOQPs) are appealing since convex quadratic programs have elegant...
Linear programming (LP) and semidefinite programming (SDP) are among the most important tools in Ope...
The purpose of this paper was to provide a review of the theory of Optimization, in particular non-l...
Convex optimization now plays an essential role in many facets of statistics. We briefly survey some...
In this paper S.M. Robinson's result concerning the upper Lipschitz continuity of polyhedral multifu...
AbstractThis paper is motivated by the fact that mixed integer nonlinear programming is an important...
An algorithm for convex parametric QPs is studied. The algorithm explores the parameter space by ste...
Mathematical optimization, or mathematical programming, has been studied for several decades. Resear...
This thesis contains five chapters. The notations, terminologies, definitions and numbering of equat...
In this Master’s thesis, we study the role of convexification as it is used in un- constrained optim...
We provide a concise introduction to some methods for solving nonlinear optimization problems. This ...
This work contributes to modeling, theoretical, and practical aspects of structured Mathematical Pro...
Optimization is the process of maximizing or minimizing a desired objective function while satisfyin...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
This book presents state-of-the-art results and methodologies in modern global optimization, and has...
Multiobjective quadratic programs (MOQPs) are appealing since convex quadratic programs have elegant...
Linear programming (LP) and semidefinite programming (SDP) are among the most important tools in Ope...
The purpose of this paper was to provide a review of the theory of Optimization, in particular non-l...
Convex optimization now plays an essential role in many facets of statistics. We briefly survey some...
In this paper S.M. Robinson's result concerning the upper Lipschitz continuity of polyhedral multifu...
AbstractThis paper is motivated by the fact that mixed integer nonlinear programming is an important...
An algorithm for convex parametric QPs is studied. The algorithm explores the parameter space by ste...
Mathematical optimization, or mathematical programming, has been studied for several decades. Resear...
This thesis contains five chapters. The notations, terminologies, definitions and numbering of equat...