Solving large scale nonlinear optimization problems requires either significant computing resources or the development of specialized algorithms. For Linear Programming (LP) problems, decomposition methods can take advantage of problem structure, gradually constructing the full problem by generating variables or constraints. We first present a direct adaptation of the Column Generation (CG) methodology for nonlinear optimization problems, such that when optimizing over a structured set X plus a moderate number of complicating constraints, we solve a succession of 1) restricted master problems on a smaller set S ⊂ X and 2) pricing problems that are Lagrangean relaxations wrt the complicating constraints. The former...
Column generation algorithms are instrumental in many areas of applied optimization, where linear pr...
AbstractColumn generation algorithms are instrumental in many areas of applied optimization, where l...
Convex optimisation is used to solve many problems of interest in optimal control, signal processing...
Solving large scale nonlinear optimization problems requires either significant computing resource...
Garcia et al. [1] present a class of column generation (CG) algorithms for nonlinear programs. Its m...
Many central problems throughout optimization, machine learning, and statistics are equivalent to o...
Given a non-empty, compact and convex set, and an a priori defined condition which each element eith...
In column generation schemes, particularly those proposed for set partitioning type problems, dynami...
García et al. present a class of column generation (CG) algorithms for nonlinear programs. Its main ...
In the context of this dissertation we consider two mathematical optimization problems. The first c...
Conic quadratic functions arise often when modeling uncertainty and risk-aversion, and are used in m...
We consider the following problem min f(x) = x>Qx + c>x + d s.t. Ax = b (1) x = 0 with Q ?Rn×n, c ?R...
We describe a new approach to produce integer feasible columns to a set partitioning problem directl...
Most OR academics and practitioners are familiar with linear programming (LP) and its applications. ...
Any convex optimization problem may be represented as a conic problem that minimizes a linear functi...
Column generation algorithms are instrumental in many areas of applied optimization, where linear pr...
AbstractColumn generation algorithms are instrumental in many areas of applied optimization, where l...
Convex optimisation is used to solve many problems of interest in optimal control, signal processing...
Solving large scale nonlinear optimization problems requires either significant computing resource...
Garcia et al. [1] present a class of column generation (CG) algorithms for nonlinear programs. Its m...
Many central problems throughout optimization, machine learning, and statistics are equivalent to o...
Given a non-empty, compact and convex set, and an a priori defined condition which each element eith...
In column generation schemes, particularly those proposed for set partitioning type problems, dynami...
García et al. present a class of column generation (CG) algorithms for nonlinear programs. Its main ...
In the context of this dissertation we consider two mathematical optimization problems. The first c...
Conic quadratic functions arise often when modeling uncertainty and risk-aversion, and are used in m...
We consider the following problem min f(x) = x>Qx + c>x + d s.t. Ax = b (1) x = 0 with Q ?Rn×n, c ?R...
We describe a new approach to produce integer feasible columns to a set partitioning problem directl...
Most OR academics and practitioners are familiar with linear programming (LP) and its applications. ...
Any convex optimization problem may be represented as a conic problem that minimizes a linear functi...
Column generation algorithms are instrumental in many areas of applied optimization, where linear pr...
AbstractColumn generation algorithms are instrumental in many areas of applied optimization, where l...
Convex optimisation is used to solve many problems of interest in optimal control, signal processing...