The standard way to represent a choice between n alternatives in Mixed Integer Programming is through n binary variables that add up to one. Unfortunately, this approach commonly leads to unbalanced branch-and-bound trees and diminished solver performance. In this paper, we present an encoding formulation framework that encompasses and expands existing approaches to mitigate this behavior. Through this framework, we generalize the incremental formulation for piecewise linear functions to any finite union of polyhedra with identical recession cones
Over the past decade, decision diagrams (DDs) have been used to model and solve integer programming ...
AbstractWe provide formulation techniques for obtaining sharp (i.e., convex hull) mixed integer prog...
Standard mixed-integer programming formulations for the stable set problem on $n$-node graphs requir...
It is well known that selecting a good Mixed Integer Programming (MIP) formulation is crucial for an...
A wide range of problems can be modeled as Mixed Integer Linear Programming (MIP) problems using sta...
We introduce a general technique to create an extended formulation of a mixed-integer program. We ...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
AbstractWe introduce a general technique for creating an extended formulation of a mixed-integer pro...
In this survey we examine ways to reformulate integer and mixed integer programs. Typically, but not...
We consider mixed-integer linear programs with arbitrary bounded integer variables. We first describe...
This research is concerned with developing improved representations for special families of mixed-di...
In the first part of the paper, we present a framework for describing basic techniques to improve th...
We present a unifying framework for generating extended formulations for the polyhedral outer approx...
We view mixed integer/linear problem formulation as a process of identifying disjunctive and knapsac...
Many optimization problems require the modelling of discrete and continuous variables, giving rise t...
Over the past decade, decision diagrams (DDs) have been used to model and solve integer programming ...
AbstractWe provide formulation techniques for obtaining sharp (i.e., convex hull) mixed integer prog...
Standard mixed-integer programming formulations for the stable set problem on $n$-node graphs requir...
It is well known that selecting a good Mixed Integer Programming (MIP) formulation is crucial for an...
A wide range of problems can be modeled as Mixed Integer Linear Programming (MIP) problems using sta...
We introduce a general technique to create an extended formulation of a mixed-integer program. We ...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
AbstractWe introduce a general technique for creating an extended formulation of a mixed-integer pro...
In this survey we examine ways to reformulate integer and mixed integer programs. Typically, but not...
We consider mixed-integer linear programs with arbitrary bounded integer variables. We first describe...
This research is concerned with developing improved representations for special families of mixed-di...
In the first part of the paper, we present a framework for describing basic techniques to improve th...
We present a unifying framework for generating extended formulations for the polyhedral outer approx...
We view mixed integer/linear problem formulation as a process of identifying disjunctive and knapsac...
Many optimization problems require the modelling of discrete and continuous variables, giving rise t...
Over the past decade, decision diagrams (DDs) have been used to model and solve integer programming ...
AbstractWe provide formulation techniques for obtaining sharp (i.e., convex hull) mixed integer prog...
Standard mixed-integer programming formulations for the stable set problem on $n$-node graphs requir...