We view mixed integer/linear problem formulation as a process of identifying disjunctive and knapsack constraints in a problem and converting them to mixed integer form. We show through a series of examples that following this process can yield mixed integer models that automatically incorporate some of the modeling devices that have been discovered over the years for making the formulation tighter. In one case it substantially improves on the generally accepted model. We provide a theoretical basis for the process by generalizing Jeroslow’s mixed integer representability theorem
As advanced undergraduate and graduate students begin conducting research, they must base their work...
<p>In this work, we propose an algorithmic approach to improve mixed-integer models that are origina...
w9259490 For mathematical programming (MP) to have greater impact upon the decision making proc...
AbstractWe define the concept of a representation of a set of either linear constraints in bounded i...
The purpose of this paper is to explain the property of Disjunctive Formulations for Mixed Integer P...
In the first part of the paper, we present a framework for describing basic techniques to improve th...
AbstractWe introduce a general technique for creating an extended formulation of a mixed-integer pro...
A mixed-integer program is an optimization problem where one is required to minimize a linear functi...
A wide range of problems can be modeled as Mixed Integer Linear Programming (MIP) problems using sta...
The splitting of variables in an integer programming model into the sum of other variables can allow...
Two practical problems are described, each of which can be formulated in more than one way as a mixe...
AbstractIt is shown that any bounded integer linear programming problem can be trans- formed to an e...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
It is well known that selecting a good Mixed Integer Programming (MIP) formulation is crucial for an...
AbstractWe study the representation of (possibly) nonlinear functions which may appear in the constr...
As advanced undergraduate and graduate students begin conducting research, they must base their work...
<p>In this work, we propose an algorithmic approach to improve mixed-integer models that are origina...
w9259490 For mathematical programming (MP) to have greater impact upon the decision making proc...
AbstractWe define the concept of a representation of a set of either linear constraints in bounded i...
The purpose of this paper is to explain the property of Disjunctive Formulations for Mixed Integer P...
In the first part of the paper, we present a framework for describing basic techniques to improve th...
AbstractWe introduce a general technique for creating an extended formulation of a mixed-integer pro...
A mixed-integer program is an optimization problem where one is required to minimize a linear functi...
A wide range of problems can be modeled as Mixed Integer Linear Programming (MIP) problems using sta...
The splitting of variables in an integer programming model into the sum of other variables can allow...
Two practical problems are described, each of which can be formulated in more than one way as a mixe...
AbstractIt is shown that any bounded integer linear programming problem can be trans- formed to an e...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
It is well known that selecting a good Mixed Integer Programming (MIP) formulation is crucial for an...
AbstractWe study the representation of (possibly) nonlinear functions which may appear in the constr...
As advanced undergraduate and graduate students begin conducting research, they must base their work...
<p>In this work, we propose an algorithmic approach to improve mixed-integer models that are origina...
w9259490 For mathematical programming (MP) to have greater impact upon the decision making proc...