Split cuts are arguably the most effective class of cutting planes within a branch-and-cut framework for solving general Mixed-Integer Programs (MIP). Sparsity, on the other hand, is a common characteristic of MIP problems, and it is an important part of why the simplex method works so well inside branch-and-cut. In this work, we evaluate the strength of split cuts that exploit sparsity. In particular, we show that restricting ourselves to sparse disjunctions-and furthermore, ones that have small disjunctive coefficients-still leads to a significant portion of the total gap closed with arbitrary split cuts. We also show how to exploit sparsity structure that is implicit in the MIP formulation to produce splits that are sparse yet still effe...
Mixed-integer Gomory cuts have become an integral part of state-of-the-art software for solving mixe...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
We describe a computationally effective method for generating disjunctive inequalities for convex m...
Cutting planes are one of the major techniques used in solving Mixed-Integer Linear Programming (MIP...
Disjunctive cuts for Mixed-Integer Linear Programs (MIPs) were introduced by Egon Balas in the late ...
Disjunctive cuts for Mixed-Integer Linear Programs (MIPs) were introduced by Egon Balas in the late ...
Split cuts represent the most widely used class of cutting planes currently employed by state-of-the...
We discuss an enhancement of the Balas-Jeroslow procedure for strengthening disjunctive cuts for mix...
This paper considers a modification of the branch-and-cut algorithm for Mixed Integer Linear Program...
<p>There has recently been reinvigorated interest in finding new general-purpose cutting planes (cut...
Sparse cutting-planes are often the ones used in mixed-integer programing (MIP) solvers, since they ...
We analyse a class of mathematical programs that enable the generation of disjunctive cutting planes...
Sparse cutting-planes are often the ones used in mixed-integer programing (MIP) solvers, since they ...
Abstract. Mixed Integer Nonlinear Programming (MINLP) problems present two main challenges: the inte...
Embedding cuts into a branch-and-cut framework is a delicate task, the main so when the implemented ...
Mixed-integer Gomory cuts have become an integral part of state-of-the-art software for solving mixe...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
We describe a computationally effective method for generating disjunctive inequalities for convex m...
Cutting planes are one of the major techniques used in solving Mixed-Integer Linear Programming (MIP...
Disjunctive cuts for Mixed-Integer Linear Programs (MIPs) were introduced by Egon Balas in the late ...
Disjunctive cuts for Mixed-Integer Linear Programs (MIPs) were introduced by Egon Balas in the late ...
Split cuts represent the most widely used class of cutting planes currently employed by state-of-the...
We discuss an enhancement of the Balas-Jeroslow procedure for strengthening disjunctive cuts for mix...
This paper considers a modification of the branch-and-cut algorithm for Mixed Integer Linear Program...
<p>There has recently been reinvigorated interest in finding new general-purpose cutting planes (cut...
Sparse cutting-planes are often the ones used in mixed-integer programing (MIP) solvers, since they ...
We analyse a class of mathematical programs that enable the generation of disjunctive cutting planes...
Sparse cutting-planes are often the ones used in mixed-integer programing (MIP) solvers, since they ...
Abstract. Mixed Integer Nonlinear Programming (MINLP) problems present two main challenges: the inte...
Embedding cuts into a branch-and-cut framework is a delicate task, the main so when the implemented ...
Mixed-integer Gomory cuts have become an integral part of state-of-the-art software for solving mixe...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
We describe a computationally effective method for generating disjunctive inequalities for convex m...