Strong mixed-integer formulations for the floor layout problem

Author(s)

Dey, Santanu S.; Huchette, Joey; Vielma, Juan Pablo

Abstract

The floor layout problem (FLP) tasks a designer with positioning a collection of rectangular boxes on a fixed floor in such a way that minimizes total communication costs between the components. While several mixed integer programming (MIP) formulations for this problem have been developed, it remains extremely challenging from a computational perspective. This work takes a systematic approach to constructing MIP formulations and valid inequalities for the FLP that unifies and recovers all known formulations for it. In addition, the approach yields new formulations that can provide a significant computational advantage and can solve previously unsolved instances. While the construction approach focuses on the FLP, it also exemplifies generic formulation techniques that should prove useful for broader classes of problems.

Date issued

2017-07

URI

http://hdl.handle.net/1721.1/121061

Department

Massachusetts Institute of Technology. Operations Research Center
Sloan School of Management

Journal

INFOR Information Systems and Operational Research

Publisher

University of Toronto Press Inc

Citation

Huchette, Joey et al. “Strong Mixed-Integer Formulations for the Floor Layout Problem.” INFOR: Information Systems and Operational Research 56, 4 (July 2017): 392–433. doi:10.1080/03155986.2017.1346916. © 2017 The Author(s)

Version: Original manuscript

ISSN

0315-5986

1916-0615