Multivariate McCormick relaxations

Author(s)

Tsoukalas, A.; Mitsos, A.; Mitsos, A

Abstract

McCormick (Math Prog 10(1):147–175, 1976) provides the framework for convex/concave relaxations of factorable functions, via rules for the product of functions and compositions of the form F ∘ f, where F is a univariate function. Herein, the composition theorem is generalized to allow multivariate outer functions F, and theory for the propagation of subgradients is presented. The generalization interprets the McCormick relaxation approach as a decomposition method for the auxiliary variable method. In addition to extending the framework, the new result provides a tool for the proof of relaxations of specific functions. Moreover, a direct consequence is an improved relaxation for the product of two functions, at least as tight as McCormick’s result, and often tighter. The result also allows the direct relaxation of multilinear products of functions. Furthermore, the composition result is applied to obtain improved convex underestimators for the minimum/maximum and the division of two functions for which current relaxations are often weak. These cases can be extended to allow composition of a variety of functions for which relaxations have been proposed.

Date issued

2014-04

URI

http://hdl.handle.net/1721.1/103338

Department

Massachusetts Institute of Technology. Department of Mechanical Engineering

Journal

Journal of Global Optimization

Publisher

Springer US

Citation

Tsoukalas, A., and A. Mitsos. “Multivariate McCormick Relaxations.” J Glob Optim 59, no. 2–3 (April 2, 2014): 633–662. doi:10.1007/s10898-014-0176-0.

Version: Final published version

ISSN

0925-5001

1573-2916