1992
DOI: 10.1287/opre.40.1.s109
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A Linearization Procedure for Quadratic and Cubic Mixed-Integer Problems

Abstract: Several techniques of linearization have appeared in the literature. The technique of F. Glover, which seems to be the most efficient, linearizes a binary quadratic integer problem of n variables by introducing n new continuous variables and 4n auxiliary linear constraints. The new technique proposed in this paper is not only useful in linearizing binary quadratic and cubic integer problems, but also applicable to the case of quadratic and to a certain class of cubic “mixed-integer” problems. It is shown that … Show more

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Cited by 87 publications
(46 citation statements)
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“…These linearizations are some of the oldest MIP formulation techniques [58,7,100,133,59,162,60,70,8,117,72,135] and continue to be a very active area of research [5,3,71,64,65,4]. They are an important tool for nonconvex mixed integer nonlinear programming [29] and have been extensively studied in the context of mathematical programming reformulations [109,108].…”
Section: Linearization Of Productsmentioning
confidence: 99%
“…These linearizations are some of the oldest MIP formulation techniques [58,7,100,133,59,162,60,70,8,117,72,135] and continue to be a very active area of research [5,3,71,64,65,4]. They are an important tool for nonconvex mixed integer nonlinear programming [29] and have been extensively studied in the context of mathematical programming reformulations [109,108].…”
Section: Linearization Of Productsmentioning
confidence: 99%
“…Hahn et al (2010) and Hahn et al (2012) used the reformulation-linearization technique to solve QAP. Additional methods have been proposed by Glover and Woolsey (1974), Armour and Buffa (1963), Foulds (1983), Adams and Sherali (1986), and Oral and Kettani (1992). Heragu and Kusiak (1991) present two linearizations for the facility layout problem.…”
Section: Related Literaturementioning
confidence: 99%
“…The technique known as radix-based discretization described by Kolodziej [14] and Castro [25] is used to discretize the bilinear term. The product y = f · x can be represented exactly with the following constraints and disjunction:…”
Section: Radix-based Discretizationmentioning
confidence: 99%