Polyhedral extended formulations that approximate the Gomory closure for packing problems

Abstract

We consider 0/1 packing problems \cT x Ax ≤ 1, \, x ∈ \0,1\n\, with A ∈ R≥ 0m × n. A way to solve such problems is via tightening the linear programming relaxation P with Gomory cutting-planes. The Gomory-closure P' of P is the intersection of P with all its cutting planes. The optimization problem over P' is NP-hard. Mastrolilli (2020) has shown that for fixed ε>0, the Lasserre hierarchy yields a polynomial-size convex but non-polyhedral extended formulation that approximates P' up to a factor of 1+ε. Our main result is the construction of a polyhedral and polynomial extended formulation that approximates P' with the same approximation guarantee. Our construction is based on first principles. Like Mastrolilli's approach, ours also applies to higher iterates P(t) for fixed t and ε>0. In contrast to an explicit construction, communication complexity provides an alternative way to describe extended formulations. Using this approach we obtain a quasi-polynomial polyhedral extended formulation for the above problem that is superior in some parameter regimes. To achieve this, we describe a communication protocol extending Yannakakis' protocol to decide whether the clique of Alice and the stable set of Bob intersect.

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