Ideal Clutters That Do Not Pack

Article

Abdi, Ahmad; Pashkovich, Kanstantsin; Cornuejols, Gerard

University of Waterloo; Carnegie Mellon University

MATHEMATICS OF OPERATIONS RESEARCH

0364-765X

10.1287/moor.2017.0871

2018

533-553

For a clutter C over ground set E, a pair of distinct elements e, f is an element of E are coexclusive if every minimal cover contains at most one of them. An identification of C is another clutter obtained after identifying coexclusive elements of C. If a clutter is nonpacking, then so is any identification of it. Inspired by this observation, and impelled by the lack of a qualitative characterization for ideal minimally nonpacking (mnp) clutters, we reduce ideal mnp clutters even further by taking their identifications. In doing so, we reveal chains of ideal mnp clutters, demonstrate the centrality of mnp clutters with covering number two, as well as provide a qualitative characterization of irreducible ideal mnp clutters with covering number two. At the core of this characterization lies a class of objects, called marginal cuboids, that naturally give rise to ideal nonpacking clutters with covering number two. We present an explicit class of marginal cuboids, and show that the corresponding clutters have one of Q(6), Q(2,1), Q(10) as a minor, where Q(6), Q(2,1) are known ideal mnp clutters, and Q(10) is a new ideal mnp clutter.