Aggregation-based cutting-planes for packing and covering integer programs

Article

Bodur, Merve; Del Pia, Alberto; Dey, Santanu S.; Molinaro, Marco; Pokutta, Sebastian

University of Toronto; University of Wisconsin System; University of Wisconsin Madison; University System of Georgia; Georgia Institute of Technology; Pontificia Universidade Catolica do Rio de Janeiro

MATHEMATICAL PROGRAMMING

0025-5610

10.1007/s10107-017-1192-x

2018

331-359

In this paper, we study the strength of Chvatal-Gomory (CG) cuts and more generally aggregation cuts for packing and covering integer programs (IPs). Aggregation cuts are obtained as follows: given an IP formulation, we first generate a single implied inequality using aggregation of the original constraints, then obtain the integer hull of the set defined by this single inequality with variable bounds, and finally use the inequalities describing the integer hull as cutting-planes. Our first main result is to show that for packing and covering IPs, the CG and aggregation closures can be 2-approximated by simply generating the respective closures for each of the original formulation constraints, without using any aggregations. On the other hand, we use computational experiments to show that aggregation cuts can be arbitrarily stronger than cuts from individual constraints for general IPs. The proof of the above stated results for the case of covering IPs with bounds require the development of some new structural results, which may be of independent interest. Finally, we examine the strength of cuts based on k different aggregation inequalities simultaneously, the so-called multi-row cuts, and show that every packing or covering IP with a large integrality gap also has a large k-aggregation closure rank. In particular, this rank is always at least of the order of the logarithm of the integrality gap.