Abstract

We examine the complexity of branch-and-cut proofs in the context of 0-1 integer programs. We establish an exponential lower bound on the length of branch-and-cut proofs that use 0-1 branching and lift-and-project cuts (called simple disjunctive cuts by some authors), Gomory-Chvátal cuts, and cuts arising from the N 0 matrix-cut operator of Lovász and Schrijver. A consequence of the lower-bound result in this paper is that branch-and-cut methods of the type described above have exponential running time in the worst case.