Disjunctive cuts in Mixed-Integer Conic Optimization

Author(s)

Lodi, Andrea; Tanneau, Mathieu; Vielma, Juan-Pablo

Abstract

Abstract This paper studies disjunctive cutting planes in Mixed-Integer Conic Programming. Building on conic duality, we formulate a cut-generating conic program for separating disjunctive cuts, and investigate the impact of the normalization condition on its resolution. In particular, we show that a careful selection of normalization guarantees its solvability and conic strong duality. Then, we highlight the shortcomings of separating conic-infeasible points in an outer-approximation context, and propose conic extensions to the classical lifting and monoidal strengthening procedures. Finally, we assess the computational behavior of various normalization conditions in terms of gap closed, computing time and cut sparsity. In the process, we show that our approach is competitive with the internal lift-and-project cuts of a state-of-the-art solver.

Date issued

2022-06-27

URI

https://hdl.handle.net/1721.1/150554

Department

Sloan School of Management

Publisher

Springer Berlin Heidelberg

Citation

Lodi, Andrea, Tanneau, Mathieu and Vielma, Juan-Pablo. 2022. "Disjunctive cuts in Mixed-Integer Conic Optimization."

Version: Author's final manuscript