English

Decision Problems in Multilevel Linear Programming

Optimization and Control 2026-05-07 v1

Abstract

We study the computational complexity of decision problems in kk-level linear programming (LP). Seminal work by Jeroslow establishes that determining whether the optimal objective value of a kk-level LP is at least as good as a given threshold is Σk1p\Sigma^{\mathrm{p}}_{k-1}-hard. In this paper, we demonstrate the matching upper bound and thereby prove that this problem is Σk1p\Sigma^{\mathrm{p}}_{k-1}-complete. To this end, we show that the feasible region of a kk-level LP can be expressed as a union of sets defined by weak and strict linear inequalities. Moreover, we show that the decision of the unboundedness is Σk1p\Sigma^{\mathrm{p}}_{k-1}-complete. Finally, we discuss the extension of our results to the mixed-binary cases. In short, this work closes lasting open questions in multilevel programming.

Keywords

Cite

@article{arxiv.2605.04929,
  title  = {Decision Problems in Multilevel Linear Programming},
  author = {Nagisa Sugishita and Margarida Carvalho},
  journal= {arXiv preprint arXiv:2605.04929},
  year   = {2026}
}

Comments

18 pages

R2 v1 2026-07-01T12:52:50.718Z