English

On the optimal objective value of random linear programs

Probability 2026-03-17 v4 Optimization and Control

Abstract

We consider the problem of maximizing c,x\langle c,x \rangle subject to the constraints Ax1Ax \leq \mathbf{1}, where xRnx\in R^n, AA is an m×nm\times n matrix with mutually independent centered subgaussian entries of unit variance, and cc is a cost vector of unit Euclidean length. In the asymptotic regime nn\to\infty, mn\frac{m}{n}\to\infty, and under some mild assumptions on cc, we prove that the optimal objective value zz^* of the linear program satisfies limn2log(m/n)z=1\mboxalmostsurely. \lim\limits_{n\to\infty}\sqrt{2\log(m/n)}\,z^*= 1\quad \mbox{almost surely}. We provide numerical experiments as supporting data for the theoretical predictions. Further, we carry out numerical studies of the limiting distribution and the standard deviation of zz^*.

Keywords

Cite

@article{arxiv.2401.17530,
  title  = {On the optimal objective value of random linear programs},
  author = {Marzieh Bakhshi and James Ostrowski and Konstantin Tikhomirov},
  journal= {arXiv preprint arXiv:2401.17530},
  year   = {2026}
}

Comments

added proof of asymptotic upper bound on z^*

R2 v1 2026-06-28T14:32:36.877Z