Solving Linear Programs with Differential Privacy

July 15, 2025 Β· Declared Dead Β· πŸ› International Workshop and International Workshop on Approximation, Randomization, and Combinatorial Optimization. Algorithms and Techniques

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Authors Alina Ene, Huy Le Nguyen, Ta Duy Nguyen, Adrian Vladu arXiv ID 2507.10946 Category cs.DS: Data Structures & Algorithms Citations 1 Venue International Workshop and International Workshop on Approximation, Randomization, and Combinatorial Optimization. Algorithms and Techniques Last Checked 4 months ago
Abstract
We study the problem of solving linear programs of the form $Ax\le b$, $x\ge0$ with differential privacy. For homogeneous LPs $Ax\ge0$, we give an efficient $(Ρ,δ)$-differentially private algorithm which with probability at least $1-β$ finds in polynomial time a solution that satisfies all but $O(\frac{d^{2}}Ρ\log^{2}\frac{d}{δβ}\sqrt{\log\frac{1}{ρ_{0}}})$ constraints, for problems with margin $ρ_{0}>0$. This improves the bound of $O(\frac{d^{5}}Ρ\log^{1.5}\frac{1}{ρ_{0}}\mathrm{poly}\log(d,\frac{1}δ,\frac{1}β))$ by [Kaplan-Mansour-Moran-Stemmer-Tur, STOC '25]. For general LPs $Ax\le b$, $x\ge0$ with potentially zero margin, we give an efficient $(Ρ,δ)$-differentially private algorithm that w.h.p drops $O(\frac{d^{4}}Ρ\log^{2.5}\frac{d}δ\sqrt{\log dU})$ constraints, where $U$ is an upper bound for the entries of $A$ and $b$ in absolute value. This improves the result by Kaplan et al. by at least a factor of $d^{5}$. Our techniques build upon privatizing a rescaling perceptron algorithm by [Hoberg-Rothvoss, IPCO '17] and a more refined iterative procedure for identifying equality constraints by Kaplan et al.
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