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Prophet Inequalities via Linear Programming

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Listed:
  • Halil I. Bayrak
  • Mustafa c{C}. P{i}nar
  • Rakesh Vohra

Abstract

Prophet inequalities bound the expected reward that can be obtained in a stopping problem by the optimal reward of its corresponding off-line version. We propose a systematic technique for deriving prophet inequalities for stopping problems associated with selecting a point in a polyhedron. It utilizes a reduced-form linear programming representation of the stopping problem. We illustrate the technique to derive a number of known results as well as some new ones. For instance, we prove a $\frac{1}{2}$-prophet inequality when the underlying polyhedron is an on-line polymatroid; one whose underlying submodular function depends upon the realized rewards. We also demonstrate a composition by the Minkowski sum property. If an $r-$ prophet inequality holds for polyhedra $P^1$ and $P^2$, it also holds for their Minkowski sum.

Suggested Citation

  • Halil I. Bayrak & Mustafa c{C}. P{i}nar & Rakesh Vohra, 2026. "Prophet Inequalities via Linear Programming," Papers 2602.07542, arXiv.org.
    • Handle: RePEc:arx:papers:2602.07542
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    References listed on IDEAS

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    1. Yeon‐Koo Che & Jinwoo Kim & Konrad Mierendorff, 2013. "Generalized Reduced‐Form Auctions: A Network‐Flow Approach," Econometrica, Econometric Society, vol. 81(6), pages 2487-2520, November.
    2. Shipra Agrawal & Zizhuo Wang & Yinyu Ye, 2014. "A Dynamic Near-Optimal Algorithm for Online Linear Programming," Operations Research, INFORMS, vol. 62(4), pages 876-890, August.
    3. Vohra, Akhil & Toikka, Juuso & Vohra, Rakesh, 2023. "Bayesian persuasion: Reduced form approach," Journal of Mathematical Economics, Elsevier, vol. 107(C).
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