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Descending Price Auctions with Bounded Number of Price Levels and Batched Prophet Inequality

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  • Saeed Alaei
  • Ali Makhdoumi
  • Azarakhsh Malekian
  • Rad Niazadeh

Abstract

We consider descending price auctions for selling $m$ units of a good to unit demand i.i.d. buyers where there is an exogenous bound of $k$ on the number of price levels the auction clock can take. The auctioneer's problem is to choose price levels $p_1 > p_2 > \cdots > p_{k}$ for the auction clock such that auction expected revenue is maximized. The prices levels are announced prior to the auction. We reduce this problem to a new variant of prophet inequality, which we call \emph{batched prophet inequality}, where a decision-maker chooses $k$ (decreasing) thresholds and then sequentially collects rewards (up to $m$) that are above the thresholds with ties broken uniformly at random. For the special case of $m=1$ (i.e., selling a single item), we show that the resulting descending auction with $k$ price levels achieves $1- 1/e^k$ of the unrestricted (without the bound of $k$) optimal revenue. That means a descending auction with just 4 price levels can achieve more than 98\% of the optimal revenue. We then extend our results for $m>1$ and provide a closed-form bound on the competitive ratio of our auction as a function of the number of units $m$ and the number of price levels $k$.

Suggested Citation

  • Saeed Alaei & Ali Makhdoumi & Azarakhsh Malekian & Rad Niazadeh, 2022. "Descending Price Auctions with Bounded Number of Price Levels and Batched Prophet Inequality," Papers 2203.01384, arXiv.org.
  • Handle: RePEc:arx:papers:2203.01384
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    References listed on IDEAS

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    7. Shuchi Chawla & Jason Hartline & David Malec & Balasubramanian Sivan, 2010. "Sequential Posted Pricing and Multi-parameter Mechanism Design," Discussion Papers 1486, Northwestern University, Center for Mathematical Studies in Economics and Management Science.
    8. Roger B. Myerson, 1981. "Optimal Auction Design," Mathematics of Operations Research, INFORMS, vol. 6(1), pages 58-73, February.
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    Cited by:

    1. Kshitij Kulkarni & Theo Diamandis & Tarun Chitra, 2022. "Towards a Theory of Maximal Extractable Value I: Constant Function Market Makers," Papers 2207.11835, arXiv.org, revised Apr 2023.

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