English

Targeting Makes Sample Efficiency in Auction Design

Computer Science and Game Theory 2021-05-12 v1

Abstract

This paper introduces the targeted sampling model in optimal auction design. In this model, the seller may specify a quantile interval and sample from a buyer's prior restricted to the interval. This can be interpreted as allowing the seller to, for example, examine the top 4040 percents bids from previous buyers with the same characteristics. The targeting power is quantified with a parameter Δ[0,1]\Delta \in [0, 1] which lower bounds how small the quantile intervals could be. When Δ=1\Delta = 1, it degenerates to Cole and Roughgarden's model of i.i.d. samples; when it is the idealized case of Δ=0\Delta = 0, it degenerates to the model studied by Chen et al. (2018). For instance, for nn buyers with bounded values in [0,1][0, 1], O~(ϵ1)\tilde{O}(\epsilon^{-1}) targeted samples suffice while it is known that at least Ω~(nϵ2)\tilde{\Omega}(n \epsilon^{-2}) i.i.d. samples are needed. In other words, targeted sampling with sufficient targeting power allows us to remove the linear dependence in nn, and to improve the quadratic dependence in ϵ1\epsilon^{-1} to linear. In this work, we introduce new technical ingredients and show that the number of targeted samples sufficient for learning an ϵ\epsilon-optimal auction is substantially smaller than the sample complexity of i.i.d. samples for the full spectrum of Δ[0,1)\Delta \in [0, 1). Even with only mild targeting power, i.e., whenever Δ=o(1)\Delta = o(1), our targeted sample complexity upper bounds are strictly smaller than the optimal sample complexity of i.i.d. samples.

Keywords

Cite

@article{arxiv.2105.05123,
  title  = {Targeting Makes Sample Efficiency in Auction Design},
  author = {Yihang Hu and Zhiyi Huang and Yiheng Shen and Xiangning Wang},
  journal= {arXiv preprint arXiv:2105.05123},
  year   = {2021}
}

Comments

To appear in The Twenty-Second ACM Conference on Economics and Computation (EC 21)

R2 v1 2026-06-24T01:59:43.385Z