English

Blackwell's Approachability with Approximation Algorithms

Optimization and Control 2025-06-17 v2 Machine Learning

Abstract

We revisit Blackwell's celebrated approachability problem which considers a repeated vector-valued game between a player and an adversary. Motivated by settings in which the action set of the player or adversary (or both) is difficult to optimize over, for instance when it corresponds to the set of all possible solutions to some NP-Hard optimization problem, we ask what can the player guarantee \textit{efficiently}, when only having access to these sets via approximation algorithms with ratios α\mX1\alpha_{\mX} \geq 1 and 1α\mY>0 1 \geq \alpha_{\mY} > 0, respectively. Assuming the player has monotone preferences, in the sense that he does not prefer a vector-valued loss 1\ell_1 over 2\ell_2 if 21\ell_2 \leq \ell_1, we establish that given a Blackwell instance with an approachable target set SS, the downward closure of the appropriately-scaled set α\mXα\mY1S\alpha_{\mX}\alpha_{\mY}^{-1}S is \textit{efficiently} approachable with optimal rate. In case only the player's or adversary's set is equipped with an approximation algorithm, we give simpler and more efficient algorithms.

Keywords

Cite

@article{arxiv.2502.03919,
  title  = {Blackwell's Approachability with Approximation Algorithms},
  author = {Dan Garber and Mhna Massalha},
  journal= {arXiv preprint arXiv:2502.03919},
  year   = {2025}
}

Comments

Accepted to the international conference on Computational Learning Theory (COLT), 2025

R2 v1 2026-06-28T21:34:34.193Z