Robust Contextual Pricing
Abstract
We provide an algorithm with regret $O(C d \log \log T)$ for contextual pricing with $C$ corrupted rounds, improving over the previous bound of $O(d^3 C \log^2(T))$ of Krishnamurthy et al. The result is based on a reduction that calls the uncorrupted algorithm as a black-box, unlike the previous approach that modifies the inner workings of the uncorrupted algorithm. As a result, it leads to a conceptually simpler algorithm. Finally, we provide a lower bound ruling out a $O(C + d\log \log T)$ algorithm. This shows that robustifying contextual pricing is harder than robustifying contextual search with $\epsilon$-ball losses, for which it is possible to design algorithms where corruptions add only an extra additive term $C$ to the regret.
Cite
Text
Gupta et al. "Robust Contextual Pricing." Advances in Neural Information Processing Systems, 2025.Markdown
[Gupta et al. "Robust Contextual Pricing." Advances in Neural Information Processing Systems, 2025.](https://mlanthology.org/neurips/2025/gupta2025neurips-robust/)BibTeX
@inproceedings{gupta2025neurips-robust,
title = {{Robust Contextual Pricing}},
author = {Gupta, Anupam and Guruganesh, Guru and Leme, Renato Paes and Schneider, Jon},
booktitle = {Advances in Neural Information Processing Systems},
year = {2025},
url = {https://mlanthology.org/neurips/2025/gupta2025neurips-robust/}
}