2022-06-28-blanc22a.md

title	booktitle	abstract	layout	series	publisher	issn	id	month	tex_title	firstpage	lastpage	page	order	cycles	bibtex_author	author	date	address	container-title	volume	genre	issued	pdf	extras
A query-optimal algorithm for finding counterfactuals	Proceedings of the 39th International Conference on Machine Learning	We design an algorithm for finding counterfactuals with strong theoretical guarantees on its performance. For any monotone model $f : X^d \to \{0,1\}$ and instance $x^\star$, our algorithm makes \[{S}(f)^{O(\Delta_f(x^\star))}\cdot \log d\]{queries} to $f$ and returns an {\sl optimal} counterfactual for $x^\star$: a nearest instance $x’$ to $x^\star$ for which $f(x’)\ne f(x^\star)$. Here $S(f)$ is the sensitivity of $f$, a discrete analogue of the Lipschitz constant, and $\Delta_f(x^\star)$ is the distance from $x^\star$ to its nearest counterfactuals. The previous best known query complexity was $d^{\,O(\Delta_f(x^\star))}$, achievable by brute-force local search. We further prove a lower bound of $S(f)^{\Omega(\Delta_f(x^\star))} + \Omega(\log d)$ on the query complexity of any algorithm, thereby showing that the guarantees of our algorithm are essentially optimal.	inproceedings	Proceedings of Machine Learning Research	PMLR	2640-3498	blanc22a	0	A query-optimal algorithm for finding counterfactuals	2075	2090	2075-2090	2075	false	Blanc, Guy and Koch, Caleb and Lange, Jane and Tan, Li-Yang	given family Guy Blanc given family Caleb Koch given family Jane Lange given family Li-Yang Tan	2022-06-28		Proceedings of the 39th International Conference on Machine Learning	162	inproceedings	date-parts 2022 6 28	https://proceedings.mlr.press/v162/blanc22a/blanc22a.pdf