Optimal estimators for threshold-based quality measures
Abstract
We consider a problem in parametric estimation: given samples from an unknown distribution, we want to estimate which distribution, from a given one-parameter family, produced the data. Following Schulman and Vazirani, we evaluate an estimator in terms of the chance of being within a specified tolerance of the correct answer, in the worst case. We provide optimal estimators for several families of distributions on . We prove that for distributions on a compact space, there is always an optimal estimator that is translation-invariant, and we conjecture that this conclusion also holds for any distribution on . By contrast, we give an example showing it does not hold for a certain distribution on an infinite tree.
Cite
@article{arxiv.2507.08811,
title = {Optimal estimators for threshold-based quality measures},
author = {Aaron Abrams and Sandy Ganzell and Henry Landau and Zeph Landau and James Pommersheim and Eric Zaslow},
journal= {arXiv preprint arXiv:2507.08811},
year = {2025}
}
Comments
This is the sixth of eleven old articles being uploaded to arxiv after publication