Mean Estimation from One-Bit Measurements
Abstract
We consider the problem of estimating the mean of a symmetric log-concave distribution under the constraint that only a single bit per sample from this distribution is available to the estimator. We study the mean squared error as a function of the sample size (and hence the number of bits). We consider three settings: first, a centralized setting, where an encoder may release bits given a sample of size , and for which there is no asymptotic penalty for quantization; second, an adaptive setting in which each bit is a function of the current observation and previously recorded bits, where we show that the optimal relative efficiency compared to the sample mean is precisely the efficiency of the median; lastly, we show that in a distributed setting where each bit is only a function of a local sample, no estimator can achieve optimal efficiency uniformly over the parameter space. We additionally complement our results in the adaptive setting by showing that \emph{one} round of adaptivity is sufficient to achieve optimal mean-square error.
Keywords
Cite
@article{arxiv.1901.03403,
title = {Mean Estimation from One-Bit Measurements},
author = {Alon Kipnis and John C. Duchi},
journal= {arXiv preprint arXiv:1901.03403},
year = {2023}
}
Comments
Accepted for publication in the IEEE Transactions on Information Theory