On the Efficient Implementation of High Accuracy Optimality of Profile Maximum Likelihood
Charikar, Moses, Jiang, Zhihao, Shiragur, Kirankumar, Sidford, Aaron
–arXiv.org Artificial Intelligence
We provide an efficient unified plug-in approach for estimating symmetric properties of distributions given $n$ independent samples. Our estimator is based on profile-maximum-likelihood (PML) and is sample optimal for estimating various symmetric properties when the estimation error $\epsilon \gg n^{-1/3}$. This result improves upon the previous best accuracy threshold of $\epsilon \gg n^{-1/4}$ achievable by polynomial time computable PML-based universal estimators [ACSS21, ACSS20]. Our estimator reaches a theoretical limit for universal symmetric property estimation as [Han21] shows that a broad class of universal estimators (containing many well known approaches including ours) cannot be sample optimal for every $1$-Lipschitz property when $\epsilon \ll n^{-1/3}$.
arXiv.org Artificial Intelligence
Oct-13-2022
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