Exact lower bounds for the agnostic probably-approximately-correct (PAC) machine learning model

9Citations
Citations of this article
12Readers
Mendeley users who have this article in their library.

Abstract

We provide an exact nonasymptotic lower bound on the minimax expected excess risk (EER) in the agnostic probably-approximately-correct (PAC) machine learning classification model and identify minimax learning algorithms as certain maximally symmetric and minimally randomized "voting" procedures. Based on this result, an exact asymptotic lower bound on the minimax EER is provided. This bound is of the simple form c∞/√ν as ν→∞, where c∞ = 0.16997 . . . is a universal constant, ν = m/d, m is the size of the training sample and d is the Vapnik-Chervonenkis dimension of the hypothesis class. It is shown that the differences between these asymptotic and nonasymptotic bounds, as well as the differences between these two bounds and the maximum EER of any learning algorithms that minimize the empirical risk, are asymptotically negligible, and all these differences are due to ties in the mentioned "voting" procedures. A few easy to compute nonasymptotic lower bounds on the minimax EER are also obtained, which are shown to be close to the exact asymptotic lower bound c∞/√ν even for rather small values of the ratio ν = m/d. As an application of these results, we substantially improve existing lower bounds on the tail probability of the excess risk. Among the tools used are Bayes estimation and apparently new identities and inequalities for binomial distributions.

Cite

CITATION STYLE

APA

Kontorovich, A., & Pinelis, I. (2019). Exact lower bounds for the agnostic probably-approximately-correct (PAC) machine learning model. Annals of Statistics, 47(5), 2822–2854. https://doi.org/10.1214/18-AOS1766

Register to see more suggestions

Mendeley helps you to discover research relevant for your work.

Already have an account?

Save time finding and organizing research with Mendeley

Sign up for free