Sample compression schemes for VC classes

March 24, 2015 ยท Declared Dead ยท ๐Ÿ› Information Theory and Applications Workshop

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Authors Shay Moran, Amir Yehudayoff arXiv ID 1503.06960 Category cs.LG: Machine Learning Citations 99 Venue Information Theory and Applications Workshop Last Checked 4 months ago
Abstract
Sample compression schemes were defined by Littlestone and Warmuth (1986) as an abstraction of the structure underlying many learning algorithms. Roughly speaking, a sample compression scheme of size $k$ means that given an arbitrary list of labeled examples, one can retain only $k$ of them in a way that allows to recover the labels of all other examples in the list. They showed that compression implies PAC learnability for binary-labeled classes, and asked whether the other direction holds. We answer their question and show that every concept class $C$ with VC dimension $d$ has a sample compression scheme of size exponential in $d$. The proof uses an approximate minimax phenomenon for binary matrices of low VC dimension, which may be of interest in the context of game theory.
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