A Characterization of List Learnability

November 07, 2022 ยท Declared Dead ยท ๐Ÿ› Symposium on the Theory of Computing

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Authors Moses Charikar, Chirag Pabbaraju arXiv ID 2211.04956 Category stat.ML: Machine Learning (Stat) Cross-listed cs.DS, cs.LG Citations 20 Venue Symposium on the Theory of Computing Last Checked 4 months ago
Abstract
A classical result in learning theory shows the equivalence of PAC learnability of binary hypothesis classes and the finiteness of VC dimension. Extending this to the multiclass setting was an open problem, which was settled in a recent breakthrough result characterizing multiclass PAC learnability via the DS dimension introduced earlier by Daniely and Shalev-Shwartz. In this work we consider list PAC learning where the goal is to output a list of $k$ predictions. List learning algorithms have been developed in several settings before and indeed, list learning played an important role in the recent characterization of multiclass learnability. In this work we ask: when is it possible to $k$-list learn a hypothesis class? We completely characterize $k$-list learnability in terms of a generalization of DS dimension that we call the $k$-DS dimension. Generalizing the recent characterization of multiclass learnability, we show that a hypothesis class is $k$-list learnable if and only if the $k$-DS dimension is finite.
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