A Competitive Algorithm for Agnostic Active Learning

Abstract

For some hypothesis classes and input distributions, active agnostic learning needs exponentially fewer samples than passive learning; for other classes and distributions, it offers little to no improvement. The most popular algorithms for agnostic active learning express their performance in terms of a parameter called the disagreement coefficient, but it is known that these algorithms are inefficient on some inputs. We take a different approach to agnostic active learning, getting an algorithm that is competitive with the optimal algorithm for any binary hypothesis class H and distribution DX over X. In particular, if any algorithm can use m* queries to get O(η) error, then our algorithm uses O(m* |H|) queries to get O(η) error. Our algorithm lies in the vein of the splitting-based approach of Dasgupta [2004], which gets a similar result for the realizable (η = 0) setting. We also show that it is NP-hard to do better than our algorithm's O( |H|) overhead in general.

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