Information-theoretic lower bounds for convex optimization with erroneous oracles

Yaron Singer; Jan Vondrak

2015 NIPS NeurIPS 2015

Information-theoretic lower bounds for convex optimization with erroneous oracles

Abstract

We consider the problem of optimizing convex and concave functions with access to an erroneous zeroth-order oracle. In particular, for a given function $x \to f(x)$ we consider optimization when one is given access to absolute error oracles that return values in [f(x) - \epsilon,f(x)+\epsilon] or relative error oracles that return value in [(1+\epsilon)f(x), (1 +\epsilon)f (x)], for some \epsilon larger than 0. We show stark information theoretic impossibility results for minimizing convex functions and maximizing concave functions over polytopes in this model.

🌉 Interdisciplinary Bridge — Machine Learning and Mathematics & Optimization

🧭 Keyword Pioneer — zeroth-order oracle

🐣 Hot Topic Early Bird — information theory

🐝 Cross-Pollinator — Artificial Intelligence, Computer Science, Computer Vision, Data Science & Analytics, Deep Learning, Healthcare & Medicine, Interdisciplinary, Knowledge & Reasoning, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning, Robotics, Security & Privacy, Speech & Audio

Authors

Yaron Singer , Jan Vondrak

Topics

Machine Learning > Optimization & Theory > Optimization Machine Learning > Optimization & Theory > Theory Mathematics & Optimization > Optimization > Continuous Optimization

Keywords

information theory convex optimization zeroth-order oracle error bound

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