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arxiv: 1407.5144 · v3 · pith:QRKCVO6D · submitted 2014-07-19 · math.OC · cs.CC· cs.IT· math.IT

Lower Bounds on the Oracle Complexity of Nonsmooth Convex Optimization via Information Theory

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classification math.OC cs.CCcs.ITmath.IT
keywords complexityoracleboundslowerdistributionalworst-casebounded-errorconvex
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We present an information-theoretic approach to lower bound the oracle complexity of nonsmooth black box convex optimization, unifying previous lower bounding techniques by identifying a combinatorial problem, namely string guessing, as a single source of hardness. As a measure of complexity we use distributional oracle complexity, which subsumes randomized oracle complexity as well as worst-case oracle complexity. We obtain strong lower bounds on distributional oracle complexity for the box $[-1,1]^n$, as well as for the $L^p$-ball for $p \geq 1$ (for both low-scale and large-scale regimes), matching worst-case upper bounds, and hence we close the gap between distributional complexity, and in particular, randomized complexity, and worst-case complexity. Furthermore, the bounds remain essentially the same for high-probability and bounded-error oracle complexity, and even for combination of the two, i.e., bounded-error high-probability oracle complexity. This considerably extends the applicability of known bounds.

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