Oral Poster
Optimal Parallelization of Boosting
Arthur da Cunha · Mikael Møller Høgsgaard · Kasper Green Larsen
West Ballroom A-D #5708
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Abstract
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Oral
presentation:
Oral Session 1D: Learning Theory
Wed 11 Dec 10 a.m. PST — 11 a.m. PST
Wed 11 Dec 11 a.m. PST
— 2 p.m. PST
Wed 11 Dec 10 a.m. PST — 11 a.m. PST
Abstract:
Recent works on the parallel complexity of Boosting have established strong lower bounds on the tradeoff between the number of training rounds $p$ and the total parallel work per round $t$.These works have also presented highly non-trivial parallel algorithms that shed light on different regions of this tradeoff.Despite these advancements, a significant gap persists between the theoretical lower bounds and the performance of these algorithms across much of the tradeoff space.In this work, we essentially close this gap by providing both improved lower bounds on the parallel complexity of weak-to-strong learners, and a parallel Boosting algorithm whose performance matches these bounds across the entire $p$ vs. $t$ compromise spectrum, up to logarithmic factors.Ultimately, this work settles the parallel complexity of Boosting algorithms that are nearly sample-optimal.
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