The Polynomial Method is Universal for Distribution-Free Correlational SQ Learning
October 22, 2020 Β· Declared Dead Β· π arXiv.org
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Authors
Aravind Gollakota, Sushrut Karmalkar, Adam Klivans
arXiv ID
2010.11925
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.LG
Citations
2
Venue
arXiv.org
Last Checked
4 months ago
Abstract
We consider the problem of distribution-free learning for Boolean function classes in the PAC and agnostic models. Generalizing a beautiful work of Malach and Shalev-Shwartz (2022) that gave tight correlational SQ (CSQ) lower bounds for learning DNF formulas, we give new proofs that lower bounds on the threshold or approximate degree of any function class directly imply CSQ lower bounds for PAC or agnostic learning respectively. While such bounds implicitly follow by combining prior results by Feldman (2008, 2012) and Sherstov (2008, 2011), to our knowledge the precise statements we give had not appeared in this form before. Moreover, our proofs are simple and largely self-contained. These lower bounds match corresponding positive results using upper bounds on the threshold or approximate degree in the SQ model for PAC or agnostic learning, and in this sense these results show that the polynomial method is a universal, best-possible approach for distribution-free CSQ learning.
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