On hardness of learning intersection of two halfspaces

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On hardness of learning intersection of two halfspaces

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Annual ACM Symposium on Theory of Computing archive
Proceedings of the 40th annual ACM symposium on Theory of computing table of contents

Victoria, British Columbia, Canada

SESSION: 8A table of contents

Pages 345-354

Year of Publication: 2008

ISBN:978-1-60558-047-0

Authors

Subhash Khot	NYU, New York, NY, USA
Rishi Saket	Georgia Tech, Atlanta, GA, USA

Sponsors

ACM: Association for Computing Machinery
SIGACT: ACM Special Interest Group on Algorithms and Computation Theory

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ACM New York, NY, USA

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ABSTRACT

We show that unless NP = RP, it is hard to (even) weakly PAC-learn intersection of two halfspaces in Rⁿ using a hypothesis which is a function of up to l linear threshold functions for any integer l. Specifically, we show that for every integer l and an arbitrarily small constant ε > 0, unless NP = RP, no polynomial time algorithm can distinguish whether there is an intersection of two halfspaces that correctly classifies a given set of labeled points in Rⁿ, or whether any function of l linear threshold functions can correctly classify at most 1/2+ε fraction of the points.

REFERENCES

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