Learning intersections and thresholds of halfspaces

Author

Klivans, A.R. ; O´Donnell, Ryan ; Servedio, Rocco A.

Author_Institution

Dept. of Math., MIT, Cambridge, MA, USA

fYear

2002

fDate

19-19 Nov. 2002

Firstpage

177

Lastpage

186

Abstract

We give the first polynomial time algorithm to learn any function of a constant number of halfspaces under the uniform distribution to within any constant error parameter. We also give the first quasipolynomial time algorithm for learning any function of a polylog number of polynomial-weight halfspaces under any distribution. As special cases of these results we obtain algorithms for learning intersections and thresholds of halfspaces. Our uniform distribution learning algorithms involve a novel non-geometric approach to learning halfspaces; we use Fourier techniques together with a careful analysis of the noise sensitivity of functions of halfspaces. Our algorithms for learning under any distribution use techniques from real approximation theory to construct low degree polynomial threshold functions.

Keywords

Boolean functions; Fourier analysis; computational complexity; learning (artificial intelligence); Fourier techniques; constant error parameter; low degree polynomial threshold functions; noise sensitivity; polylog number; polynomial time algorithm; polynomial-weight halfspaces; quasipolynomial time algorithm; uniform distribution learning algorithms; Algorithm design and analysis; Approximation algorithms; Approximation methods; Boolean functions; Computer science; Machine learning; Machine learning algorithms; Mathematics; Polynomials; Probability distribution;

fLanguage

English

Publisher

ieee

Conference_Titel

Foundations of Computer Science, 2002. Proceedings. The 43rd Annual IEEE Symposium on

Conference_Location

Vancouver, BC

ISSN

0272-5428

Print_ISBN

0-7695-1822-2

Type

conf

DOI

10.1109/SFCS.2002.1181894

Filename

1181894