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ECCC
2007
2007
Testing Halfspaces
This paper addresses the problem of testing whether a Boolean-valued function f is a halfspace, i.e. a function of the form f(x) = sgn(w·x−θ). We consider halfspaces over the continuous domain Rn (endowed with the standard multivariate Gaussian distribution) as well as halfspaces over the Boolean cube {−1, 1}n (endowed with the uniform distribution). In both cases we give an algorithm that distinguishes halfspaces from functions that are ǫ-far from any halfspace using only poly(1 ǫ ) queries, independent of the dimension n. Two simple structural results about halfspaces are at the heart of our approach for the Gaussian distribution: the first gives an exact relationship between the expected value of a halfspace f and the sum of the squares of f’s degree-1 Hermite coefficients, and the second shows that any function that approximately satisfies this relationship is close to a halfspace. We prove analogous results for the Boolean cube {−1, 1}n (with Fourier coefficients ...
Real-time Traffic| Added | 13 Dec 2010 |
| Updated | 13 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | ECCC |
| Authors | Kevin Matulef, Ryan O'Donnell, Ronitt Rubinfeld, Rocco A. Servedio |
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