The Gaussian Surface Area and Noise Sensitivity of Degree-d Polynomials
Abstract
We provide asymptotically sharp bounds for the Gaussian surface area and the Gaussian noise sensitivity of polynomial threshold functions. In particular we show that if f is a degree-d polynomial threshold function, then its Gaussian sensitivity at noise rate ε is less than some quantity asymptotic to d2επ and the Gaussian surface area is at most d2π. Furthermore these bounds are asymptotically tight as ε 0 and f the threshold function of a product of d distinct homogeneous linear functions.
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