Learning symmetric k-juntas in time no(k)

Abstract

We give an algorithm for learning symmetric k-juntas (boolean functions of n boolean variables which depend only on an unknown set of k of these variables) in the PAC model under the uniform distribution, which runs in time nO(k/ k). Our bound is obtained by proving the following result: Every symmetric boolean function on k variables, except for the parity and the constant functions, has a non-zero Fourier coefficient of order at least 1 and at most O(k/ k). This improves the previously best known bound of (3/31)k, and provides the first no(k) time algorithm for learning symmetric juntas.

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