Polynomial Threshold Functions for Decision Lists

Abstract

For S ⊂eq \0,1\n a Boolean function f S \-1,1\ is a polynomial threshold function (PTF) of degree d and weight W if there is a polynomial p with integer coefficients of degree d and with sum of absolute coefficients W such that f(x) = sign(p(x)) for all x ∈ S. We study a representation of decision lists as PTFs over Boolean cubes \0,1\n and over Hamming balls \0,1\n≤ k. As our first result, we show that for all d = O( ( n n)1/3) any decision list over \0,1\n can be represented by a PTF of degree d and weight 2O(n/d2). This improves the result by Klivans and Servedio [Klivans, Servedio, 2006] by a 2 d factor in the exponent of the weight. Our bound is tight for all d = O( ( n n)1/3) due to the matching lower bound by Beigel [Beigel, 1994]. For decision lists over a Hamming ball \0,1\n≤ k we show that the upper bound on weight above can be drastically improved to nO(k) for d = (k). We also show that similar improvement is not possible for smaller degrees by proving the lower bound W = 2(n/d2) for all d = O(k). abstract

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