Polynomial Threshold Functions for Decision Lists
Abstract
For a Boolean function is a polynomial threshold function (PTF) of degree and weight if there is a polynomial with integer coefficients of degree and with sum of absolute coefficients such that for all . We study a representation of decision lists as PTFs over Boolean cubes and over Hamming balls . As our first result, we show that for all any decision list over can be represented by a PTF of degree and weight . This improves the result by Klivans and Servedio [Klivans, Servedio, 2006] by a factor in the exponent of the weight. Our bound is tight for all due to the matching lower bound by Beigel [Beigel, 1994]. For decision lists over a Hamming ball we show that the upper bound on weight above can be drastically improved to for . We also show that similar improvement is not possible for smaller degrees by proving the lower bound for all . \end{abstract}
Cite
@article{arxiv.2207.09371,
title = {Polynomial Threshold Functions for Decision Lists},
author = {Vladimir Podolskii and Nikolay V. Proskurin},
journal= {arXiv preprint arXiv:2207.09371},
year = {2022}
}
Comments
14 pages in total (11 for article + 3 for references and appendix)