Constructive Relationships Between Algebraic Thickness and Normality
Abstract
We study the relationship between two measures of Boolean functions; \emph{algebraic thickness} and \emph{normality}. For a function , the algebraic thickness is a variant of the \emph{sparsity}, the number of nonzero coefficients in the unique GF(2) polynomial representing , and the normality is the largest dimension of an affine subspace on which is constant. We show that for , any function with algebraic thickness is constant on some affine subspace of dimension . Furthermore, we give an algorithm for finding such a subspace. We show that this is at most a factor of from the best guaranteed, and when restricted to the technique used, is at most a factor of from the best guaranteed. We also show that a concrete function, majority, has algebraic thickness .
Keywords
Cite
@article{arxiv.1410.1318,
title = {Constructive Relationships Between Algebraic Thickness and Normality},
author = {Joan Boyar and Magnus Gausdal Find},
journal= {arXiv preprint arXiv:1410.1318},
year = {2015}
}
Comments
Final version published in FCT'2015