On the Sensitivity Conjecture for Disjunctive Normal Forms
Abstract
The sensitivity conjecture of Nisan and Szegedy [CC '94] asks whether for any Boolean function , the maximum sensitivity , is polynomially related to its block sensitivity , and hence to other major complexity measures. Despite major advances in the analysis of Boolean functions over the last decade, the problem remains widely open. In this paper, we consider a restriction on the class of Boolean functions through a model of computation (DNF), and refer to the functions adhering to this restriction as admitting the Normalized Block property. We prove that for any function admitting the Normalized Block property, . We note that (almost) all the functions mentioned in literature that achieve a quadratic separation between sensitivity and block sensitivity admit the Normalized Block property. Recently, Gopalan et al. [ITCS '16] showed that every Boolean function is uniquely specified by its values on a Hamming ball of radius at most . We extend this result and also construct examples of Boolean functions which provide the matching lower bounds.
Keywords
Cite
@article{arxiv.1607.05189,
title = {On the Sensitivity Conjecture for Disjunctive Normal Forms},
author = {Karthik C. S. and Sébastien Tavenas},
journal= {arXiv preprint arXiv:1607.05189},
year = {2016}
}