Approximating the Influence of a monotone Boolean function in O(\sqrt{n}) query complexity
Abstract
The {\em Total Influence} ({\em Average Sensitivity) of a discrete function is one of its fundamental measures. We study the problem of approximating the total influence of a monotone Boolean function \ifnum\plusminus=1 , \else , \fi which we denote by . We present a randomized algorithm that approximates the influence of such functions to within a multiplicative factor of by performing queries. % \mnote{D: say something about technique?} We also prove a lower bound of % on the query complexity of any constant-factor approximation algorithm for this problem (which holds for ), % and ), hence showing that our algorithm is almost optimal in terms of its dependence on . For general functions we give a lower bound of , which matches the complexity of a simple sampling algorithm.
Keywords
Cite
@article{arxiv.1101.5345,
title = {Approximating the Influence of a monotone Boolean function in O(\sqrt{n}) query complexity},
author = {Dana Ron and Ronitt Rubinfeld and Muli Safra and Omri Weinstein},
journal= {arXiv preprint arXiv:1101.5345},
year = {2011}
}