An optimal lower bound for monotonicity testing over hypergrids
Data Structures and Algorithms
2013-04-22 v1 Discrete Mathematics
Abstract
For positive integers , consider the hypergrid with the coordinate-wise product partial ordering denoted by . A function is monotone if , . A function is -far from monotone if at least an -fraction of values must be changed to make monotone. Given a parameter , a \emph{monotonicity tester} must distinguish with high probability a monotone function from one that is -far. We prove that any (adaptive, two-sided) monotonicity tester for functions must make queries. Recent upper bounds show the existence of query monotonicity testers for hypergrids. This closes the question of monotonicity testing for hypergrids over arbitrary ranges. The previous best lower bound for general hypergrids was a non-adaptive bound of .
Keywords
Cite
@article{arxiv.1304.5264,
title = {An optimal lower bound for monotonicity testing over hypergrids},
author = {Deeparnab Chakrabarty and C. Seshadhri},
journal= {arXiv preprint arXiv:1304.5264},
year = {2013}
}