A Characterization of Constant-Sample Testable Properties
Abstract
We characterize the set of properties of Boolean-valued functions on a finite domain that are testable with a constant number of samples. Specifically, we show that a property is testable with a constant number of samples if and only if it is (essentially) a -part symmetric property for some constant , where a property is {\em -part symmetric} if there is a partition of such that whether satisfies the property is determined solely by the densities of on . We use this characterization to obtain a number of corollaries, namely: (i) A graph property is testable with a constant number of samples if and only if whether a graph satisfies is (essentially) determined by the edge density of . (ii) An affine-invariant property of functions is testable with a constant number of samples if and only if whether satisfies is (essentially) determined by the density of . (iii) For every constant , monotonicity of functions on the -dimensional hypergrid is testable with a constant number of samples.
Keywords
Cite
@article{arxiv.1612.06016,
title = {A Characterization of Constant-Sample Testable Properties},
author = {Eric Blais and Yuichi Yoshida},
journal= {arXiv preprint arXiv:1612.06016},
year = {2016}
}