On Polynomial Approximations to ${AC}^0$
Abstract
We make progress on some questions related to polynomial approximations of . It is known, by works of Tarui (Theoret. Comput. Sci. 1993) and Beigel, Reingold, and Spielman (Proc. th CCC, 1991), that any circuit of size and depth has an -error probabilistic polynomial over the reals of degree . We improve this upper bound to , which is much better for small values of . We give an application of this result by using it to resolve a question posed by Tal (ECCC 2014): we show that -wise independence fools , improving on Tal's strengthening of Braverman's theorem (J. ACM, 2010) that -wise independence fools . Up to the constant implicit in the , our result is tight. As far as we know, this is the first PRG construction for that achieves optimal dependence on the error . We also prove lower bounds on the best polynomial approximations to . We show that any polynomial approximating the function on bits to a small constant error must have degree at least . This result improves exponentially on a recent lower bound demonstrated by Meka, Nguyen, and Vu (arXiv 2015).
Cite
@article{arxiv.1604.08121,
title = {On Polynomial Approximations to ${AC}^0$},
author = {Prahladh Harsha and Srikanth Srinivasan},
journal= {arXiv preprint arXiv:1604.08121},
year = {2020}
}