On Sampling Lower Bounds for Polynomials
Abstract
In this work, we continue the line of research on the complexity of distributions (Viola, Journal of Computing 2012), and study samplers defined by low degree polynomials. An -tuple of functions defines a distribution over in the natural way: draw uniformly at random from and output . We show that when is defined by polynomials of degree , the total variation distance of from the product distribution is , where is a vanishing function of for any constant degree . For small values of , we show the following concrete bounds. (i) For we have . (ii) For we have . (iii) For we have . Our results extend the recent lower bound results for sampling distributions, which have mostly focused on local samplers, small depth decision trees, and small depth circuits. As part of our proof, we establish the following result, that may be of independent interest: for any degree- polynomial it holds that is bounded away from by some absolute constant . Although the statement may seem obvious, we are not aware of an elementary proof of this. The proof techniques rely on the structural results for low degree polynomials, saying that any biased polynomial of degree can be written as a function of a small number of polynomials of degree .
Cite
@article{arxiv.2605.00995,
title = {On Sampling Lower Bounds for Polynomials},
author = {Mohammad Mahdi Khodabandeh and Igor Shinkar},
journal= {arXiv preprint arXiv:2605.00995},
year = {2026}
}