Sampling and Certifying Symmetric Functions

Abstract

A circuit C samples a distribution X with an error ε if the statistical distance between the output of C on the uniform input and X is ε. We study the hardness of sampling a uniform distribution over the set of n-bit strings of Hamming weight k denoted by Unk for decision forests, i.e. every output bit is computed as a decision tree of the inputs. For every k there is an O( n)-depth decision forest sampling Unk with an inverse-polynomial error [Viola 2012, Czumaj 2015]. We show that for every ε > 0 there exists τ such that for decision depth τ (n/k) / (n/k), the error for sampling Ukn is at least 1-ε. Our result is based on the recent robust sunflower lemma [Alweiss, Lovett, Wu, Zhang 2021, Rao 2019]. Our second result is about matching a set of n-bit strings with the image of a d-local circuit, i.e. such that each output bit depends on at most d input bits. We study the set of all n-bit strings whose Hamming weight is at least n/2. We improve the previously known locality lower bound from (* n) [Beyersdorff, Datta, Krebs, Mahajan, Scharfenberger-Fabian, Sreenivasaiah, Thomas and Vollmer, 2013] to ( n), leaving only a quartic gap from the best upper bound of O(2 n).