On the AC0[] complexity of Andreev's Problem

Abstract

Andreev's Problem states the following: Given an integer d and a subset of S ⊂eq Fq × Fq, is there a polynomial y = p(x) of degree at most d such that for every a ∈ Fq, (a,p(a)) ∈ S? We show an AC0[] lower bound for this problem. This problem appears to be similar to the list recovery problem for degree d-Reed-Solomon codes over Fq which states the following: Given subsets A1,…,Aq of Fq, output all (if any) the Reed-Solomon codewords contained in A1× ·s × Aq. For our purpose, we study this problem when A1, …, Aq are random subsets of a given size, which may be of independent interest.