Sur la complexit\'e de familles d'ensembles pseudo-al\'eatoires

Abstract

In this paper we are interested in the following problem. Let p be a prime number, S⊂ p and ⊂ \P∈p [X]: P d\. What is the largest integer k such that for all subsets , of p satisfying = and | |=k, there exists P∈ such that P(x)∈ S if x∈ and P(x)∈ S if x∈? This problem corresponds to the study of the complexity of some families of pseudo-random subsets. First we recall this complexity definition and the context of pseudo-random subsets. Then we state the different results we have obtained according to the shape of the sets S and considered. Some proofs are based on upper bounds for exponential sums or characters sums in finite fields, other proofs use combinatorics and additive number theory.