An Improved Construction of Variety-Evasive Subspace Families

Abstract

We study the question of explicitly constructing variety-evasive subspace families, a pseudorandom primitive introduced by Guo (Computational Complexity 2024) that generalizes both hitting sets and lossless rank condensers. Roughly speaking, a variety-evasive subspace family H is a collection of subspaces such that for every algebraic variety V in a fixed family F, there is some subspace W ∈ H that is in general position with respect to V. We give an explicit construction of a subspace families that evade all degree-d varieties in an n-dimensional affine or projective space. Our construction improves on the size of the variety-evasive subspace families constructed by Guo and, for varieties of degree n1 + (1), comes within a polynomial factor of Guo's lower bound on the size of any such variety-evasive subspace family. Our variety-evasive subspace families rely on an improved construction of hitting sets for Chow forms of algebraic varieties.