Explicit Rank Extractors and Subspace Designs via Function Fields, with Applications to Strong Blocking Sets

TL;DR

This paper presents new explicit constructions of rank extractors, subspace designs, and blocking sets over finite fields, especially in the small-field regime, with applications to pseudorandomness and combinatorics.

Contribution

It introduces the first explicit constructions of lossless rank extractors and weak subspace designs for small ranks over finite fields, improving bounds for strong blocking sets.

Findings

Constructed lossless rank extractors for r << k over large finite fields.

Developed explicit strong s-blocking sets matching non-explicit bounds.

Combined algebraic and Fourier-analytic techniques for improved constructions.

Abstract

We give new explicit constructions of several fundamental objects in linear-algebraic pseudorandomness and combinatorics, including lossless rank extractors, weak subspace designs, and strong $s$-blocking sets over finite fields. Our focus is on the small-field regime, where the field size depends only on a secondary parameter (such as the rank or codimension) and is independent of the ambient dimension. This regime is central to several applications, yet remains poorly understood from the perspective of explicit constructions. In this setting, we obtain the first explicit constructions of lossless rank extractors and weak subspace designs for $r\ll k$, where $r$ denotes the rank (or codimension), over finite fields $\mathbb{F}_q$ with $q \ge \mathrm{poly}(r)$ and $q$ non-prime, with near-optimal parameters. For other finite fields, including prime fields and small fields, we obtain weaker but still improved bounds. As a consequence, we construct explicit strong $s$-blocking sets in $\mathrm{PG}(k-1,q)$ of size $O(s(k-s)q^s)$ for all sufficiently large non-prime fields $q \ge \mathrm{poly}(s)$, matching the best known non-explicit bounds up to constant factors. This significantly improves the previous best bound $2^{O(s^2 \log s)} q^s k$ of Bishnoi and Tomon (Combinatorica, 2026), which requires $q \ge 2^{\Omega(s)}$. Our approach is primarily algebraic, combining techniques from function fields and polynomial identity testing. In addition, we develop a complementary Fourier-analytic framework based on $\varepsilon$-biased sets, which yields improved explicit constructions of strong $s$-blocking sets over small fields.