English

Explicit Directional Affine Extractors and Improved Hardness for Linear Branching Programs

Computational Complexity 2024-07-04 v2 Combinatorics

Abstract

In a recent work, Gryaznov, Pudl\'{a}k, and Talebanfard (CCC' 22) introduced a stronger version of affine extractors known as directional affine extractors, together with a generalization of ROBP\mathsf{ROBP}s where each node can make linear queries, and showed that the former implies strong lower bound for a certain type of the latter known as strongly read-once linear branching programs (SROLBP\mathsf{SROLBP}s). Their main result gives explicit constructions of directional affine extractors for entropy k>2n/3k > 2n/3, which implies average-case complexity 2n/3o(n)2^{n/3-o(n)} against SROLBP\mathsf{SROLBP}s with exponentially small correlation. A follow-up work by Chattopadhyay and Liao (ECCC' 22) improves the hardness to 2no(n)2^{n-o(n)} at the price of increasing the correlation to polynomially large. In this paper we show: An explicit construction of directional affine extractors with k=o(n)k=o(n) and exponentially small error, which gives average-case complexity 2no(n)2^{n-o(n)} against SROLBP\mathsf{SROLBP}s with exponentially small correlation, thus answering the two open questions raised in previous works. An explicit function in AC0\mathsf{AC}^0 that gives average-case complexity 2(1δ)n2^{(1-\delta)n} against ROBP\mathsf{ROBP}s with negligible correlation, for any constant δ>0\delta>0. Previously, no such average-case hardness is known, and the best size lower bound for any function in AC0\mathsf{AC}^0 against ROBP\mathsf{ROBP}s is 2Ω(n)2^{\Omega(n)}. One of the key ingredients in our constructions is a new linear somewhere condenser for affine sources, which is based on dimension expanders. The condenser also leads to an unconditional improvement of the entropy requirement of explicit affine extractors with negligible error. We further show that the condenser also works for general weak random sources, under the Polynomial Freiman-Ruzsa Theorem in F2n\mathsf{F}_2^n.

Cite

@article{arxiv.2304.11495,
  title  = {Explicit Directional Affine Extractors and Improved Hardness for Linear Branching Programs},
  author = {Xin Li and Yan Zhong},
  journal= {arXiv preprint arXiv:2304.11495},
  year   = {2024}
}
R2 v1 2026-06-28T10:14:41.173Z