English

Hard-to-Sample Distributions from Robust Extractors

Computational Complexity 2026-05-11 v2

Abstract

We provide a unified method for constructing explicit distributions which are difficult for restricted models of computation to generate. Our constructions are based on a new notion of robust extractors, which are extractors that remain sound even when a small number of points violate the min-entropy constraint. Using such objects, we show that for a broad range of sampling models (e.g., low-depth circuits, small-space sources, etc.), every output of the model has distance 1o(1)1 - o(1) from our target distribution, qualitatively recovering essentially all previously known hardness results. Our work extends that of Viola (SICOMP '14), who developed an earlier unified framework based on traditional extractors to rule out sampling with very small error. As a further application of our technique, we leverage a recent extractor construction of Chattopadhyay, Goodman, and Gurumukhani (ITCS '24) to present the first explicit distribution with distance 1o(1)1 - o(1) from the output of any low-degree F2\mathbb{F}_2-polynomial source. We note that a similar bound was obtained concurrently and independently by Khodabandeh and Shinkar (ECCC '26). We also describe a potential avenue toward proving a similar hardness result for AC0[]\mathsf{AC^0}[\oplus] circuits.

Keywords

Cite

@article{arxiv.2604.26179,
  title  = {Hard-to-Sample Distributions from Robust Extractors},
  author = {Farzan Byramji and Daniel M. Kane and Jackson Morris and Anthony Ostuni},
  journal= {arXiv preprint arXiv:2604.26179},
  year   = {2026}
}

Comments

v2 - added acknowledgement of concurrent work by Khodabandeh and Shinkar

R2 v1 2026-07-01T12:40:17.788Z