English

New Lower Bounds for Adaptive Tolerant Junta Testing

Data Structures and Algorithms 2023-04-24 v1

Abstract

We prove a kΩ(log(ε2ε1))k^{-\Omega(\log(\varepsilon_2 - \varepsilon_1))} lower bound for adaptively testing whether a Boolean function is ε1\varepsilon_1-close to or ε2\varepsilon_2-far from kk-juntas. Our results provide the first superpolynomial separation between tolerant and non-tolerant testing for a natural property of boolean functions under the adaptive setting. Furthermore, our techniques generalize to show that adaptively testing whether a function is ε1\varepsilon_1-close to a kk-junta or ε2\varepsilon_2-far from (k+o(k))(k + o(k))-juntas cannot be done with poly(k,(ε2ε1)1)\textsf{poly} (k, (\varepsilon_2 - \varepsilon_1)^{-1}) queries. This is in contrast to an algorithm by Iyer, Tal and Whitmeyer [CCC 2021] which uses poly(k,(ε2ε1)1)\textsf{poly} (k, (\varepsilon_2 - \varepsilon_1)^{-1}) queries to test whether a function is ε1\varepsilon_1-close to a kk-junta or ε2\varepsilon_2-far from O(k/(ε2ε1)2)O(k/(\varepsilon_2-\varepsilon_1)^2)-juntas.

Keywords

Cite

@article{arxiv.2304.10647,
  title  = {New Lower Bounds for Adaptive Tolerant Junta Testing},
  author = {Xi Chen and Shyamal Patel},
  journal= {arXiv preprint arXiv:2304.10647},
  year   = {2023}
}

Comments

22 pages

R2 v1 2026-06-28T10:13:07.546Z