English

A Strong XOR Lemma for Randomized Query Complexity

Computational Complexity 2020-07-21 v2

Abstract

We give a strong direct sum theorem for computing xorgxor \circ g. Specifically, we show that for every function g and every k2k\geq 2, the randomized query complexity of computing the xor of k instances of g satisfies R\eps(xorg)=Θ(kR\eps/k(g))\overline{R}_\eps(xor\circ g) = \Theta(k \overline{R}_{\eps/k}(g)). This matches the naive success amplification upper bound and answers a conjecture of Blais and Brody (CCC19). As a consequence of our strong direct sum theorem, we give a total function g for which R(xorg)=Θ(klog(k)R(g))R(xor \circ g) = \Theta(k \log(k)\cdot R(g)), answering an open question from Ben-David et al.(arxiv:2006.10957v1).

Keywords

Cite

@article{arxiv.2007.05580,
  title  = {A Strong XOR Lemma for Randomized Query Complexity},
  author = {Joshua Brody and Jae Tak Kim and Peem Lerdputtipongporn and Hariharan Srinivasulu},
  journal= {arXiv preprint arXiv:2007.05580},
  year   = {2020}
}

Comments

9 pages

R2 v1 2026-06-23T17:01:53.905Z