English

A Composition Theorem via Conflict Complexity

Computational Complexity 2018-01-11 v1

Abstract

Let R()\R(\cdot) stand for the bounded-error randomized query complexity. We show that for any relation f{0,1}n×Sf \subseteq \{0,1\}^n \times \mathcal{S} and partial Boolean function g{0,1}n×{0,1}g \subseteq \{0,1\}^n \times \{0,1\}, R1/3(fgn)=Ω(R4/9(f)R1/3(g))\R_{1/3}(f \circ g^n) = \Omega(\R_{4/9}(f) \cdot \sqrt{\R_{1/3}(g)}). Independently of us, Gavinsky, Lee and Santha \cite{newcomp} proved this result. By an example demonstrated in their work, this bound is optimal. We prove our result by introducing a novel complexity measure called the \emph{conflict complexity} of a partial Boolean function gg, denoted by χ(g)\chi(g), which may be of independent interest. We show that χ(g)=Ω(R(g))\chi(g) = \Omega(\sqrt{\R(g)}) and R(fgn)=Ω(R(f)χ(g))\R(f \circ g^n) = \Omega(\R(f) \cdot \chi(g)).

Keywords

Cite

@article{arxiv.1801.03285,
  title  = {A Composition Theorem via Conflict Complexity},
  author = {Swagato Sanyal},
  journal= {arXiv preprint arXiv:1801.03285},
  year   = {2018}
}
R2 v1 2026-06-22T23:41:23.244Z