English

An XOR Lemma for Deterministic Communication Complexity

Computational Complexity 2024-07-03 v1

Abstract

We prove a lower bound on the communication complexity of computing the nn-fold xor of an arbitrary function ff, in terms of the communication complexity and rank of ff. We prove that D(fn)n(Ω(D(f))logrk(f)logrk(f))D(f^{\oplus n}) \geq n \cdot \Big(\frac{\Omega(D(f))}{\log \mathsf{rk}(f)} -\log \mathsf{rk}(f)\Big ), where here D(f),D(fn)D(f), D(f^{\oplus n}) represent the deterministic communication complexity, and rk(f)\mathsf{rk}(f) is the rank of ff. Our methods involve a new way to use information theory to reason about deterministic communication complexity.

Cite

@article{arxiv.2407.01802,
  title  = {An XOR Lemma for Deterministic Communication Complexity},
  author = {Siddharth Iyer and Anup Rao},
  journal= {arXiv preprint arXiv:2407.01802},
  year   = {2024}
}
R2 v1 2026-06-28T17:25:46.353Z