English

Query-to-Communication Lifting Using Low-Discrepancy Gadgets

Computational Complexity 2021-10-06 v4

Abstract

Lifting theorems are theorems that relate the query complexity of a function f:{0,1}n{0,1}f:\{0,1\}^{n}\to\{0,1\} to the communication complexity of the composed function fgnf \circ g^{n}, for some "gadget" g:{0,1}b×{0,1}b{0,1}g:\{0,1\}^{b}\times\{0,1\}^{b}\to\{0,1\}. Such theorems allow transferring lower bounds from query complexity to the communication complexity, and have seen numerous applications in the recent years. In addition, such theorems can be viewed as a strong generalization of a direct-sum theorem for the gadget gg. We prove a new lifting theorem that works for all gadgets gg that have logarithmic length and exponentially-small discrepancy, for both deterministic and randomized communication complexity. Thus, we significantly increase the range of gadgets for which such lifting theorems hold. Our result has two main motivations: First, allowing a larger variety of gadgets may support more applications. In particular, our work is the first to prove a randomized lifting theorem for logarithmic-size gadgets, thus improving some applications of the theorem. Second, our result can be seen as a strong generalization of a direct-sum theorem for functions with low discrepancy.

Keywords

Cite

@article{arxiv.1904.13056,
  title  = {Query-to-Communication Lifting Using Low-Discrepancy Gadgets},
  author = {Arkadev Chattopadhyay and Yuval Filmus and Sajin Koroth and Or Meir and Toniann Pitassi},
  journal= {arXiv preprint arXiv:1904.13056},
  year   = {2021}
}

Comments

This work subsumes an earlier work that appears in ICALP 2019

R2 v1 2026-06-23T08:53:00.638Z