On Communication Complexity of Fixed Point Computation
Abstract
Brouwer's fixed point theorem states that any continuous function from a compact convex space to itself has a fixed point. Roughgarden and Weinstein (FOCS 2016) initiated the study of fixed point computation in the two-player communication model, where each player gets a function from to , and their goal is to find an approximate fixed point of the composition of the two functions. They left it as an open question to show a lower bound of for the (randomized) communication complexity of this problem, in the range of parameters which make it a total search problem. We answer this question affirmatively. Additionally, we introduce two natural fixed point problems in the two-player communication model. Each player is given a function from to , and their goal is to find an approximate fixed point of the concatenation of the functions. Each player is given a function from to , and their goal is to find an approximate fixed point of the interpolation of the functions. We show a randomized communication complexity lower bound of for these problems (for some constant approximation factor). Finally, we initiate the study of finding a panchromatic simplex in a Sperner-coloring of a triangulation (guaranteed by Sperner's lemma) in the two-player communication model: A triangulation of the -simplex is publicly known and one player is given a set and a coloring function from to , and the other player is given a set and a coloring function from to , such that , and their goal is to find a panchromatic simplex. We show a randomized communication complexity lower bound of for the aforementioned problem as well (when is large).
Keywords
Cite
@article{arxiv.1909.10958,
title = {On Communication Complexity of Fixed Point Computation},
author = {Anat Ganor and Karthik C. S. and Dömötör Pálvölgyi},
journal= {arXiv preprint arXiv:1909.10958},
year = {2022}
}