Communication Complexity of Approximate Matching in Distributed Graphs
- Zengfeng Huang ,
- Bozidar Radunovic ,
- Milan Vojnović ,
- Qin Zhang
STACS |
In this paper we consider the communication complexity of approximation algorithms for max-
imum matching in a graph in the message-passing model of distributed computation. The input
graph consists of n vertices and edges partitioned over a set of k sites. The output is an α – approximate maximum matching in the input graph which has to be reported by one of the sites.
We show a lower bound on the communication complexity of Ω(α^2 kn) and show that it is tight
up to poly-logarithmic factors. This lower bound also applies to other combinatorial problems on
graphs in the message-passing computation model, including max-flow and graph sparsification.