Lenzen’s Distributed Routing Generalized: A Full Characterization of Constant-Time Routability

Author(s)

Ghaffari, Mohsen; Wang, Brandon

Abstract

A celebrated and widely used result of Lenzen and Wattenhofer [STOC’11, PODC’13] shows a constant-round (deterministic) distributed routing algorithm for the complete-graph network: if each node is the source or destination of at most Θ() packets, there is a constant-round deterministic distributed algorithm that routes all packets to their destinations in a constant number of rounds, on the complete-graph network. We study generalizations of this result to arbitrary network graphs and show a necessary and su cient condition for the network so that it can route any such demand in constant rounds distributedly. One can easily see that just for the existence of a constant-round routing for all such demands, it is necessary that any cut’s size, when normalized by the number of possible edges in that cut, should be lower bounded by a positive constant. That is, for any partition of nodes with exactly ∈ [1, /2] nodes on one side, the cut should have at least Θ() edges. We call this a graph with a positive minimum normalized cut, or a positive graph for short. We show that this necessary condition is also su cient. In particular, by tightening the Leighton-Rao multicommodity max- ow min-cut theorem for positive graphs, we show the existence of a constant-round routing in positive graphs (assuming the network graph is known globally). Then, as the main technical contribution of this paper, we also show that there is a (deterministic) distributed algorithm that computes such a constant-round routing in constant rounds in these graphs. This result allows us to vastly relax the conditions of the well-studied congested clique model of distributed computing: Any distributed algorithm for the congested clique model can be run in any positive graph network, without any asymptotic slow-down. Our results are in fact more general and they give a distributed routing bound for any network, as a function of its minimum normalized cut size (and without assuming it is a constant), within a polynomial of the relevant lower bound.

Description

STOC ’24, June 24–28, 2024, Vancouver, BC, Canada

Date issued

2024-06-10

URI

https://hdl.handle.net/1721.1/155710

Department

Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science

Publisher

ACM|Proceedings of the 56th Annual ACM Symposium on Theory of Computing

Citation

Ghaffari, Mohsen and Wang, Brandon. 2024. "Lenzen’s Distributed Routing Generalized: A Full Characterization of Constant-Time Routability."

Version: Final published version

ISBN

979-8-4007-0383-6