A Self-Stabilizing General De Bruijn Graph

Abstract

Searching for other participants is one of the most important operations in a distributed system. We are interested in topologies in which it is possible to route a packet in a fixed number of hops until it arrives at its destination. Given a constant d, this paper introduces a new self-stabilizing protocol for the q-ary d-dimensional de Bruijn graph (q = [d]n) that is able to route any search request in at most d hops w.h.p., while significantly lowering the node degree compared to the clique: We require nodes to have a degree of O([d]n), which is asymptotically optimal for a fixed diameter d. The protocol keeps the expected amount of edge redirections per node in O([d]n), when the number of nodes in the system increases by factor 2d. The number of messages that are periodically sent out by nodes is constant.