JF 2013 IEEE International Symposium on Parallel & Distributed Processing, Workshops and Phd Forum

YR 2011

VO 00

IS

SP 1488

TI Solving k-Set Agreement with Stable Skeleton Graphs

A1 Peter Robinson,

A1 Ulrich Schmid,

A1 Martin Biely,

K1

AB In this paper we consider the k-set agreement problem in distributed message-passing systems using a round-based approach: Both synchrony of communication and failures are captured just by means of the messages that arrive within a round, resulting in round-by-round communication graphs that can be characterized by simple communication predicates. We introduce the weak communication predicate PSources(k) and show that it is tight for k-set agreement, in the following sense: We (i) prove that there is no algorithm for solving (k-1)-set agreement in systems characterized by PSources(k), and (ii) present a novel distributed algorithm that achieves k-set agreement in runs where PSources(k) holds. Our algorithm uses local approximations of the stable skeleton graph, which reflects the underlying perpetual synchrony of a run. We prove that this approximation is correct in all runs, regardless of the communication predicate, and show that graph-theoretic properties of the stable skeleton graph can be used to solve $k$-set agreement if PSources(k) holds.

PB IEEE Computer Society, [URL:http://www.computer.org]

SN 1530-2075

LA English

DO 10.1109/IPDPS.2011.301

LK http://doi.ieeecomputersociety.org/10.1109/IPDPS.2011.301