Minimizing Message Size in Stochastic Communication Patterns: Fast Self-Stabilizing Protocols with 3 bits

Abstract : This paper considers the basic $\mathcal{PULL}$ model of communication, in which in each round, each agent extracts information from few randomly chosen agents. We seek to identify the smallest amount of information revealed in each interaction (message size) that nevertheless allows for efficient and robust computations of fundamental information dissemination tasks. We focus on the Majority Bit Dissemination problem that considers a population of $n$ agents, with a designated subset of source agents. Each source agent holds an input bit and each agent holds an output bit. The goal is to let all agents converge their output bits on the most frequent input bit of the sources (the majority bit). Note that the particular case of a single source agent corresponds to the classical problem of Broadcast. We concentrate on the severe fault-tolerant context of self-stabilization, in which a correct configuration must be reached eventually, despite all agents starting the execution with arbitrary initial states. We first design a general compiler which can essentially transform any self-stabilizing algorithm with a certain property that uses $\ell$-bits messages to one that uses only $\log \ell$-bits messages, while paying only a small penalty in the running time. By applying this compiler recursively we then obtain a self-stabilizing Clock Synchronization protocol, in which agents synchronize their clocks modulo some given integer $T$, within $\tilde O(\log n\log T)$ rounds w.h.p., and using messages that contain $3$ bits only. We then employ the new Clock Synchronization tool to obtain a self-stabilizing Majority Bit Dissemination protocol which converges in $\tilde O(\log n)$ time, w.h.p., on every initial configuration, provided that the ratio of sources supporting the minority opinion is bounded away from half. Moreover, this protocol also uses only 3 bits per interaction.
Type de document :
Communication dans un congrès
ACM-SIAM Symposium on Discrete Algorithms (SODA17), Jan 2017, Barcelona, Spain
Liste complète des métadonnées

https://hal.inria.fr/hal-01447435
Contributeur : Amos Korman <>
Soumis le : jeudi 26 janvier 2017 - 19:38:21
Dernière modification le : jeudi 26 avril 2018 - 10:28:01

Lien texte intégral

Identifiants

  • HAL Id : hal-01447435, version 1
  • ARXIV : 1602.04419

Collections

Citation

Lucas Boczkowski, Amos Korman, Emanuele Natale. Minimizing Message Size in Stochastic Communication Patterns: Fast Self-Stabilizing Protocols with 3 bits. ACM-SIAM Symposium on Discrete Algorithms (SODA17), Jan 2017, Barcelona, Spain. 〈hal-01447435〉

Partager

Métriques

Consultations de la notice

279