Optimal Space Lower Bound for Deterministic Self-Stabilizing Leader Election Algorithms

Discret. Math. Theor. Comput. Sci. Pub Date : 2019-05-21 DOI:10.46298/dmtcs.9335

Lélia Blin, Laurent Feuilloley, Gabriel Le Bouder

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Abstract

Given a boolean predicate $\Pi$ on labeled networks (e.g., proper coloring, leader election, etc.), a self-stabilizing algorithm for $\Pi$ is a distributed algorithm that can start from any initial configuration of the network (i.e., every node has an arbitrary value assigned to each of its variables), and eventually converge to a configuration satisfying $\Pi$. It is known that leader election does not have a deterministic self-stabilizing algorithm using a constant-size register at each node, i.e., for some networks, some of their nodes must have registers whose sizes grow with the size $n$ of the networks. On the other hand, it is also known that leader election can be solved by a deterministic self-stabilizing algorithm using registers of $O(\log \log n)$ bits per node in any $n$-node bounded-degree network. We show that this latter space complexity is optimal. Specifically, we prove that every deterministic self-stabilizing algorithm solving leader election must use $\Omega(\log \log n)$-bit per node registers in some $n$-node networks. In addition, we show that our lower bounds go beyond leader election, and apply to all problems that cannot be solved by anonymous algorithms.

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确定性自稳定领导者选举算法的最优空间下界

给定标记网络上的布尔谓词$\Pi$(例如，适当的着色，领导者选举等)，$\Pi$的自稳定算法是一个分布式算法，可以从网络的任何初始配置开始(即，每个节点的每个变量都有一个任意值)，并最终收敛到满足$\Pi$的配置。众所周知，领导者选举不具有确定性的自稳定算法，该算法在每个节点上使用恒定大小的寄存器，即对于某些网络，它们的一些节点必须具有随着网络大小$n$而增长的寄存器。另一方面，我们也知道，在任何$n$节点有界度网络中，领导者选举可以通过使用每个节点$O(\log \log n)$位寄存器的确定性自稳定算法来解决。我们证明了这种后空间复杂度是最优的。具体地说，我们证明了在某些$n$节点网络中，每个求解领导者选举的确定性自稳定算法必须使用$\Omega(\log \logn)$ -bit / node寄存器。此外，我们证明了我们的下界超越了领导者选举，并适用于所有无法通过匿名算法解决的问题。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Discret. Math. Theor. Comput. Sci.

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