低空间大规模并行计算中的组件稳定性

IF 1.3 4区 计算机科学 Q3 COMPUTER SCIENCE, THEORY & METHODS
Artur Czumaj, Peter Davies-Peck, Merav Parter
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引用次数: 0

摘要

本文将研究大规模并行计算(MPC)低空间模型中组件稳定算法的威力和局限性。最近,Ghaffari、Kuhn 和 Uitto(FOCS 2019)提出了一类组件稳定的低空间 MPC 算法,非正式地说,这些算法要求不同连接组件中的节点报告的输出是独立的。引入这一非常自然的概念,可以捕捉到迄今为止已知的大多数(如果不是全部)高效 MPC 算法,而且这是第一类可以证明非难条件下界的 MPC 算法。在本文中,我们增强了组件稳定算法的框架,并研究了它对随机和确定性低空间 MPC 复杂性的影响。我们的主要贡献包括1.我们修改并正式确定了 Ghaffari、Kuhn 和 Uitto 的提升方法。这需要对组件稳定性的概念进行非常微妙的修正,从而使我们能够填补早期论证中的空白。2.2. 我们还扩展了框架,以获得确定性算法的条件下界和取决于最大度 \(\Delta \)的细粒度下界。3.我们展示了一系列自然图问题,对于这些问题,确定性成分不稳定算法打破了成分稳定算法的条件下界。这意味着,在确定性算法中,成分稳定算法在条件上弱于成分不稳定算法。4.4. 我们还证明,对组件稳定算法的限制对随机化环境也有影响。我们提出了一个自然问题,该问题可以用组件不稳定的 MPC 算法在 O(1) 轮内解决,但对于任何组件稳定的算法,在连通性猜想的条件下,需要 \(ω (\log \log ^* n)\) 轮。总之,我们的结果意味着,至少在某些情况下,组件稳定性可能会限制低空间 MPC 模型的计算能力,从而为摆脱加法里、库恩和乌伊托的条件下限设置的改进上界铺平了道路。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Component stability in low-space massively parallel computation

Component stability in low-space massively parallel computation

In this paper, we study the power and limitations of component-stable algorithms in the low-space model of massively parallel computation (MPC). Recently Ghaffari, Kuhn and Uitto (FOCS 2019) introduced the class of component-stable low-space MPC algorithms, which are, informally, those algorithms for which the outputs reported by the nodes in different connected components are required to be independent. This very natural notion was introduced to capture most (if not all) of the known efficient MPC algorithms to date, and it was the first general class of MPC algorithms for which one can show non-trivial conditional lower bounds. In this paper we enhance the framework of component-stable algorithms and investigate its effect on the complexity of randomized and deterministic low-space MPC. Our key contributions include: 1. We revise and formalize the lifting approach of Ghaffari, Kuhn and Uitto. This requires a very delicate amendment of the notion of component stability, which allows us to fill in gaps in the earlier arguments. 2. We also extend the framework to obtain conditional lower bounds for deterministic algorithms and fine-grained lower bounds that depend on the maximum degree \(\Delta \). 3. We demonstrate a collection of natural graph problems for which deterministic component-unstable algorithms break the conditional lower bound obtained for component-stable algorithms. This implies that, in the context of deterministic algorithms, component-stable algorithms are conditionally weaker than the component-unstable ones. 4. We also show that the restriction to component-stable algorithms has an impact in the randomized setting. We present a natural problem which can be solved in O(1) rounds by a component-unstable MPC algorithm, but requires \(\Omega (\log \log ^* n)\) rounds for any component-stable algorithm, conditioned on the connectivity conjecture. Altogether our results imply that component-stability might limit the computational power of the low-space MPC model, at least in certain contexts, paving the way for improved upper bounds that escape the conditional lower bound setting of Ghaffari, Kuhn, and Uitto.

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来源期刊
Distributed Computing
Distributed Computing 工程技术-计算机:理论方法
CiteScore
3.20
自引率
0.00%
发文量
24
审稿时长
>12 weeks
期刊介绍: The international journal Distributed Computing provides a forum for original and significant contributions to the theory, design, specification and implementation of distributed systems. Topics covered by the journal include but are not limited to: design and analysis of distributed algorithms; multiprocessor and multi-core architectures and algorithms; synchronization protocols and concurrent programming; distributed operating systems and middleware; fault-tolerance, reliability and availability; architectures and protocols for communication networks and peer-to-peer systems; security in distributed computing, cryptographic protocols; mobile, sensor, and ad hoc networks; internet applications; concurrency theory; specification, semantics, verification, and testing of distributed systems. In general, only original papers will be considered. By virtue of submitting a manuscript to the journal, the authors attest that it has not been published or submitted simultaneously for publication elsewhere. However, papers previously presented in conference proceedings may be submitted in enhanced form. If a paper has appeared previously, in any form, the authors must clearly indicate this and provide an account of the differences between the previously appeared form and the submission.
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