幂律图的可伸缩距离-1顶点着色算法

Proceedings of the 23rd ACM SIGPLAN Symposium on Principles and Practice of Parallel Programming Pub Date : 2018-02-10 DOI:10.1145/3178487.3178521

J. Firoz, Marcin Zalewski, A. Lumsdaine

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引用次数: 1

摘要

我们提出了一种分布式、无序、标签校正距离为1的顶点着色算法，称为分布式控制(DC)着色算法。DC消除了以顶点为中心的屏障和全局同步进行颜色优化的需要，只依赖于原子操作和本地终止检测来更新顶点颜色。我们在am++ AMT运行时中实现了我们的DC着色算法和著名的Jones-Plassmann算法，并比较了它们的性能。我们表明，在运行时支持下，消除以顶点为中心的障碍的等待时间，并将这些时间用于局部排序，可以为具有密集局部子图的幂律图提供更好的执行时间。

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A scalable distance-1 vertex coloring algorithm for power-law graphs

We propose a distributed, unordered, label-correcting distance-1 vertex coloring algorithm, called Distributed Control (DC) coloring algorithm. DC eliminates the need for vertex-centric barriers and global synchronization for color refinement, relying only on atomic operations and local termination detection to update vertex color. We implement our DC coloring algorithm and the well-known Jones-Plassmann algorithm in the AM++ AMT runtime and compare their performance. We show that, with runtime support, the elimination of waiting time of vertex-centric barriers and investing this time for local ordering results in better execution time for power-law graphs with dense local subgraphs.

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Proceedings of the 23rd ACM SIGPLAN Symposium on Principles and Practice of Parallel Programming

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