A fast implementation of MLR-MCL algorithm on multi-core processors

2014 21st International Conference on High Performance Computing (HiPC) Pub Date : 2014-12-01 DOI:10.1109/HiPC.2014.7116888

Q. Niu, Pai-Wei Lai, S. M. Faisal, S. Parthasarathy, P. Sadayappan

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引用次数: 12

Abstract

Widespread use of stochastic flow based graph clustering algorithms, e.g. Markov Clustering (MCL), has been hampered by their lack of scalability and fragmentation of output. Multi-Level Regularized Markov Clustering (MLR-MCL) is an improvement over Markov Clustering (MCL), providing faster performance and better quality of clusters for large graphs. However, a closer look at MLR-MCL's performance reveals potential for further improvement. In this paper we present a fast parallel implementation of MLR-MCL algorithm via static work partitioning based on analysis of memory footprints. By parallelizing the most time consuming region of the sequential MLR-MCL algorithm, we report up to 10.43x (5.22x in average) speedup on CPU, using 8 datasets from SNAP and 3 PPI datasets. In addition, our algorithm can be adapted to perform general sparse matrix-matrix multiplication (SpGEMM), and our experimental evaluation shows up to 3.50x (1.92x in average) speedup on CPU, and up to 5.12x (2.20x in average) speedup on MIC, comparing to the SpGEMM kernel provided by Intel Math Kernel Library (MKL).

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MLR-MCL算法在多核处理器上的快速实现

广泛使用的基于随机流的图聚类算法，如马尔可夫聚类(MCL)，由于缺乏可扩展性和输出碎片化而受到阻碍。多层正则化马尔可夫聚类(MLR-MCL)是对马尔可夫聚类(MCL)的改进，为大型图提供更快的性能和更好的聚类质量。然而，仔细观察MLR-MCL的性能可以发现进一步改进的潜力。在本文中，我们提出了一种基于内存占用分析的静态工作划分的MLR-MCL算法的快速并行实现。通过并行化顺序MLR-MCL算法最耗时的区域，我们报告了CPU加速高达10.43倍(平均5.22倍)，使用来自SNAP的8个数据集和3个PPI数据集。此外，我们的算法可以适应于执行一般稀疏矩阵矩阵乘法(SpGEMM)，我们的实验评估表明，与英特尔数学内核库(MKL)提供的SpGEMM内核相比，我们的算法在CPU上的加速高达3.50倍(平均1.92倍)，在MIC上的加速高达5.12倍(平均2.20倍)。

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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2014 21st International Conference on High Performance Computing (HiPC)

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