Abstract
AbstractComputing the product of the (binary) adjacency matrix of a large graph with a real-valued vector is an important operation that lies at the heart of various graph analysis tasks, such as computing PageRank. In this paper, we show that some well-known webgraph and social graph compression formats are computation-friendly, in the sense that they allow boosting the computation. We focus on the compressed representations of (a) Boldi and Vigna and (b) Hernández and Navarro, and show that the product computation can be conducted in time proportional to the compressed graph size. Our experimental results show speedups of at least 2 on graphs that were compressed at least 5 times with respect to the original.
Funder
H2020 Marie Sklodowska-Curie Actions
Fundacio para a Ciencia e a Tecnologia
Academy of Finland
Natural Science and Engineering Research Council
Fondecyt
JSPS KAKENHI
AEI and Ministerio de Ciencia e Innovacion
Xunta de Galicia
ANID – Millennium Science Initiative Program
Publisher
Springer Science and Business Media LLC
Reference29 articles.
1. Newman M. Networks: An Introduction. Oxford: OUP Oxford; 2010.
2. Chung L.L.F. Complex Graphs and Networks. Conference Board of the mathematical science. American Mathematical Society, Providence, 2006.
3. Elgohary A, Boehm M, Haas PJ, Reiss FR, Reinwald B. Compressed linear algebra for declarative large-scale machine learning. Commun ACM. 2019;62(5):83–91.
4. Abboud A, Backurs A, Bringmann K, Künnemann M. Impossibility results for grammar-compressed linear algebra. In: Proc. NeurIPS, pp. 1–14, 2020.
5. Chakraborty D, Kamma L, Larsen KG. Tight cell probe bounds for succinct Boolean matrix-vector multiplication. In: Proc. STOC, pp. 1297–1306, 2018.
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