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@inproceedings{920569, author = {Barnat, Jiří and Bauch, Petr and Brim, Luboš and Češka, Milan}, address = {Anchorage, AK}, booktitle = {Proceedings of 25th IEEE International Parallel & Distributed Processing Symposium}, keywords = {parallel graph algorithms; strongly connected components; CUDA}, language = {eng}, location = {Anchorage, AK}, isbn = {978-1-61284-372-8}, pages = {544 - 555}, publisher = {IEEE Computer Society}, title = {Computing Strongly Connected Components in Parallel on CUDA}, url = {http://ieeexplore.ieee.org/xpls/abs_all.jsp?arnumber=6012868}, year = {2011} }
TY - JOUR ID - 920569 AU - Barnat, Jiří - Bauch, Petr - Brim, Luboš - Češka, Milan PY - 2011 TI - Computing Strongly Connected Components in Parallel on CUDA PB - IEEE Computer Society CY - Anchorage, AK SN - 9781612843728 KW - parallel graph algorithms KW - strongly connected components KW - CUDA UR - http://ieeexplore.ieee.org/xpls/abs_all.jsp?arnumber=6012868 N2 - The problem of decomposing a directed graph into its strongly connected components is a fundamental graph problem inherently present in many scientific and commercial applications. In this paper we show how some of the existing parallel algorithms can be reformulated in order to be accelerated by NVIDIA CUDA technology. In particular, we design a new CUDA-aware procedure for pivot selection and we adapt the particular parallel algorithms for CUDA accelerated computation. We also experimentally demonstrate that with a single GTX 480 GPU card we can easily outperform optimal serial CPU implementation -- by an order of magnitude in most cases, 40 times on some sufficiently big instances. This is a particularly interesting result as unlike the serial CPU case, the asymptotic complexity of the parallel algorithms is not optimal. ER -
BARNAT, Jiří, Petr BAUCH, Luboš BRIM and Milan ČEŠKA. Computing Strongly Connected Components in Parallel on CUDA. In \textit{Proceedings of 25th IEEE International Parallel \&{} Distributed Processing Symposium}. Anchorage, AK: IEEE Computer Society, 2011, p.~544 - 555. ISBN~978-1-61284-372-8.
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