Abstract
Minimum spanning tree (MST) is one of the most studied combinatorial problems with practical applications in VLSI layout, wireless communication, and distributed networks, recent problems in biology and medicine such as cancer detection, medical imaging, and proteomics, and national security and bioterrorism such as detecting the spread of toxins through populations in the case of biological/chemical warfare. Most of the previous attempts for improving the speed of MST using parallel computing are too complicated to implement or perform well only on special graphs with regular structure. In this paper we design and implement four parallel MST algorithms (three variations of Borůvka plus our new approach) for arbitrary sparse graphs that for the first time give speedup when compared with the best sequential algorithm. In fact, our algorithms also solve the minimum spanning forest problem. We provide an experimental study of our algorithms on symmetric multiprocessors such as IBMs pSeries and Sun's Enterprise servers. Our new implementation achieves good speedups over a wide range of input graphs with regular and irregular structures, including the graphs used by previous parallel MST studies. For example, on an arbitrary random graph with 1 M vertices and 20 M edges, our new approach achieves a speedup of 5 using 8 processors. The source code for these algorithms is freely available from our web site.
Original language | English |
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Pages (from-to) | 1366-1378 |
Number of pages | 13 |
Journal | Journal of Parallel and Distributed Computing |
Volume | 66 |
Issue number | 11 |
DOIs | |
State | Published - Nov 2006 |
Externally published | Yes |
Funding
∗Corresponding author. E-mail addresses: [email protected] (D.A. Bader), [email protected] (G. Cong). 1This work was supported in part by NSF Grants CAREER CCF-0611589, CNS 0614915, ACI-00-93039, NSF DBI-0420513, ITR ACI-00-81404, DEB-99-10123, ITR EIA-01-21377, Biocomplexity DEB-01-20709, and ITR EF/BIO 03-31654; and DARPA Contract NBCH30390004.
Funders | Funder number |
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National Science Foundation | CCF-0611589, CNS 0614915, ACI-00-93039, ITR EIA-01-21377, DBI-0420513, DEB-99-10123, DEB-01-20709, ITR ACI-00-81404, ITR EF/BIO 03-31654 |
Defense Advanced Research Projects Agency | NBCH30390004 |
Keywords
- Connectivity
- High-performance algorithm engineering
- Parallel graph algorithms