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Parallel Algorithms with Optimal Speedup for Bounded Treewidth

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Hagerup,  Torben
Algorithms and Complexity, MPI for Informatics, Max Planck Society;

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MPI-I-95-1-017.pdf
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Citation

Bodlaender, H. L., & Hagerup, T.(1995). Parallel Algorithms with Optimal Speedup for Bounded Treewidth (MPI-I-95-1-017). Saarbrücken: Max-Planck-Institut für Informatik.


Cite as: https://hdl.handle.net/11858/00-001M-0000-0019-DBA6-8
Abstract
We describe the first parallel algorithm with optimal speedup for constructing minimum-width tree decompositions of graphs of bounded treewidth. On $n$-vertex input graphs, the algorithm works in $O((\log n)^2)$ time using $O(n)$ operations on the EREW PRAM. We also give faster parallel algorithms with optimal speedup for the problem of deciding whether the treewidth of an input graph is bounded by a given constant and for a variety of problems on graphs of bounded treewidth, including all decision problems expressible in monadic second-order logic. On $n$-vertex input graphs, the algorithms use $O(n)$ operations together with $O(\log n\Tlogstar n)$ time on the EREW PRAM, or $O(\log n)$ time on the CRCW PRAM.