Efficiently Computing Directed Minimum Spanning Trees
August 04, 2022 Β· Declared Dead Β· π Workshop on Algorithm Engineering and Experimentation
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Authors
Maximilian BΓΆther, Otto KiΓig, Christopher Weyand
arXiv ID
2208.02590
Category
cs.DS: Data Structures & Algorithms
Citations
4
Venue
Workshop on Algorithm Engineering and Experimentation
Last Checked
4 months ago
Abstract
Computing a directed minimum spanning tree, called arborescence, is a fundamental algorithmic problem, although not as common as its undirected counterpart. In 1967, Edmonds discussed an elegant solution. It was refined to run in $O(\min(n^2, m\log n))$ by Tarjan which is optimal for very dense and very sparse graphs. Gabow et al.~gave a version of Edmonds' algorithm that runs in $O(n\log n + m)$, thus asymptotically beating the Tarjan variant in the regime between sparse and dense. Despite the attention the problem received theoretically, there exists, to the best of our knowledge, no empirical evaluation of either of these algorithms. In fact, the version by Gabow et al.~has never been implemented and, aside from coding competitions, all readily available Tarjan implementations run in $O(n^2)$. In this paper, we provide the first implementation of the version by Gabow et al.~as well as five variants of Tarjan's version with different underlying data structures. We evaluate these algorithms and existing solvers on a large set of real-world and random graphs.
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