Enumerating Cyclic Orientations of a Graph
June 19, 2015 Β· Declared Dead Β· π International Workshop on Combinatorial Algorithms
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Authors
Alessio Conte, Roberto Grossi, Andrea Marino, Romeo Rizzi
arXiv ID
1506.05977
Category
cs.DS: Data Structures & Algorithms
Citations
4
Venue
International Workshop on Combinatorial Algorithms
Last Checked
4 months ago
Abstract
Acyclic and cyclic orientations of an undirected graph have been widely studied for their importance: an orientation is acyclic if it assigns a direction to each edge so as to obtain a directed acyclic graph (DAG) with the same vertex set; it is cyclic otherwise. As far as we know, only the enumeration of acyclic orientations has been addressed in the literature. In this paper, we pose the problem of efficiently enumerating all the \emph{cyclic} orientations of an undirected connected graph with $n$ vertices and $m$ edges, observing that it cannot be solved using algorithmic techniques previously employed for enumerating acyclic orientations.We show that the problem is of independent interest from both combinatorial and algorithmic points of view, and that each cyclic orientation can be listed with $\tilde{O}(m)$ delay time. Space usage is $O(m)$ with an additional setup cost of $O(n^2)$ time before the enumeration begins, or $O(mn)$ with a setup cost of $\tilde{O}(m)$ time.
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