Efficient Algorithms for Measuring the Funnel-likeness of DAGs

January 31, 2018 Β· Declared Dead Β· πŸ› Journal of combinatorial optimization

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Authors Marcelo Garlet Millani, Hendrik Molter, Rolf Niedermeier, Manuel Sorge arXiv ID 1801.10401 Category cs.DS: Data Structures & Algorithms Citations 13 Venue Journal of combinatorial optimization Last Checked 3 months ago
Abstract
Funnels are a new natural subclass of DAGs. Intuitively, a DAG is a funnel if every source-sink path can be uniquely identified by one of its arcs. Funnels are an analog to trees for directed graphs that is more restrictive than DAGs but more expressive than in-/out-trees. Computational problems such as finding vertex-disjoint paths or tracking the origin of memes remain NP-hard on DAGs while on funnels they become solvable in polynomial time. Our main focus is the algorithmic complexity of finding out how funnel-like a given DAG is. To this end, we study the NP-hard problem of computing the arc-deletion distance to a funnel of a given DAG. We develop efficient exact and approximation algorithms for the problem and test them on synthetic random graphs and real-world graphs.
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