This paper investigates induced Steiner subgraphs as a variant of the classical Steiner trees, so as to compactly represent the (exponentially many) Steiner trees sharing the same underlying induced subgraph. We prove that the enumeration of all (inclusion-minimal) induced Steiner subgraphs is harder than the well-known Hypergraph Transversal enumeration problem if the number of terminals is not fixed. When the number of terminals is fixed, we propose a polynomial delay algorithm for listing all induced Steiner subgraphs of minimum size. We also propose a polynomial delay algorithm for listing the set of minimal induced Steiner subgraphs when the number of terminals is 3.
Listing induced steiner subgraphs as a compact way to discover steiner trees in graphs / Conte A.; Grossi R.; Kante M.M.; Marino A.; Uno T.; Wasa K.. - ELETTRONICO. - 138:(2019), pp. 1-14. (Intervento presentato al convegno 44th International Symposium on Mathematical Foundations of Computer Science, MFCS 2019 tenutosi a deu nel 2019) [10.4230/LIPIcs.MFCS.2019.73].
Listing induced steiner subgraphs as a compact way to discover steiner trees in graphs
Marino A.;
2019
Abstract
This paper investigates induced Steiner subgraphs as a variant of the classical Steiner trees, so as to compactly represent the (exponentially many) Steiner trees sharing the same underlying induced subgraph. We prove that the enumeration of all (inclusion-minimal) induced Steiner subgraphs is harder than the well-known Hypergraph Transversal enumeration problem if the number of terminals is not fixed. When the number of terminals is fixed, we propose a polynomial delay algorithm for listing all induced Steiner subgraphs of minimum size. We also propose a polynomial delay algorithm for listing the set of minimal induced Steiner subgraphs when the number of terminals is 3.
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