A treeσ-spanner of a positively real-weighted n-vertex and m-edge undirected graph G is a spanning tree T of G which approximately preserves (i.e., up to a multiplicative stretch factorσ) distances in G. Tree spanners with provably good stretch factors find applications in communication networks, distributed systems, and network design. However, finding an optimal or even a good tree spanner is a very hard computational task. Thus, if one has to face a transient edge failure in T, the overall effort that has to be afforded to rebuild a new tree spanner (i.e., computational costs, set-up of new links, updating of the routing tables, etc.) can be rather prohibitive. To circumvent this drawback, an effective alternative is that of associating with each tree edge a best possible (in terms of resulting stretch) swap edge—a well-established approach in the literature for several other tree topologies. Correspondingly, the problem of computing all the best swap edges of a tree spanner is a challenging algorithmic problem, since solving it efficiently means to exploit the structure of shortest paths not only in G, but also in all the scenarios in which an edge of T has failed. For this problem we provide a very efficient solution, running in O(n2log 4n) time, which drastically improves (almost by a quadratic factor in n in dense graphs) on the previous known best result.

An Improved Algorithm for Computing All the Best Swap Edges of a Tree Spanner / Bilo, D.; Colella, F.; Guala, L.; Leucci, S.; Proietti, G.. - In: ALGORITHMICA. - ISSN 0178-4617. - (2019). [10.1007/s00453-019-00549-w]

An Improved Algorithm for Computing All the Best Swap Edges of a Tree Spanner

Bilo D.;Proietti G.
2019-01-01

Abstract

A treeσ-spanner of a positively real-weighted n-vertex and m-edge undirected graph G is a spanning tree T of G which approximately preserves (i.e., up to a multiplicative stretch factorσ) distances in G. Tree spanners with provably good stretch factors find applications in communication networks, distributed systems, and network design. However, finding an optimal or even a good tree spanner is a very hard computational task. Thus, if one has to face a transient edge failure in T, the overall effort that has to be afforded to rebuild a new tree spanner (i.e., computational costs, set-up of new links, updating of the routing tables, etc.) can be rather prohibitive. To circumvent this drawback, an effective alternative is that of associating with each tree edge a best possible (in terms of resulting stretch) swap edge—a well-established approach in the literature for several other tree topologies. Correspondingly, the problem of computing all the best swap edges of a tree spanner is a challenging algorithmic problem, since solving it efficiently means to exploit the structure of shortest paths not only in G, but also in all the scenarios in which an edge of T has failed. For this problem we provide a very efficient solution, running in O(n2log 4n) time, which drastically improves (almost by a quadratic factor in n in dense graphs) on the previous known best result.
2019
An Improved Algorithm for Computing All the Best Swap Edges of a Tree Spanner / Bilo, D.; Colella, F.; Guala, L.; Leucci, S.; Proietti, G.. - In: ALGORITHMICA. - ISSN 0178-4617. - (2019). [10.1007/s00453-019-00549-w]
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11388/221872
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