Smoke root detection from video sequences based on multi-feature fusion

A set of vertices D of a graph G is geodetic if every vertex of G lies on a shortest path between two not necessarily distinct vertices in D. The geodetic number of G is the minimum cardinality of a geodetic set of G. We prove that it is NP complete to decide for a given chordal or chordal bipartite graph G and a given integer k whether G has a geodetic set of cardinality at most k. Furthermore, we prove an upper bound on the geodetic number of graphs without short cycles and study the geodetic number of cographs, split graphs, and unit interval graphs.

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Complexity results related to monophonic convexity

Dourado

Protti

Szwarcfiter

2010

Discrete Applied Mathematics

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Mixed unit interval graphs

Dourado

Lê

Protti

et al. 2012

Discrete Mathematics

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Mitre C. Dourado

Irreversible conversion of graphs

On the computation of the hull number of a graph

Some remarks on the geodetic number of a graph

Complexity results related to monophonic convexity

Mixed unit interval graphs

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