The vertex detour hull number of a graph

A.P. Santhakumaran; S.V. Ullas Chandran

A.P. Santhakumaran ; S.V. Ullas Chandran

Discussiones Mathematicae Graph Theory, Tome 32 (2012), p. 321-330 / Harvested from The Polish Digital Mathematics Library

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Résumé

For vertices x and y in a connected graph G, the detour distance D(x,y) is the length of a longest x - y path in G. An x - y path of length D(x,y) is an x - y detour. The closed detour interval ID[x,y] consists of x,y, and all vertices lying on some x -y detour of G; while for S ⊆ V(G), $I_{D} [S] = ⋃_{x, y \in S} I_{D} [x, y]$ . A set S of vertices is a detour convex set if $I_{D} [S] = S$ . The detour convex hull ${[S]}_{D}$ is the smallest detour convex set containing S. The detour hull number dh(G) is the minimum cardinality among subsets S of V(G) with ${[S]}_{D} = V (G)$ . Let x be any vertex in a connected graph G. For a vertex y in G, denoted by $I_{D} {[y]}^{x}$ , the set of all vertices distinct from x that lie on some x - y detour of G; while for S ⊆ V(G), $I_{D} {[S]}^{x} = ⋃_{y \in S} I_{D} {[y]}^{x}$ . For x ∉ S, S is an x-detour convex set if $I_{D} {[S]}^{x} = S$ . The x-detour convex hull of S, ${[S]}_{D}^{x}$ is the smallest x-detour convex set containing S. A set S is an x-detour hull set if ${[S]}_{D}^{x} = V (G) - x$ and the minimum cardinality of x-detour hull sets is the x-detour hull number dhₓ(G) of G. For x ∉ S, S is an x-detour set of G if $I_{D} {[S]}^{x} = V (G) - x$ and the minimum cardinality of x-detour sets is the x-detour number dₓ(G) of G. Certain general properties of the x-detour hull number of a graph are studied. It is shown that for each pair of positive integers a,b with 2 ≤ a ≤ b+1, there exist a connected graph G and a vertex x such that dh(G) = a and dhₓ(G) = b. It is proved that every two integers a and b with 1 ≤ a ≤ b, are realizable as the x-detour hull number and the x-detour number respectively. Also, it is shown that for integers a,b and n with 1 ≤ a ≤ n -b and b ≥ 3, there exist a connected graph G of order n and a vertex x such that dhₓ(G) = a and the detour eccentricity of x, $e_{D} (x) = b$ . We determine bounds for dhₓ(G) and characterize graphs G which realize these bounds.

Publié le : 2012-01-01

Zbl 1255.05066

EUDML-ID : urn:eudml:doc:270957

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     title = {The vertex detour hull number of a graph},
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     volume = {32},
     year = {2012},
     pages = {321-330},
     zbl = {1255.05066},
     language = {en},
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A.P. Santhakumaran; S.V. Ullas Chandran. The vertex detour hull number of a graph. Discussiones Mathematicae Graph Theory, Tome 32 (2012) pp. 321-330. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-doi-10_7151_dmgt_1602/

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