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The upper connected edge geodetic number of a graph
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For a non-trivial connected graph G, a set S ? V (G) is called an edge
geodetic set of G if every edge of G is contained in a geodesic joining some
pair of vertices in S. The edge geodetic number g1(G) of G is the minimum
order of its edge geodetic sets and any edge geodetic set of order g1(G) is
an edge geodetic basis. A connected edge geodetic set of G is an edge
geodetic set S such that the subgraph G[S] induced by S is connected. The
minimum cardinality of a connected edge geodetic set of G is the connected
edge geodetic number of G and is denoted by g1c(G). A connected edge geodetic
set of cardinality g1c(G) is called a g1c- set of G or connected edge
geodetic basis of G. A connected edge geodetic set S in a connected graph G
is called a minimal connected edge geodetic set if no proper subset of S is a
connected edge geodetic set of G. The upper connected edge geodetic number g+
1c(G) is the maximum cardinality of a minimal connected edge geodetic set of
G. Graphs G of order p for which g1c(G) = g+1c = p are characterized. For
positive integers r,d and n ( d + 1 with r ? d ? 2r, there exists a connected
graph of radius r, diameter d and upper connected edge geodetic number n. It
is shown for any positive integers 2 ? a < b ? c, there exists a connected
graph G such that g1(G) = a; g1c(G) = b and g+ 1c(G) = c.
Title: The upper connected edge geodetic number of a graph
Description:
For a non-trivial connected graph G, a set S ? V (G) is called an edge
geodetic set of G if every edge of G is contained in a geodesic joining some
pair of vertices in S.
The edge geodetic number g1(G) of G is the minimum
order of its edge geodetic sets and any edge geodetic set of order g1(G) is
an edge geodetic basis.
A connected edge geodetic set of G is an edge
geodetic set S such that the subgraph G[S] induced by S is connected.
The
minimum cardinality of a connected edge geodetic set of G is the connected
edge geodetic number of G and is denoted by g1c(G).
A connected edge geodetic
set of cardinality g1c(G) is called a g1c- set of G or connected edge
geodetic basis of G.
A connected edge geodetic set S in a connected graph G
is called a minimal connected edge geodetic set if no proper subset of S is a
connected edge geodetic set of G.
The upper connected edge geodetic number g+
1c(G) is the maximum cardinality of a minimal connected edge geodetic set of
G.
Graphs G of order p for which g1c(G) = g+1c = p are characterized.
For
positive integers r,d and n ( d + 1 with r ? d ? 2r, there exists a connected
graph of radius r, diameter d and upper connected edge geodetic number n.
It
is shown for any positive integers 2 ? a < b ? c, there exists a connected
graph G such that g1(G) = a; g1c(G) = b and g+ 1c(G) = c.
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