Abstract A graph G is bridged if each cycle C of length at least four contains two vertices whose 3istance from each other in G is strictly less than that in C . The class of bridged graphs is an extension of the class of chordal (or triangulated) graphs which arises in the study of convexity in graphs. A set K of vertices of a graph G is geodesically convex if K contains every vertex on every shortest path joining vertices in K . It is known that a graph is bridged if and only if the closed neighborhood of every geodesically convex set is again geodesically convex. This paper contains several results concerning geodesically convex sets in bridged graphs. As an interesting consequence of these results we obtain two recursive characterizations of the class of bridged graphs.
[1]
Pierre Duchet,et al.
Convex sets in graphs, II. Minimal path convexity
,
1987,
J. Comb. Theory B.
[2]
G. Dirac.
On rigid circuit graphs
,
1961
.
[3]
R. Möhring.
Algorithmic graph theory and perfect graphs
,
1986
.
[4]
M. Farber,et al.
Convexity in graphs and hypergraphs
,
1986
.
[5]
Lynn Margaret Batten.
Geodesic subgraphs
,
1983,
J. Graph Theory.
[6]
Martin Farber,et al.
On local convexity in graphs
,
1987,
Discret. Math..
[7]
V. Soltan,et al.
Conditions for invariance of set diameters under d-convexification in a graph
,
1983
.
[8]
J. A. Bondy,et al.
Graph Theory with Applications
,
1978
.