AbstractA connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertices does not affect the distances (lengths of the shortest paths) between any pair of the remaining vertices. As such graphs have important applications in robust system designs, we are interested in the minimum number of edges required to make a k-GC graph of order n, and characterizing those minimum k-GC graphs. When 3<k<(n−1)/2, minimum k-GC graphs are not yet known in general, even the minimum number of edges m(n,k) is not determined. In this paper, we will determine all of the minimum k-GC graphs for an infinite set of special (n,k) pairs that were formerly unknown. To derive our results, we also developed new bounds on m(n,k). Additionall...
For two vertices u and v of a graph G, the closed interval I[u,v] consists of u, v, and all vertices...
Let G be a connected graph. For two vertices u and v in G, a u-v geodesic is any shortest path joini...
For a nontrivial connected graph G = (V(G),E(G)), a set S⊆ V(G) is called an edge geodetic set of G ...
A connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertices does n...
AbstractA connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertice...
AbstractA graph G is k-geodetically connected (k-GC) if it is connected and the removal of at least ...
AbstractFor a connected graph G of order p≥2, a set S⊆V(G) is a geodetic set of G if each vertex v∈V...
AbstractFor every pair of vertices u,v in a graph, a u-v geodesic is a shortest path from u to v. Fo...
For a connected graph G of order n, a set S of vertices of G is a geodetic set of G if each vertex ...
AbstractA digraph G = (V, E) with diameter D is said to be s-geodetic, for 1 ⩽ s ⩽ D, if between any...
AbstractA set of vertices D of a graph G is geodetic if every vertex of G lies on a shortest path be...
[[abstract]]A shortest path connecting two vertices u and v is called a u-v geodesic. The distance b...
[[abstract]]A shortest path connecting two vertices u and v is called a u-v geodesic. The distance b...
AbstractThe η-extraconnectivity κη of a simple connected (di)graph G is a kind of conditional connec...
19 pages, 4 figuresThe strong geodetic problem on a graph G is to determine a smallest set of vertic...
For two vertices u and v of a graph G, the closed interval I[u,v] consists of u, v, and all vertices...
Let G be a connected graph. For two vertices u and v in G, a u-v geodesic is any shortest path joini...
For a nontrivial connected graph G = (V(G),E(G)), a set S⊆ V(G) is called an edge geodetic set of G ...
A connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertices does n...
AbstractA connected graph G is k-geodetically connected (k-GC) if the removal of less than k vertice...
AbstractA graph G is k-geodetically connected (k-GC) if it is connected and the removal of at least ...
AbstractFor a connected graph G of order p≥2, a set S⊆V(G) is a geodetic set of G if each vertex v∈V...
AbstractFor every pair of vertices u,v in a graph, a u-v geodesic is a shortest path from u to v. Fo...
For a connected graph G of order n, a set S of vertices of G is a geodetic set of G if each vertex ...
AbstractA digraph G = (V, E) with diameter D is said to be s-geodetic, for 1 ⩽ s ⩽ D, if between any...
AbstractA set of vertices D of a graph G is geodetic if every vertex of G lies on a shortest path be...
[[abstract]]A shortest path connecting two vertices u and v is called a u-v geodesic. The distance b...
[[abstract]]A shortest path connecting two vertices u and v is called a u-v geodesic. The distance b...
AbstractThe η-extraconnectivity κη of a simple connected (di)graph G is a kind of conditional connec...
19 pages, 4 figuresThe strong geodetic problem on a graph G is to determine a smallest set of vertic...
For two vertices u and v of a graph G, the closed interval I[u,v] consists of u, v, and all vertices...
Let G be a connected graph. For two vertices u and v in G, a u-v geodesic is any shortest path joini...
For a nontrivial connected graph G = (V(G),E(G)), a set S⊆ V(G) is called an edge geodetic set of G ...