AbstractA block graph is a graph whose blocks are cliques. For each edge e=uv of a graph G, let Ne(u) denote the set of all vertices in G which are closer to u than v. In this paper we prove that a graph G is a block graph if and only if it satisfies two conditions: (a) The shortest path between any two vertices of G is unique; and (b) For each edge e=uv∈E(G), if x∈Ne(u) and y∈Ne(v), then, and only then, the shortest path between x and y contains the edge e. This confirms a conjecture of Dobrynin and Gutman [A.A. Dobrynin, I. Gutman, On a graph invariant related to the sum of all distances in a graph, Publ. Inst. Math., Beograd. 56 (1994) 18–22]
AbstractFor two edges e=(x,y) and e′=(x′,y′) of a connected graph G=(V,E) let eΘe′ iff d(x,x′)+d(y,y...
AbstractIn a recent paper [3], Hamelink obtains an interesting sufficient condition for a graph to b...
AbstractA simple characterisation of cycles and complete graphs highlights their significance in Bro...
AbstractA block graph is a graph whose blocks are cliques. For each edge e=uv of a graph G, let Ne(u...
AbstractA graph is strongly path connected if between each pair of distinct vertices there exist pat...
Let G be a connected graph and ξ(G) = Sze(G) - We(G), where We(G) denotes the edge Wiener index and ...
AbstractA block graph is a graph whose blocks are cliques. A block duplicate (BD) graph is a graph o...
Block graphs were studied in various papers and books, e.g. [1], [2], [3], [6]. A block graph is an ...
AbstractLet G be a connected graph and η(G)=Sz(G)−W(G), where W(G) and Sz(G) are the Wiener and Szeg...
AbstractThe boolean distance between two points x and y of a connected graph G is defined as the set...
AbstractThe square H2 of a graph H is obtained from H by adding new edges between every two vertices...
summary:Let $G$ be a (finite undirected) connected graph (with no loop or multiple edge). The set $\...
AbstractA graph G is said to have depth δ if every path of length δ + 1 is contained in a shortest c...
AbstractFor a graph G, we can consider the minimum number of vertices (resp. edges) whose deletion d...
AbstractGiven a simple graph G, the mth power of G, denoted by Gm, has the same vertex set as G and ...
AbstractFor two edges e=(x,y) and e′=(x′,y′) of a connected graph G=(V,E) let eΘe′ iff d(x,x′)+d(y,y...
AbstractIn a recent paper [3], Hamelink obtains an interesting sufficient condition for a graph to b...
AbstractA simple characterisation of cycles and complete graphs highlights their significance in Bro...
AbstractA block graph is a graph whose blocks are cliques. For each edge e=uv of a graph G, let Ne(u...
AbstractA graph is strongly path connected if between each pair of distinct vertices there exist pat...
Let G be a connected graph and ξ(G) = Sze(G) - We(G), where We(G) denotes the edge Wiener index and ...
AbstractA block graph is a graph whose blocks are cliques. A block duplicate (BD) graph is a graph o...
Block graphs were studied in various papers and books, e.g. [1], [2], [3], [6]. A block graph is an ...
AbstractLet G be a connected graph and η(G)=Sz(G)−W(G), where W(G) and Sz(G) are the Wiener and Szeg...
AbstractThe boolean distance between two points x and y of a connected graph G is defined as the set...
AbstractThe square H2 of a graph H is obtained from H by adding new edges between every two vertices...
summary:Let $G$ be a (finite undirected) connected graph (with no loop or multiple edge). The set $\...
AbstractA graph G is said to have depth δ if every path of length δ + 1 is contained in a shortest c...
AbstractFor a graph G, we can consider the minimum number of vertices (resp. edges) whose deletion d...
AbstractGiven a simple graph G, the mth power of G, denoted by Gm, has the same vertex set as G and ...
AbstractFor two edges e=(x,y) and e′=(x′,y′) of a connected graph G=(V,E) let eΘe′ iff d(x,x′)+d(y,y...
AbstractIn a recent paper [3], Hamelink obtains an interesting sufficient condition for a graph to b...
AbstractA simple characterisation of cycles and complete graphs highlights their significance in Bro...