Block graph

In graph theory, a branch of combinatorial mathematics, a block graph is a type of undirected graph in which every biconnected component (block) is a clique. Block graphs may be characterized as the intersection graphs of the blocks of arbitrary undirected graphs.^[1]

Block graphs have also been erroneously called "Husimi trees",^[2] but that name more properly refers to cactus graphs, graphs in which every nontrivial biconnected component is a cycle.^[3]

Block graphs are exactly the graphs for which, for every four vertices u, v, x, and y, the largest two of the three distances d(u,v) + d(x,y), d(u,x) + d(v,y), and d(u,y) + d(v,x) are always equal.^[4][2]

They also have a forbidden graph characterization as the graphs that do not have the diamond graph or a cycle of four or more vertices as an isometric subgraph,^[4] as the ptolemaic graphs (chordal distance-hereditary graphs) in which every two nodes at distance two from each other are connected by a unique shortest path,^[2] and as the ptolemaic graphs in which every two maximal cliques have at most one vertex in common.^[2]

If G is any undirected graph, the block graph of G, denoted B(G), is the intersection graph of the blocks of G: B(G) has a vertex for every biconnected component of G, and two vertices of B(G) are adjacent if the corresponding two blocks meet at an articulation vertex. If K₁ denotes the graph with one vertex, then B(K₁) is defined to be the empty graph. B(G) is necessarily a block graph: it has one biconnected component for each articulation vertex of G, and each biconnected component formed in this way must be a clique. Conversely, every block graph is the graph B(G) for some graph G.^[1] If G is a tree, then B(G) coincides with the line graph of G.

The graph B(B(G)) has one vertex for each articulation vertex of G; two vertices are adjacent in B(B(G)) if they belong to the same block in G.^[1]