Simplex graph
In graph theory, a branch of mathematics, the simplex graph κ(G)Script error: No such module "Check for unknown parameters". of an undirected graph Template:Mvar is itself a graph, with one node for each clique (a set of mutually adjacent vertices) in Template:Mvar. Two nodes of κ(G)Script error: No such module "Check for unknown parameters". are linked by an edge whenever the corresponding two cliques differ in the presence or absence of a single vertex.
The empty set is included as one of the cliques of Template:Mvar that are used to form the clique graph, as is every set of one vertex and every set of two adjacent vertices. Therefore, the simplex graph contains within it a subdivision of Template:Mvar itself. The simplex graph of a complete graph is a hypercube graph, and the simplex graph of a cycle graph of length four or more is a gear graph. The simplex graph of the complement graph of a path graph is a Fibonacci cube.
The complete subgraphs of Template:Mvar can be given the structure of a median algebra: the median of three cliques Template:Mvar, Template:Mvar, and Template:Mvar is formed by the vertices that belong to a majority of the three cliques.[1] Any two vertices belonging to this median set must both belong to at least one of Template:Mvar, Template:Mvar, or Template:Mvar, and therefore must be linked by an edge, so the median of three cliques is itself a clique. The simplex graph is the median graph corresponding to this median algebra structure. When Template:Mvar is the complement graph of a bipartite graph, the cliques of Template:Mvar can be given a stronger structure as a distributive lattice,[2] and in this case the simplex graph is the graph of the lattice. As is true for median graphs more generally, every simplex graph is itself bipartite.
The simplex graph has one vertex for every simplex in the clique complex X(G)Script error: No such module "Check for unknown parameters". of Template:Mvar, and two vertices are linked by an edge when one of the two corresponding simplexes is a facet of the other. Thus, the objects (vertices in the simplex graph, simplexes in X(G)Script error: No such module "Check for unknown parameters".) and relations between objects (edges in the simplex graph, inclusion relations between simplexes in X(G)Script error: No such module "Check for unknown parameters".) are in one-to-one correspondence between X(G)Script error: No such module "Check for unknown parameters". and κ(G)Script error: No such module "Check for unknown parameters"..
Simplex graphs were introduced by Script error: No such module "Footnotes".,[3] who observed that a simplex graph has no cubes if and only if the underlying graph is triangle-free, and showed that the chromatic number of the underlying graph equals the minimum number Template:Mvar such that the simplex graph can be isometrically embedded into a Cartesian product of Template:Mvar trees. As a consequence of the existence of triangle-free graphs with high chromatic number, they showed that there exist two-dimensional topological median algebras that cannot be embedded into products of finitely many real trees. Script error: No such module "Footnotes". also use simplex graphs as part of their proof that testing whether a graph is triangle-free or whether it is a median graph may be performed equally quickly.
Notes
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References
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