critical graph

In general the notion of criticality can refer to any measure. But in graph theory, when the term is used without any qualification, it almost always refers to the chromatic number of a graph. Critical graphs are interesting because they are the minimal members in terms of chromatic number, which is a very important measure in graph theory. More precise definitions follow. A vertex or an edge is a critical element of a graph G if its deletion would decrease the chromatic number of G. Obviously such decrement can be no more than 1 in a graph. A critical graph is a graph in which every vertex or edge is a critical element. A k-critical graph' is a critical graph with chromatic number k; a graph G with chromatic number k is k-vertex-critical' if each of its vertices is a critical element. Some properties of a k-critical graph G with n vertices and m edges:

G has only one component.
G is finite (direct consequence of [de Bruijn, Erdös 1951])
δ(G) ≥ k - 1, that is, every vertex is adjacent to at least k - 1 others.
If G is (k-1)-regular, meaning every vertex is adjacent to exactly k - 1 others, then G is either K_k or an odd cycle. (Brooks 1941)
2 m ≥ (k - 1) n + k - 3. (Dirac 1957)
2 m ≥ (k - 1) n + - 3)/(k² - 3) n. (Gallai 1963)

It is fairly easy to see that a graph $G$ is vertex-critical if and only if for every vertex v, there is an optimal proper coloring in which v is a singleton color class. A double critical graph is a graph in which the deletion of any pair of adjacent vertices leaves a (k-2)-colorable subgraph. One open problem is to determine whether K_k is the only double critical graph. (Jensen, Toft 1995, p. 105)

References

Brooks, R. L. (1941). On colouring the nodes of a network. Proc. Cambridge Phil. Soc. 37, 194–197.
de Bruijn, N. G.; Erdös, P. (1951). A colour problem for infinite graphs and a problem in the theory of relations. Nederl. Akad. Wetensch. Proc. Ser. A 54, 371–373. (Indag. Math. 13.)
Dirac, G. A. (1957). A theorem of R. L. Brooks and a conjecture of H. Hadwiger. Proc. London Math. Soc. (3) 7, 161–195.
Gallai, T. (1963). Kritische Graphen I. Publ. Math. Inst. Hungar. Acad. Sci. 8, 165–192.
Jensen, Tommy R.; Toft, Bjarne (1995). Graph coloring problems. New York: Wiley-Interscience. ISBN 0-471-02865-7.

<< Previous

Word Browser

Next >>

chouchi
hiligaynon language
richard wallace (art collector)
gold (disambiguation)
shinny
william wirt
cr mimetic
the refused
kaohsiung international airport
walhalla
broderie perse

surya tv
commercial bank of ceylon
blackbird creek
sudden downturn of f5 tornadoes
carl solomon
hollywood pictures
women's premier soccer league
blackbird creek (delaware)
pepper creek
star of the county down
murray silverstein

modeline
pepper creek (delaware)
anz new zealand
tikanga maori
wendell berry
smuggler's run
permanent guest host
fort assiniboine
the man show
later liang dynasty
wtsp

itzhak sadeh
jaganatha
fernando l. ribas dominicci
marganus ii
lexus gs
service la franaise
enniaunus
idvallo
cloneproof schwartz sequential dropping
runo
gerennus