Critical graph: Difference between revisions

Latest revision as of 16:32, 24 December 2025

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On the left-top a vertex critical graph with chromatic number 6; next all the N-1 subgraphs with chromatic number 5.

In graph theory, a critical graph is an undirected graph all of whose proper subgraphs have smaller chromatic number. In such a graph, every vertex or edge is a critical element, in the sense that its deletion would decrease the number of colors needed in a graph coloring of the given graph. Each time a single edge or vertex (along with its incident edges) is removed from a critical graph, the decrease in the number of colors needed to color that graph cannot be by more than one.

Variations

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. Critical graphs are the minimal members in terms of chromatic number, which is a very important measure in graph theory.

Some properties of a $k$ -critical graph $G$ with $n$ vertices and $m$ edges:

$G$ has only one component.
$G$ is finite (this is the De Bruijn–Erdős theorem).Template:R
The minimum degree $δ (G)$ obeys the inequality $δ (G) \geq k - 1$ . That is, every vertex is adjacent to at least $k - 1$ others. More strongly, $G$ is $(k - 1)$ -edge-connected.Template:R
If $G$ is a regular graph with degree $k - 1$ , meaning every vertex is adjacent to exactly $k - 1$ others, then $G$ is either the complete graph $K_{k}$ with $n = k$ vertices, or an odd-length cycle graph. This is Brooks' theorem.Template:R
$2 m \geq (k - 1) n + k - 3$ .Template:R
$2 m \geq (k - 1) n + (k - 3) / (k^{2} - 3) n$ .Template:R
Either $G$ may be decomposed into two smaller critical graphs, with an edge between every pair of vertices that includes one vertex from each of the two subgraphs, or $G$ has at least $2 k - 1$ vertices.Template:R More strongly, either $G$ has a decomposition of this type, or for every vertex $v$ of $G$ there is a $k$ -coloring in which $v$ is the only vertex of its color and every other color class has at least two vertices.Template:R

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.

As Script error: No such module "Footnotes". showed, every $k$ -critical graph may be formed from a complete graph $K_{k}$ by combining the Hajós construction with an operation that identifies two non-adjacent vertices. The graphs formed in this way always require $k$ colors in any proper coloring.Template:R

A double-critical graph is a connected graph in which the deletion of any pair of adjacent vertices decreases the chromatic number by two. It is an open problem to determine whether $K_{k}$ is the only double-critical $k$ -chromatic graph.Template:R

References

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@@ Line 14: / Line 14: @@
 * If <math>G</math> is a [[regular graph]] with degree <math>k-1</math>, meaning every vertex is adjacent to exactly <math>k-1</math> others, then <math>G</math> is either the [[complete graph]] <math>K_k</math> with <math>n=k</math> vertices, or an odd-length [[cycle graph]]. This is [[Brooks' theorem]].{{r|brooks}}
 * <math>2m\ge(k-1)n+k-3</math>.{{r|dirac}}
-* <math>2m\ge (k-1)n+\lfloor(k-3)/(k^2-3)\rfloor n</math>.{{r|gallai-1}}
+* <math>2m\ge (k-1)n+(k-3)/(k^2-3)n</math>.{{r|gallai-1}}
 * Either <math>G</math> may be decomposed into two smaller critical graphs, with an edge between every pair of vertices that includes one vertex from each of the two subgraphs, or <math>G</math> has at least <math>2k-1</math> vertices.{{r|gallai-2}} More strongly, either <math>G</math> has a decomposition of this type, or for every vertex <math>v</math> of <math>G</math> there is a <math>k</math>-coloring in which <math>v</math> is the only vertex of its color and every other color class has at least two vertices.{{r|stehlik}}
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 ==References==
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-{{reflist|refs=
+<references>
 <ref name=brooks>{{citation|doi=10.1017/S030500410002168X|last1=Brooks|first1=R. L.|journal=Proceedings of the Cambridge Philosophical Society|pages=194–197|issue=2|title=On colouring the nodes of a network|volume=37|year=1941|bibcode=1941PCPS...37..194B |s2cid=209835194 }}</ref>
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 <ref name=stehlik>{{citation|last=Stehlík|first=Matěj|doi=10.1016/S0095-8956(03)00069-8|issue=2|journal=[[Journal of Combinatorial Theory]]|mr=2017723|pages=189–194|series=Series B|title=Critical graphs with connected complements|volume=89|year=2003|doi-access=}}</ref>
-}}
+</references>
 ==Further reading==

Critical graph: Difference between revisions

Latest revision as of 16:32, 24 December 2025

Contents

Variations

See also

References

Further reading

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Critical graph: Difference between revisions

Latest revision as of 16:32, 24 December 2025

Variations

See also

References

Further reading

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