Graphclass: (G)-perfect

Definition:

A graph G is cal C (G)-perfect if for every subgraph H we have for the hypergraph H' formed by all cliques in H that alpha(H') = kappa(H'), where alpha is the packing number (max. vertex set such that every hyperedge contains at most one vertex from the set) and kappa the covering number (min. edge set that contains all vertices).

Equivalent classes

Complement classes

self-complementary

Inclusions

The map shows the inclusions between the current class and a fixed set of landmark classes. Minimal/maximal is with respect to the contents of ISGCI. Only references for direct inclusions are given. Where no reference is given, check equivalent classes or use the Java application. To check relations other than inclusion (e.g. disjointness) use the Java application, as well.

Map

Minimal superclasses

normal(possibly equal)
odd anti-hole-free(known proper)
odd-hole-free(known proper)
strongly circular perfect(possibly equal)

Maximal subclasses

2-split ∩ perfect (possibly equal)
(3K₂,E,P₂ ∪ P₄,net,odd anti-hole,odd-hole)-free (known proper)
(4K₁,odd anti-hole,odd-hole)-free (known proper)
(6-fan,C₄ ∪ P₂,C₅,C₆ ∪ K₁,C₇,K₂ ∪ K₃,K_2,3,P₂ ∪ P₄,W₄ ∪ K₁,W₆,X₁₃₂,X₁₆₉,X₁₇₆,X₁₈,X₁₉₇,X₁₉₈,X₁₉₉,X₂₀₀,X₂₀₁,X₂₀₂,X₃₅,X₈₄,C₄ ∪ P₂,C₆ ∪ K₁,C₇,P₂ ∪ P₄,W₄ ∪ K₁,W₆,X₁₃₂,X₁₆₉,X₁₇₆,X₁₈,X₁₉₇,X₁₉₈,X₁₉₉,X₂₀₀,X₂₀₁,X₃₅,X₈₄,butterfly ∪ K₁,butterfly ∪ K₁,co-6-fan,co-fish,fish)-free (known proper)
Berge ∩ claw-free (known proper)
(C₅,P₆,P₆)-free (known proper)
Dilworth 4 (known proper)
(S₃,3K₂,E,P₂ ∪ P₄,odd anti-hole,odd-hole)-free (known proper)
(X₁₂,X₅,X₉₅,X₉₆,X₉₇,X₁₂,X₅,X₉₅,X₉₆,X₉₇,claw ∪ triangle,claw ∪ triangle,co-cricket,co-twin-house,cricket,odd anti-hole,odd-hole,twin-house)-free (known proper)
absorbantly perfect (known proper)
alternately colourable (known proper)
(anti-hole,odd-hole)-free (known proper)
basic perfect (known proper)
bip^* (known proper)
bipartite ∪ co-bipartite ∪ co-line graphs of bipartite graphs ∪ line graphs of bipartite graphs (known proper)
(claw,odd anti-hole,odd-hole)-free (known proper)
claw-free ∩ perfect (known proper)
(co-claw,odd anti-hole,odd-hole)-free (known proper)
doubled (known proper)
(hole,odd anti-hole)-free (known proper)
locally perfect (known proper)
murky (known proper)
neighbourhood perfect (possibly equal)
odd-hole-free ∩ planar (possibly equal)
perfect ∩ planar (possibly equal)
perfect ∩ split-neighbourhood (possibly equal)
preperfect (known proper)
probe Meyniel (known proper)
quasi-parity (known proper)
short-chorded (possibly equal)
slender (known proper)
slightly triangulated (known proper)
slim (known proper)
superperfect (known proper)
totally unimodular (known proper)
unimodular (known proper)

Problems

3-Colourability

Polynomial

Clique

Polynomial

Clique cover

Polynomial

Cliquewidth

Unbounded

Cliquewidth expression

Unbounded or NP-complete

Colourability

Polynomial

Domination

NP-complete

Independent set

Polynomial

Recognition

Polynomial

Treewidth

NP-complete

Weighted clique

Polynomial

Weighted independent set

Polynomial