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Graphclass: indifference

The following definitions are equivalent:

A vertex order is an indifference order iff for every P₃ abc : a<b and b<c or a<b and b<a
A graph is an indifference if it admits an indifference order.
A graph is an indifference if it admits an acyclic orientation in which every P₃ is oriented as o->o->o.

References: [453]
Equivalent classes: (C_n+4,S₃,claw,net)-free (C_n+4,XF₂ⁿ⁺¹,XF₃ⁿ,claw)-free (S₃,claw,net)-free chordal astral triple-free chordal unit circular arc claw-free interval proper interval unit interval
Complement classes: (S₃,co-(C_n+4),co-claw,net)-free (co-(C_n+4),co-XF₂ⁿ⁺¹,co-XF₃ⁿ,co-claw)-free
Related classes: P₄-indifference comparability

Inclusions

Minimal superclasses: (A,E,S₃,X₁,domino,hole,house,net,rising sun)-free AT-free chordal AT-free claw-free (C₄,X₉₁,claw)-free C₄-free co-comparability (C_n+4,S₃ cup

K₁,claw,net)-free (C_n+4,T₂,X₃₁,XF₂ⁿ⁺¹,XF₃ⁿ)-free (C_n+4,claw)-free (C_n+6,X₃₇,claw,co-antenna,net,sun)-free P₄-bipartite P₄-indifference (W₄,claw)-free boxicity 1 chordal claw-free chordal co-comparability chordal proper circular arc interval probe unit interval unit circular arc
Maximal subclasses: (2,0)-colorable chordal 2-leaf power (3K₁,C₄,C₅)-free (C₄,odd anti-cycle)-free P₃-free

Problems summary

Recognition:	Linear	details
Cliquewidth expression:	Unbounded or NP-complete	details
Cliquewidth:	Unbounded	details
Weighted independent set:	Linear	details
Independent set:	Linear	details
Domination:	Linear	details

Algorithms for Recognition

Linear from proper interval [248] [301] [295]

Algorithms for Cliquewidth expression

See also : Cliquewidth : Weighted independent set : Domination

Algorithms for Cliquewidth

Unbounded from unit interval [1177]
See also : Cliquewidth expression

Algorithms for Weighted independent set

Linear from chordal [1166]
Linear from AT-free claw-free [1157]
Polynomial [O(n logn logn)] from trapezoid

Timebound valid only when given the model [1120] ; otherwise O(n^2).

Polynomial from K₂ cup

claw-free [1290]
Polynomial from (C₄,C₅,T₂)-free [1108]
Polynomial from fork-free [1099]
Polynomial [O(n^4)] from AT-free [160]
Polynomial from (K_2,3,P,hole)-free [1107]
Polynomial [O(n^2)] from circle [1121]
Polynomial from interval filament [1159]
Polynomial from claw-free [783]
Polynomial [O(ln)] from circular arc

Where l is the minimum number of arcs passing through a given point on the circle. [995]

Polynomial from perfect [476]
Polynomial [O(V^4)] from weakly chordal [997]
Polynomial from subtree overlap [1123]
See also : Cliquewidth expression : Independent set

Algorithms for Independent set

Linear [O(n)] from circular arc [1105] [1106] [1158]
Linear from co-comparability [1100]
Linear from chordal [425] [931]
Polynomial from Gallai [1081]
Polynomial from claw-free [947]
Polynomial [O(VE)] from weakly chordal [530] [1119]
Polynomial from (E,P)-free [1305]
Polynomial from EPT [1019]
Polynomial [O(VE)] from (claw,net)-free [1127] [515]
Polynomial from (P,T₂)-free [1305]
Polynomial from Meyniel [169]
Polynomial from clique separable [1081]
Polynomial from (P,star_1,2,5)-free [1349]
Open from (P,star_1,2,3)-free [1351]
Open from (P,star_1,2,4)-free [1351] [1306]
See also : Weighted independent set

Algorithms for Domination

Linear from dually chordal [143] [332]
Linear from circular arc [1143] [1158]
Linear from interval [1143]
Polynomial from strongly chordal [374]
Polynomial from co-interval interval

From interval and co-interval .

Polynomial from directed path [524]
Polynomial from co-comparability [1150] [1151]
Polynomial from AT-free [1152]
Polynomial [O(VE)] from (claw,net)-free [1127]
Polynomial from trapezoid [1155]
Polynomial from probe interval [1340]
See also : Cliquewidth expression