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 Definition:
A graph has boxicity 1
if it has an intersection model consisting of boxes in 1-dimensional space.
chordal C4-free co-comparability (Cn+4,T2,X31,XF2n+1,XF3n)-free chordal co-comparability interval comparability co-chordal superperfect co-interval comparability graphs of semiorders chordal (T2,X2,X3,X30,X31,X32,X33,X34,X35,X36,XF2n+1,XF3n,XF4n,anti-hole,co-XF12n+3,co-XF52n+3,co-XF62n+2,hole)-free 
k-perfect for all k >= 2 (anti-hole,co-sun,hole)-free bounded tolerance boxicity 2 chordal diametral path chordal dominating pair clique-Helly clique-Helly dismantlable co-comparability co-interval interval co-threshold tolerance directed path disk-Helly generalized strongly chordal hereditary homogeneously orderable homogeneously orderable (house,hole,domino,sun)-free intersection graphs of parallelograms (squares) maximal clique irreducible probe interval strongly orderable totally unimodular unimodular weak bipolarizable chordal (2K2,C4,C5,S3,net,rising sun)-free (2K2,C4,P4)-free (2P3,3K2,C4,C5,H,P2 P4,P5,S3,X1,X160,co-(X159),co-(X161),co-(X162),co-(X46),co-(X70),net,rising sun)-free (3K1,C4,C5)-free (C4,odd anti-cycle)-free (Cn+4,P5,bull)-free (Cn+4,S3,claw,net)-free (Cn+4,XF2n+1,XF3n,claw)-free Dilworth 1 (P5,bull)-free interval (S3,claw,net)-free chordal (T2,cycle)-free astral triple-free caterpillar chordal unit circular arc claw-free interval co-interval cograph interval co-probe threshold co-trivially perfect trivially perfect cograph split comparability graphs of threshold orders homogeneously representable indifference proper interval threshold unit interval | 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 interval
[127]
[687]
[595]
[499]
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]
Polynomial [O(n logn logn)]
from trapezoid
| Timebound valid only when given the model [1120] ; otherwise O(n^2). |
| Where l is the minimum number of arcs passing through a given point on the circle. [995] |
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 [O(VE)]
from weakly chordal
[530]
[1119]
Polynomial from EPT
[1019]
Polynomial from (P,T2)-free
[1305]
Polynomial from Meyniel
[169]
Polynomial from clique separable
[1081]
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 . |