Definition:
A graph is a
probe threshold graph
if its vertex set can be partitioned into two sets, probes (P)
and non-probes (N), such that N is independent and new edges can
be added between non-probes in such a way that the resulting
graph is a
threshold
graph.
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| 3-Colourability
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Linear |
[+]Details |
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Linear from Colourability
Polynomial from Colourability
Polynomial from Cliquewidth expression
Polynomial on nK2-free, fixed n
[1434]
[1431]
Polynomial on nP3-free, fixed n
[1431]
Polynomial on P5-free
[1242]
[1441]
Polynomial on 2P3-free
[1431]
Polynomial on P2 ∪ P4-free
[1431]
Polynomial on circle
[1438]
Polynomial [O(V^4)]
on AT-free
[1439]
Polynomial on P6-free
[1243]
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| Clique
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Linear |
[+]Details |
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Linear from Weighted clique
Polynomial from Weighted clique
Polynomial from Independent set on the complement
Linear on Matula perfect
[221]
Linear on Welsh-Powell perfect
[221]
Polynomial [O(V log V)]
on multitolerance
Polynomial [O(V log V)]
on tolerance
Polynomial on b-perfect
[1478]
Polynomial on circular perfect
[1408]
Polynomial on biclique separable
[1304]
Polynomial [O(V log V)]
on boxicity 2
[604]
Polynomial [O(V log^2 V)]
on circle
[1466]
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| Clique cover
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Polynomial |
[+]Details |
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Polynomial from Colourability on the complement
Polynomial from Cliquewidth expression
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| Cliquewidth
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Bounded |
[+]Details |
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Bounded on probe P4-sparse
Bounded on probe ptolemaic
Bounded on cliquewidth 4
Bounded on probe distance-hereditary
Bounded on probe P4-reducible
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| Cliquewidth expression
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Polynomial |
[+]Details |
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Polynomial from Cliquewidth
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| Colourability
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Linear |
[+]Details |
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Polynomial from Cliquewidth expression
Linear on Welsh-Powell perfect
[221]
Linear on Matula perfect
[221]
Polynomial [O(V^2)]
on comparability
[1424]
Polynomial [O(V log V)]
on permutation
[453]
Polynomial on circular perfect
[1408]
Polynomial [O(VE)]
on perfectly orderable
[1424]
[1382]
Polynomial [O(V log V)]
on multitolerance
[1497]
Polynomial [O(V^4E)]
on weakly chordal
[530]
Polynomial on biclique separable
[1304]
Polynomial on perfect
[476]
Polynomial on b-perfect
[1478]
Polynomial [O(V log V)]
on tolerance
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| Domination
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Linear |
[+]Details |
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Polynomial from Cliquewidth expression
Linear [O(V)]
on permutation
[1342]
[1147]
[1148]
[1149]
[1165]
Polynomial on co-comparability
[1150]
[1151]
Polynomial on probe interval
[1340]
Polynomial on k-polygon
[352]
Polynomial on trapezoid
[1155]
Polynomial on co-interval ∪ interval
Polynomial on AT-free
[1152]
Polynomial [O(n^2 log^5 n)]
on co-bounded tolerance
[1172]
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| Independent set
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Linear |
[+]Details |
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Linear from Weighted independent set
Polynomial from Clique on the complement
Polynomial from Weighted independent set
Linear on co-chordal
[558]
Linear on co-comparability
[1100]
Polynomial on co-hereditary clique-Helly
[1298]
Polynomial [O(VE)]
on weakly chordal
[530]
[1119]
Polynomial on co-biclique separable
[1304]
Polynomial [O(V min(d,\alpha))]
on circle
[1465]
Polynomial on Meyniel
[169]
Polynomial on comparability
[453]
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| Recognition
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Linear |
[+]Details |
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Linear
[1345]
Polynomial on (2K2,C5,S3,X159,X160,X161,X162,X46,X70,2P3,3K2,H,P2 ∪ P4,X1,co-rising sun,house,net)-free
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| Treewidth
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Linear |
[+]Details |
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Linear on permutation
[1418]
Polynomial on circle
[119]
Polynomial on circular permutation
[119]
Polynomial [O(V^2)]
on trapezoid
[1417]
Polynomial on co-chordal
[119]
Polynomial on d-trapezoid
[675]
Polynomial on permutation
[119]
Polynomial on co-comparability graphs of dimension d posets
[675]
Polynomial on HHD-free
[1420]
Polynomial on weakly chordal
[1421]
Polynomial on co-interval
[1416]
Polynomial on d-trapezoid
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| Weighted clique
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Linear |
[+]Details |
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Polynomial from Weighted independent set on the complement
Polynomial from Cliquewidth expression
Linear on comparability
[453]
Polynomial [O(V^2 + E log log V)]
on circle
[1429]
Polynomial on interval filament
[1159]
Polynomial [O(VE)]
on perfectly orderable
[1424]
Polynomial on co-comparability ∪ comparability
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| Weighted independent set
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Linear |
[+]Details |
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Polynomial from Weighted clique on the complement
Polynomial from Cliquewidth expression
Linear on permutation
[1164]
Polynomial on 2K2-free
[1160]
Polynomial [O(V^2)]
on circle
[1121]
Polynomial [O(E + V log V)]
on multitolerance
[1497]
Polynomial on subtree overlap
[1123]
Polynomial [O(n^{6p+2})]
on (p,q<=2)-colorable
[1116]
Polynomial on perfect
[476]
Polynomial on (P5,X82,X83)-free
[1246]
Polynomial [O(V^2)]
on tolerance
[1498]
Polynomial on nK2-free, fixed n
[1102]
Polynomial [O(V^4)]
on weakly chordal
[997]
Polynomial [O(n logn logn)]
on trapezoid
Polynomial on interval filament
[1159]
Polynomial on (P5,house)-free
[1109]
Polynomial [O(V^4)]
on AT-free
[160]
Polynomial [O(V log V)]
on tolerance
Polynomial on K2 ∪ claw-free
[1290]
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