$P_4$--sparse graphs

Graphclass: P₄-sparse

Definition:

A graph is P₄-sparse if every set of five vertices contains at most one induced P₄ .

References

Equivalent classes

Only references for direct inclusions are given. Where no reference is given for an equivalent class, check other equivalent classes or use the Java application.

(5,1)
(C₅,P,P₅,P,co-fork,fork,house)-free

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.

Problems

3-Colourability

[?]

Input:	A graph G in this class.
Output:	True iff each vertex of G can be assigned one colour out of 3 such that whenever two vertices are adjacent, they have different colours.

Linear

[+]Details

Linear from Colourability
Linear from Cliquewidth expression
Polynomial from Colourability
Polynomial from Cliquewidth expression

Polynomial on P₆-free [1243]
Polynomial on P₅-free [1242] [1441]

Clique

[?]

Input:	A graph G in this class and an integer k.
Output:	True iff G contains a set S of pairwise adjacent vertices, with \|S\| >= k.

Linear

[+]Details

Linear from Weighted clique
Polynomial from Weighted clique
Polynomial from Independent set on the complement

Linear on Welsh-Powell perfect [221]
Linear on Matula perfect [221]
Polynomial on circular perfect [1408]
Polynomial on biclique separable [1304]

Clique cover

[?]

Input:	A graph G in this class and an integer k.
Output:	True iff the vertices of G can be partitioned into k sets S_i, such that whenever two vertices are in the same set S_i, they are adjacent.

Polynomial

[+]Details

Polynomial from Colourability on the complement
Polynomial from Cliquewidth expression

Cliquewidth

[?]

Whether the cliquewidth of the graphs in this class is bounded by a constant k .
The cliquewidth of a graph is the number of different labels that is needed to construct the graph using the following operations:

creation of a vertex with label i,
disjoint union,
renaming labels i to label j,
connecting all vertices with label i to all vertices with label j.

Bounded

[+]Details

Bounded from Cliquewidth on the complement

Bounded on semi-P₄-sparse [1186]
Bounded on probe P₄-sparse
Bounded on (9,6) [488]
Bounded on (q,q-4), fixed q [1175]
Bounded on cliquewidth 4
Bounded on (P,P,co-fork,fork)-free [1185]
Bounded on (q, q-3), fixed q>= 7 [1176]
Bounded on (7,3) [1175]
Bounded on (5,1) [1175]
Bounded on (P,fork,house)-free [1185] [1186]
Bounded on partner-limited [1179]
Bounded on (P₅,fork,house)-free [1185] [402]

Cliquewidth expression

[?]

Input:	A graph G in this class.
Output:	An expression that constructs G according to the rules for cliquewidth, using only a constant number of labels. Undefined if this class has unbounded cliquewidth.

Linear

[+]Details

Polynomial from Cliquewidth
Polynomial from Cliquewidth expression on the complement

Linear on (P₅,fork,house)-free [1185] [402]
Linear on (5,1) [1175]
Linear on partner-limited [1179]
Linear on (P,P,co-fork,fork)-free [1185]
Linear on (q, q-3), fixed q>= 7 [1176]
Linear on (9,6) [488]
Linear on (P,fork,house)-free [1185] [1186]
Linear on semi-P₄-sparse [1186]
Linear on (7,3) [1175]
Linear on (q,q-4), fixed q [1175]
Linear on P₄-tidy [1175]
Linear on P₄-tidy [1175]

Colourability

[?]

Input:	A graph G in this class and an integer k.
Output:	True iff each vertex of G can be assigned one colour out of k such that whenever two vertices are adjacent, they have different colours.

Linear

[+]Details

Polynomial from Cliquewidth expression
Polynomial from Clique cover on the complement

Linear on Welsh-Powell perfect [221]
Linear on Matula perfect [221]
Polynomial [O(V^4E)] on weakly chordal [530]
Polynomial [O(VE)] on perfectly orderable [1424] [1382]
Polynomial on perfect [476]
Polynomial on biclique separable [1304]
Polynomial on circular perfect [1408]

Domination

[?]

Input:	A graph G in this class and an integer k.
Output:	True iff G contains a set S of vertices, with \|S\| <= k, such that every vertex in G is either in S or adjacent to a vertex in S.

Linear

[+]Details

Linear from Cliquewidth expression
Polynomial from Cliquewidth expression

Independent set

[?]

Input:	A graph G in this class and an integer k.
Output:	True iff G contains a set S of pairwise non-adjacent vertices, such that \|S\| >= k.

Linear

[+]Details

Linear from Weighted independent set
Polynomial from Weighted independent set
Polynomial from Clique on the complement

Linear on partner-limited [1180]
Linear on P₄-tidy [440]
Linear on extended P₄-laden [438]
Polynomial [O(VE)] on (P,P₅)-free [1117]
Polynomial on co-biclique separable [1304]
Polynomial [O(V^{5})] on (K_3,3-e,P₅,X₉₉)-free [1307]
Polynomial [O(nm)] on (K_3,3-e,P₅,X₉₈)-free [1117]
Polynomial on (K_3,3-e,P₅)-free [1246]
Polynomial on (P,P₈)-free [1306]
Polynomial on (E,P)-free [1305]
Polynomial on (P,T₂)-free [1305]
Polynomial [O(V^8)] on (P,P₇)-free [1351]
Polynomial on (P,star_1,2,5)-free [1349]
Polynomial [O(VE)] on weakly chordal [530] [1119]
Polynomial on Meyniel [169]

Recognition

[?]

Input:	A graph G.
Output:	True iff G is in this graph class.

Linear

[+]Details

Linear [620]
Polynomial on (C₅,P,P₅,P,co-fork,fork,house)-free

Treewidth

[?]

Input:	A graph G in this class and an integer k.
Output:	True iff the treewidth of G is at most k (see bounded treewidth).

Polynomial

[+]Details

Polynomial [O((V+E) log V)] on weak bipolarizable [1419]
Polynomial on weakly chordal [1421]
Polynomial on (q,q-4), fixed q [1422]
Polynomial on HHD-free [1420]

Weighted clique

[?]

Input:	A graph G in this class with weight function on the vertices and a real k.
Output:	True iff G contains a set S of pairwise adjacent vertices, such that the sum of the weights of the vertices in S is at least k.

Linear

[+]Details

Linear from Cliquewidth expression
Polynomial from Weighted independent set on the complement
Polynomial from Cliquewidth expression

Polynomial [O(VE)] on perfectly orderable [1424]

Weighted independent set

[?]

Input:	A graph G in this class with weight function on the vertices and a real k.
Output:	True iff G contains a set S of pairwise non-adjacent vertices, such that the sum of the weights of the vertices in S is at least k.

Linear

[+]Details

Linear from Cliquewidth expression
Polynomial from Cliquewidth expression

Polynomial on perfect [476]
Polynomial on fork-free [1099]
Polynomial on semi-P₄-sparse [402]
Polynomial on (P₅,house)-free [1109]
Polynomial [O(V^4)] on weakly chordal [997]
Polynomial on (P,P₅)-free [1353]
Polynomial on (n+4)-pan-free [1447]
Polynomial [O(VE)] on (P,fork)-free [1125]
Polynomial on (P₅,co-fork)-free [1161]
Polynomial [O(VE)] on (P₅,fork)-free [1125]
Polynomial on (P₅,X₈₂,X₈₃)-free [1246]
Polynomial [O(V^9 E)] on (P,P₇)-free [1452]
Polynomial on (co-fork,hole)-free [1494]

Graphclass: P₄-sparse

References

Equivalent classes

Complement classes

Inclusions

Map

Minimal superclasses

Maximal subclasses

Problems

Graphclass: P4-sparse

References

Equivalent classes

Complement classes

Related classes

Inclusions

Map

Minimal superclasses

Maximal subclasses

Problems

Graphclass: P₄-sparse