Difference between revisions of "Threshold graph"
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| + | A finite unoriented graph $G=(V,E)$ with a weight function $w : V \rightarrow \mathbf{R}$ and a threshold value $T$ such that a set $S$ of vertices is independent (has no edges) if and only if $\sum_{v \in S} w(v) < T$. | ||
| + | Each of the following properties characterises threshold graphs: | ||
| + | |||
| + | * They have [[Dilworth number]] $1$: for any two vertices $x,y$, one of the neighbourhoods $N(x)$, $N(y)$ contains the other. | ||
| + | * They have no [[induced subgraph]] of the form $K_{2,2}$ (complete bipartite on $2+2$ points) , $C_4$ (cycle of length $4$) or $P_4$ (path of length $4$). | ||
| + | * They are the [[comparability graph]]s of [[threshold order]]s. | ||
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| + | A graph $G$ is a threshold graph if and only if the [[graph complement]] $\bar G$ is a threshold graph. | ||
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| + | There is a polynomial time algorithm for computing the Dilworth number of a finite graph and so for recognising a threshold graph. | ||
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| + | ==References== | ||
| + | * Andreas Brandstädt, Van Bang Le; Jeremy P. Spinrad, "Graph classes: a survey". SIAM Monographs on Discrete Mathematics and Applications '''3'''. Society for Industrial and Applied Mathematics (1999) {{ISBN|978-0-898714-32-6}} {{ZBL|0919.05001}} | ||
| + | * Golumbic, Martin Charles; Trenk, Ann N. ''Tolerance graphs'' Cambridge Studies in Advanced Mathematics '''89''' Cambridge University Press (2004) {{ISBN|0-521-82758-2}} {{ZBL|1091.05001}} | ||
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| + | {{TEX|done}} | ||
Latest revision as of 18:14, 1 June 2023
2020 Mathematics Subject Classification: Primary: 05C [MSN][ZBL]
A finite unoriented graph $G=(V,E)$ with a weight function $w : V \rightarrow \mathbf{R}$ and a threshold value $T$ such that a set $S$ of vertices is independent (has no edges) if and only if $\sum_{v \in S} w(v) < T$. Each of the following properties characterises threshold graphs:
- They have Dilworth number $1$: for any two vertices $x,y$, one of the neighbourhoods $N(x)$, $N(y)$ contains the other.
- They have no induced subgraph of the form $K_{2,2}$ (complete bipartite on $2+2$ points) , $C_4$ (cycle of length $4$) or $P_4$ (path of length $4$).
- They are the comparability graphs of threshold orders.
A graph $G$ is a threshold graph if and only if the graph complement $\bar G$ is a threshold graph.
There is a polynomial time algorithm for computing the Dilworth number of a finite graph and so for recognising a threshold graph.
References
- Andreas Brandstädt, Van Bang Le; Jeremy P. Spinrad, "Graph classes: a survey". SIAM Monographs on Discrete Mathematics and Applications 3. Society for Industrial and Applied Mathematics (1999) ISBN 978-0-898714-32-6 Zbl 0919.05001
- Golumbic, Martin Charles; Trenk, Ann N. Tolerance graphs Cambridge Studies in Advanced Mathematics 89 Cambridge University Press (2004) ISBN 0-521-82758-2 Zbl 1091.05001
How to Cite This Entry:
Threshold graph. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Threshold_graph&oldid=37332
Threshold graph. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Threshold_graph&oldid=37332