Years and Authors of Summarized Original Work
2011; Mertzios
Problem Definition
Tolerance graphs model interval relations in such a way that intervals can tolerate a certain degree of overlap without being in conflict. A graph G = (V, E) on n vertices is a tolerance graph if there exists a collection \(I =\{ I_{v}\ \vert \ v \in V \}\) of closed intervals on the real line and a set \(t =\{ t_{v}\ \vert \ v \in V \}\) of positive numbers, such that for any two vertices u, v ∈ V , u v ∈ E if and only if \(\vert I_{u} \cap I_{v}\vert \geq \min \{ t_{u},t_{v}\}\), where | I | denotes the length of the interval I.
Tolerance graphs have been introduced in [3], in order to generalize some of the well-known applications of interval graphs. If in the definition of tolerance graphs we replace the operation “min” between tolerances by “max,” we obtain the class of max-tolerance graphs [7]. Both tolerance and max-tolerance graphs have attracted many research efforts (e.g., [4, 5, 7–10]) as they...
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Mertzios, G.B. (2016). Multitolerance Graphs. In: Kao, MY. (eds) Encyclopedia of Algorithms. Springer, New York, NY. https://doi.org/10.1007/978-1-4939-2864-4_684
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