论文信息 - Forbidden Induced Subgraphs and the Price of Connectivity for Feedback Vertex Set

Forbidden Induced Subgraphs and the Price of Connectivity for Feedback Vertex Set

Let fvs(G) and cfvs(G) denote the cardinalities of a minimum feedback vertex set and a minimum connected feedback vertex set of a graph G, respectively. For a graph class \({\cal G}\), the price of connectivity for feedback vertex set (poc-fvs) for \({\cal G}\) is defined as the maximum ratio cfvs(G)/fvs(G) over all connected graphs G in \({\cal G}\). It is known that the poc-fvs for general graphs is unbounded. We study the poc-fvs for graph classes defined by a finite family \({\cal H}\) of forbidden induced subgraphs. We characterize exactly those finite families \({\cal H}\) for which the poc-fvs for \({\cal H}\)-free graphs is bounded by a constant. Prior to our work, such a result was only known for the case where \(|{\cal H}|=1\).

Pim van 't Hof | Daniël Paulusma | Rémy Belmonte | Marcin Jakub Kaminski

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