2021
DOI: 10.1137/20m1313301
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The Recognition Problem of Graph Search Trees

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Cited by 8 publications
(9 citation statements)
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“…In the graph depicted in Figure 2(b), every vertex is avoidable, but neither x 1 nor x 2 can be the end vertex of an MCS. Furthermore, just as in the case of LBFS, deciding whether a vertex is an end vertex of MCS is NP-complete [5].…”
Section: Computing Avoidable Verticesmentioning
confidence: 99%
“…In the graph depicted in Figure 2(b), every vertex is avoidable, but neither x 1 nor x 2 can be the end vertex of an MCS. Furthermore, just as in the case of LBFS, deciding whether a vertex is an end vertex of MCS is NP-complete [5].…”
Section: Computing Avoidable Verticesmentioning
confidence: 99%
“…We first show that LexBFS and LexDFS have the same set of L-trees on chordal graphs. This fact is also implied by a more general result in [1]. Since this work has not been published yet and we only need a special case here, we give an alternative proof for the sake of completeness.…”
Section: Lexdfs On Chordal Graphsmentioning
confidence: 58%
“…Note that this result does not hold for search orders and their corresponding trees in general (if P = N P). Beisegel et al [1,2] show for example that the recognition problem of F-trees of both LexBFS and LexDFS is N P-complete, whereas it is easy to recognize the corresponding orders.…”
Section: There Is An Algorithm With Running Time In O(m ) For Any Gra...mentioning
confidence: 99%
See 1 more Smart Citation

Linear Time LexDFS on Chordal Graphs

Beisegel,
Köhler,
Scheffler
et al. 2020
Preprint
Self Cite
“…Furthermore, they extended these results to several graph classes. Recently, Beisegel et al [2] proved N P-hardness results for MCS and MNS, and they also provided linear time algorithms for this problem on split graphs and unit interval graphs.…”
Section: F-tree (L-tree) Recognition Problemmentioning
confidence: 99%