A note on block-and-bridge preserving maximum common subgraph algorithms for outerplanar graphs
DOI:
https://doi.org/10.7155/jgaa.00480Abstract
Schietgat, Ramon and Bruynooghe [Schietgal et al., AMAI, 2013] proposed a polynomial-time algorithm for computing a maximum common subgraph under the block-and-bridge preserving subgraph isomorphism (BBP-MCS) for outerplanar graphs. We show that the article contains the following errors:- The running time of the presented approach is claimed to be $\mathcal{O}(n^{2.5})$ for two graphs of order $n$. We show that the algorithm of the authors allows no better bound than $\mathcal{O}(n^4)$ when using state-of-the-art general purpose methods to solve the matching instances arising as subproblems. This is even true for the special case, where both input graphs are trees.
- The article suggests that the dissimilarity measure derived from BBP-MCS is a metric. We show that the triangle inequality is not always satisfied and, hence, it is not a metric. Therefore, the dissimilarity measure should not be used in combination with techniques that rely on or exploit the triangle inequality in any way.
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Published
2018-09-01
How to Cite
Kriege, N., Droschinsky, A., & Mutzel, P. (2018). A note on block-and-bridge preserving maximum common subgraph algorithms
for outerplanar graphs. Journal of Graph Algorithms and Applications, 22(4), 607–616. https://doi.org/10.7155/jgaa.00480
License
Copyright (c) 2018 Nils Kriege, Andre Droschinsky, Petra Mutzel
This work is licensed under a Creative Commons Attribution 4.0 International License.