Abstract
The main result of this paper is an 01989 time algorithm for deciding whether a given graph is a circle graph, that is, the intersection graph of a set of chords on a circle. The algorithm utilizes two new graph-theoretic results, regarding necessary induced subgraphs of graphs having neither articulation points nor similar pairs of vertices. Furthermore, as a substep of the algorithm, it is shown how to find in 0([V] x [E]) time a decomposition of a graph into prime graphs, thereby improving on a result of Cunningham. © 1989, ACM. All rights reserved.
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Gabor, C. P., Supowit, K. J., & Hsu, W. L. (1989). Recognizing Circle Graphs in Polynomial Time. Journal of the ACM (JACM), 36(3), 435–473. https://doi.org/10.1145/65950.65951
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