We initiate the study of graph classes of power-bounded clique-width, that
is, graph classes for which there exist integers $k$ and $\ell$ such that the
$k$-th powers of the graphs are of clique-width at most $\ell$. We give
sufficient and necessary conditions for this property. As our main results, we
characterize graph classes of power-bounded clique-width within classes defined
by either one forbidden induced subgraph, or by two connected forbidden induced
subgraphs. We also show that for every positive integer $k$, there exists a
graph class such that the $k$-th powers of graphs in the class form a class of
bounded clique-width, while this is not the case for any smaller power.Comment: 23 pages, 4 figure
Artículo de publicación ISICircular-arc graphs are the intersection graphs of open arcs on a circle. Circle graphs are
the intersection graphs of chords on a circle. These graph classes have been the subject
of much study for many years and numerous interesting results have been reported.
Many subclasses of both circular-arc graphs and circle graphs have been defined and
different characterizations formulated. In this survey, we summarize the most important
structural results related to circular-arc graphs and circle graphs and present the main open
problems.The first author was partially supported by FONDECyT Grant 1110797 and Millennium Science Institute ‘‘Complex
Engineering Systems’’ (Chile). All the authors were partially supported by ANPCyT PICT-2007-00518, UBACyT Grant
20020090300094 and CONICET PIP 112-200901-00160 (Argentina)
A normal Helly circular-arc graph is the intersection graph of arcs on a circle of which no three or less arcs cover the whole circle. Lin, Soulignac, and Szwarcfiter [Discrete Appl. Math. 2013] characterized circular-arc graphs that are not normal Helly circular-arc graphs, and used it to develop the first recognition algorithm for this graph class. As open problems, they ask for the forbidden induced subgraph characterization and a direct recognition algorithm for normal Helly circular-arc graphs, both of which are resolved by the current paper. Moreover, when the input is not a normal Helly circular-arc graph, our recognition algorithm finds in linear time a minimal forbidden induced subgraph as certificate.
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