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JGAA
2010

Intersection Graphs of Pseudosegments: Chordal Graphs

13 years 11 months ago
Intersection Graphs of Pseudosegments: Chordal Graphs
We investigate which chordal graphs have a representation as intersection graphs of pseudosegments. For positive we have a construction which shows that all chordal graphs that can be represented as intersection graphs of subpaths on a tree are pseudosegment intersection graphs. We then study the limits of representability. We identify certain intersection graphs of substars of a star which are not representable as intersection graphs of pseudosegments. The degree of the substars in these examples, however, has to be large. A more intricate analysis involving a Ramsey argument shows that even in the class of intersection graphs of substars of degree three of a star there are graphs that are not representable as intersection graphs of pseudosegments. Motivated by representability questions for chordal graphs we consider how many combinatorially different k-segments, i.e., curves crossing k distinct lines, an arrangement of n pseudolines can host. We show that for fixed k this number ...
Cornelia Dangelmayr, Stefan Felsner, William T. Tr
Added 28 Jan 2011
Updated 28 Jan 2011
Type Journal
Year 2010
Where JGAA
Authors Cornelia Dangelmayr, Stefan Felsner, William T. Trotter
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