Discrete Mathematics & Theoretical Computer Science (Oct 2017)

On rank-width of even-hole-free graphs

  • Isolde Adler,
  • Ngoc Khang Le,
  • Haiko Müller,
  • Marko Radovanović,
  • Nicolas Trotignon,
  • Kristina Vušković

DOI
https://doi.org/10.23638/DMTCS-19-1-24
Journal volume & issue
Vol. Vol. 19 no. 1, no. Graph Theory

Abstract

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We present a class of (diamond, even hole)-free graphs with no clique cutset that has unbounded rank-width. In general, even-hole-free graphs have unbounded rank-width, because chordal graphs are even-hole-free. A.A. da Silva, A. Silva and C. Linhares-Sales (2010) showed that planar even-hole-free graphs have bounded rank-width, and N.K. Le (2016) showed that even-hole-free graphs with no star cutset have bounded rank-width. A natural question is to ask, whether even-hole-free graphs with no clique cutsets have bounded rank-width. Our result gives a negative answer. Hence we cannot apply Courcelle and Makowsky's meta-theorem which would provide efficient algorithms for a large number of problems, including the maximum independent set problem, whose complexity remains open for (diamond, even hole)-free graphs.

Keywords