Decycling a graph by the removal of a matching: new algorithmic and structural aspects in some classes of graphs

A graph $G$ is {\em matching-decyclable} if it has a matching $M$ such that $G-M$ is acyclic. Deciding whether $G$ is matching-decyclable is an NP-complete problem even if $G$ is 2-connected, planar, and subcubic. In this work we present results on matching-decyclability in the following classes: Hamiltonian subcubic graphs, chordal graphs, and distance-hereditary graphs. In Hamiltonian subcubic graphs we show that deciding matching-decyclability is NP-complete even if there are exactly two vertices of degree two. For chordal and distance-hereditary graphs, we present characterizations of matching-decyclability that lead to $O(n)$-time recognition algorithms.

[1]  David S. Johnson,et al.  The Planar Hamiltonian Circuit Problem is NP-Complete , 1976, SIAM J. Comput..

[2]  Edward Howorka A characterization of ptolemaic graphs , 1981, J. Graph Theory.

[3]  Russell Merris,et al.  Split graphs , 2003, Eur. J. Comb..

[4]  Jayme Luiz Szwarcfiter,et al.  Decycling with a matching , 2017, Inf. Process. Lett..

[5]  Hans-Jürgen Bandelt,et al.  Distance-hereditary graphs , 1986, J. Comb. Theory, Ser. B.

[6]  C Berge,et al.  TWO THEOREMS IN GRAPH THEORY. , 1957, Proceedings of the National Academy of Sciences of the United States of America.

[7]  Sulamita Klein,et al.  Cycle transversals in bounded degree graphs , 2009, Discret. Math. Theor. Comput. Sci..

[8]  H. Whitney Non-Separable and Planar Graphs. , 1931, Proceedings of the National Academy of Sciences of the United States of America.

[9]  Gab-Byung Chae,et al.  Counting labeled general cubic graphs , 2007, Discret. Math..