Line graphs constitute a rich and well-studied class of graphs. In this paper, we focus on three different topics related to line graphs of subcubic triangle-free graphs. First, we show that any such graph G has an independent set of size at least 3|V(G)|∕10, the bound being sharp. As an immediate consequence, we have that any subcubic triangle-free graph G, with ni vertices of degree i, has a matching of size at least 3n1∕20+3n2∕10+9n3∕20. Then we provide several approximate min-max theorems relating cycle-transversals and cycle-packings of line graphs of subcubic triangle-free graphs. This enables us to prove Jones’ Conjecture for claw-free graphs with maximum degree 4. Finally, we concentrate on the computational complexity of FEEDBACK VERTEX SET, HAMILTONIAN CYCLE and HAMILTONIAN PATH for subclasses of line graphs of subcubic triangle-free graphs.
CITATION STYLE
Munaro, A. (2017). On line graphs of subcubic triangle-free graphs. Discrete Mathematics, 340(6), 1210–1226. https://doi.org/10.1016/j.disc.2017.01.006
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