The clique-transversal number of a{K1,3,K4}-free 4-regular graph

Abstract: a b s t r a c tA clique of a graph G is a complete subgraph maximal under inclusion and having at least two vertices. A clique-transversal set D of a graph G is a set of vertices of G such that D meets all cliques of G. The clique-transversal number, denoted by τ c (G), is the cardinality of a minimum clique-transversal set in G. proved that τ c (G) = ⌈ n 3 ⌉ for any 2-connected {K 1,3 , K 4 }-free 4-regular graph of order n, and conjectured that τ c (G) ≤ 10n+3 27 for a connected {K 1,3 , K 4 }-free 4-regula… Show more

Graphs G Where $$G-N[v]$$ is a Tree for Each Vertex v

Graphs G Where $$G-N[v]$$ is a Tree for Each Vertex v

Graphs G where $$G-N[v]$$ is a regular graph for each vertex v

Graphs G in which G−N[v] has a prescribed property for each vertex

Zhang

¹

,

Wu

²

2022

Discrete Applied Mathematics

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