Some Combinatorial Problems on Halin Graphs
Abstract
Let T be a tree with no degree 2 vertices and L(T)=\l1,…,lr\, r ≥ 2 denote the set of leaves in T. An Halin graph G is a graph obtained from T such that V(G)=V(T) and E(G)=E(T) \\li,li+1\ ~|~ 1 ≤ i ≤ r-1\ \l1,lr\. In this paper, we investigate combinatorial problems such as, testing whether a given graph is Halin or not, chromatic bounds, an algorithm to color Halin graphs with the minimum number of colors. Further, we present polynomial-time algorithms for testing and coloring problems.
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