Completely Independent Spanning Trees in k-Outerplanar Triangulated Discs

Abstract

Let T1, T2, …, Tk be k spanning trees of a graph G. For any pair of vertices u and v, if the u--v paths in the k spanning trees are pairwise openly disjoint, then the spanning trees are called completely independent spanning trees (CISTs) of G. In this paper, we first prove that every 3-connected 2-outerplanar triangulated disc has two completely independent spanning trees. Next, for a 3-connected 3-outerplanar triangulated disc G, we provide sufficient conditions for G to have two completely independent spanning trees. We provide an example of a 3-connected 4-outerplanar triangulation that does not have two completely independent spanning trees.