Labeled Packing of Non Star Tree into its Fifth Power and Sixth Power
Abstract
In this paper we prove that we can find a labeled packing of a non star tree T into T6 with mT+n-mT5 labels, where n is the number of vertices of T and mT is the maximum number of leaves that can be removed from T in such a way that the obtained graph is a non star tree. Also, we prove that we can find a labeled packing of a non star tree T into T5 with mT+1 labels and a labeled packing of a path Pn, n≥ 4, into Pn4 with n4 labels.
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