k-NIM trees: Characterization and Enumeration

Abstract

Among those real symmetric matrices whose graph is a given tree T, the maximum multiplicity M(T) that can be attained by an eigenvalue is known to be the path cover number of T. We say that a tree is k-NIM if, whenever an eigenvalue attains a multiplicity of k-1 less than the maximum multiplicity, all other multiplicities are 1. 1-NIM trees are known as NIM trees, and a characterization for NIM trees is already known. Here we provide a graph-theoretic characterization for k-NIM trees for each k≥ 1, as well as count them. It follows from the characterization that k-NIM trees exist on n vertices only when k=1,2,3. In case k=3, the only 3-NIM trees are simple stars.