Graphs with three distinct distance eigenvalues

Abstract

In this paper, some special distance spectral properties of graphs are considered. Concretely, we recursively construct an infinite family of trees with distance eigenvalue -1, and determine all \C3,C4\-free connected graphs with three distinct distance eigenvalues of which the smallest one is equal to -3, which partially answers a problem posed by Koolen, Hayat and Iqbal [Linear Algebra Appl. 505 (2016) 97--108]. Furthermore, we characterize all trees with three distinct distance eigenvalues.

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