A note on an infinite family of graphs with all different integral Laplacian eigenvalues
Abstract
In this note, we give an infinite family of optimal graphs called G+(d,c). They are optimal in the sense that they have the maximum possible number of vertices for given a diameter d and the so-called `outer multiset dimension' c. We provide their spectra, which have the property that their Laplacian eigenvalues are all different and integral. Finally, we also obtained their eigenvectors.
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