Minimum supports of eigenfunctions with the second largest eigenvalue of the Star graph
Abstract
The Star graph Sn, n 3, is the Cayley graph on the symmetric group Symn generated by the set of transpositions \(12),(13),…,(1n)\. In this work we study eigenfunctions of Sn corresponding to the second largest eigenvalue n-2. For n 8 and n=3, we find the minimum cardinality of the support of an eigenfunction of Sn corresponding to the second largest eigenvalue and obtain a characterization of eigenfunctions with the minimum cardinality of the support.
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