Spectrum of Cayley graphs on the symmetric group generated by transpositions
Abstract
For an integer n≥ 2, let Xn be the Cayley graph on the symmetric group Sn generated by the set of transpositions (1 2),(1 3),...,(1 n). It is shown that the spectrum of Xn contains all integers from -(n-1) to n-1 (except 0 if n=2 or n=3).
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