Proof of a conjecture on eigenvalues of transposition graph
Abstract
The transposition graph Cay(Sn,Tn) is the Cayley graph on the symmetric group Sn generated by the set Tn of all transpositions. In this paper, we show that each integer in the interval [-(2n+1)/3 2, (2n+1)/3 2] is an eigenvalue of Cay(Sn,Tn). This proves a recent conjecture by Kravchuk Kravchuk.
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