Automorphism group of the graph A(n,k,r)
Abstract
Let [n](k) be the set of all ordered k-tuples of distinct elements in [n]=\1,2,...,n\. The (n,k,r)-arrangement graph A(n,k,r) with 1≤ r≤ k≤ n, is the graph with vertex set [n](k) and with two k-tuples are adjacent if they differ in exactly r coordinates. In this manuscript, we characterize the full automorphism groups of A(n,k,r) in the cases that 1≤ r=k≤ n and r=2<k=n. Thus, we resolve two special cases of an open problem proposed by Fu-Gang Yin, Yan-Quan Feng, Jin-Xin Zhou and Yu-Hong Guo. In addition, we conclude with a bold conjecture.
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