The integral circulant graph $X_n (D)$ has the vertex set $Z_n = {0, 1,ldots$, $n{-}1}$ and vertices $a$ and $b$ are adjacent, if and only if $gcd(a{-}b$, $n)in D$, where $D = {d_1,d_2, ldots, d_k}$ is a set of divisors of $n$. These graphs play an important role in modeling quantum spin networks supporting the perfect state transfer and also have applications in chemical graph theory. In this paper, we deal with the automorphism group of integral circulant graphs and investigate a problem proposed in [W. Klotz, T. Sander, Some properties of unitary Cayley graphs, Electr. J. Comb. 14 (2007), #R45]. We determine the size and the structure of the automorphism group of the unitary Cayley graph $X_n (1)$ and the disconnected graph $X_n (d)$. In addition, based on the generalized formula for the number of common neighbors and the wreath product, we completely characterize the automorphism groups $Aut (X_n (1, p))$ for $n$ being a square-free number and $p$ a prime dividing $n$, and $Aut (X_n (1, p^k))$ for $n$ being a prime power.
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机译:积分循环图$ X_n(D)$具有顶点集$ Z_n = {0,1, ldots $,$ n {-} 1 } $,并且顶点$ a $和$ b $相邻,如果和仅在D $中的$ gcd(a {-} b $,$ n),其中$ D = {d_1,d_2, ldots,d_k } $是$ n $的除数的情况下。这些图在为支持完美状态转移的量子自旋网络建模中扮演重要角色,并且在化学图论中也有应用。在本文中,我们处理了积分循环图的自同构群,并研究了[W. Klotz,T. Sander ,, Cayley图的某些性质,Electr。 J.梳14(2007),#R45]。我们确定了单一Cayley图$ X_n(1)$和非连接图$ X_n(d)$的自同构群的大小和结构。此外,基于通用邻居数和花圈乘积的广义公式,我们完全刻画了自同构组$ Aut(X_n(1,p))$,其中$ n $是无平方数,$ p $素数除以$ n $,而$ n $的$ Aut(X_n(1,p ^ k))$是素数幂。
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