Geodesic
Pretty good state transfer on circulant graphs
Hiranmoy Pal1 ; Bikash Bhattacharjya1
1Indian Institute of Technology Guwahati
The electronic journal of combinatorics, Tome 24 (2017) no. 2
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Let $G$ be a graph with adjacency matrix $A$. The transition matrix of $G$ relative to $A$ is defined by $H(t):=\exp{\left(-itA\right)}$, where $t\in {\mathbb R}$. The graph $G$ is said to admit pretty good state transfer between a pair of vertices $u$ and $v$ if there exists a sequence of real numbers $\{t_k\}$ and a complex number $\gamma$ of unit modulus such that $\lim\limits_{k\rightarrow\infty} H(t_k) e_u=\gamma e_v.$ We find that the cycle $C_n$ as well as its complement $\overline{C}_n$ admit pretty good state transfer if and only if $n$ is a power of two, and it occurs between every pair of antipodal vertices. In addition, we look for pretty good state transfer in more general circulant graphs. We prove that union (edge disjoint) of an integral circulant graph with a cycle, each on $2^k$ $(k\geq 3)$ vertices, admits pretty good state transfer. The complement of such union also admits pretty good state transfer. Using Cartesian products, we find some non-circulant graphs admitting pretty good state transfer.
DOI : 10.37236/6388
Classification : 05C12, 05C50
Mots-clés : circulant graph, pretty good state transfer, Kronecker approximation theorem

Hiranmoy Pal  1   ; Bikash Bhattacharjya  1

1 Indian Institute of Technology Guwahati 
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Hiranmoy Pal; Bikash Bhattacharjya. Pretty good state transfer on circulant graphs. The electronic journal of combinatorics, Tome 24 (2017) no. 2. doi: 10.37236/6388

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