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Abstract
A block matrix A=(Aij ) n×n is called a block circulant matrix, denoted by C(A 11, A 12, …, A 1n ) if Aij =A 1,j−i+1 for all 1⩽i, j⩽n, where Aij is a matrix and j−i+1 is taken modulo n. Especially when all Aij are of order 1, A is called a circulant matrix. A digraph is called a (block) circulant digraph if its adjacency matrix is congruent to a (block) circulant matrix. In this article we will calculate the characteristic polynomials and spectra of several special block circulant graphs having some physical and chemical backgrounds.
Acknowledgments
This project supported by NSFC (No.11171279,11171134).