Some results on Hamming graphs and an extended Hamming graphs

Abstract

In this paper we first obtain the spectrum of the folded hypercube in a new approach. Then we introduce a new family of graphs called the extended Hamming graph, denoted by EH(n,2n), which is constructed from the well-known Hamming graph H(n,2n). The graph EH(n,2n) shares the same vertex set as H(n,2n) but includes additional edges, called complementary edges, connecting each n-tuple vertex u to its complement uc, where uc is defined such that the sum of each two corresponding coordinates of u and uc equals 2n-1. We investigate several algebraic and structural properties of this new family of graphs. Specifically, we show that the diameter of EH(n,2n) is n. We prove that EH(n,2n) is a Cayley graph, but we demonstrate that it is not a distance regular graph. Finally, we determine the spectrum of EH(n,2n), showing that its eigenvalues are λi 1, where λi are the eigenvalues of the underlying Hamming graph H(n,2n). The multiplicity of each eigenvalue is explicitly calculated.

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