On middle cube graphs
Abstract
We study a family of graphs related to the n-cube. The middle cube graph of parameter k is the subgraph of Q2k-1 induced by the set of vertices whose binary representation has either k-1 or k number of ones. The middle cube graphs can be obtained from the well-known odd graphs by doubling their vertex set. Here we study some of the properties of the middle cube graphs in the light of the theory of distance-regular graphs. In particular, we completely determine their spectra (eigenvalues and their multiplicities, and associated eigenvectors).
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