Further Results on the Quadratic Embedding Constants of Corona Graphs

Abstract

The quadratic embedding constant (QEC) is a numerical invariant associated with quadratic embeddings of graphs into Hilbert spaces, and it is characterized in terms of the distance matrix. For corona graphs G H, a general expression for QEC(G H) can be described using QEC(G) together with spectral properties of H. However, this expression involves an additional spectral contribution determined by the adjacency matrix of H. In this paper, we analyze this contribution and provide an explicit description of the associated set , allowing us to determine the quantity γ = that appears in the general formula for QEC(G H). As applications, we compute the quadratic embedding constants for corona graphs of the form G H where H is a regular graph. Finally, we provide conditions on G and H under which the quadratic embedding constant of G H coincides with the second largest eigenvalue of the distance matrix.

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