Alexander L. Gavrilyuk, Vladislav V. Kabanov
Published 2023-06-14Version 1
In 2022, the second author found a prolific construction of strongly regular graphs, which is based on joining a coclique and a divisible design graph with certain parameters. The construction produces strongly regular graphs with the same parameters as the complement of the symplectic graph $\mathsf{Sp}(2d,q)$. In this paper, we determine the parameters of strongly regular graphs which admit a decomposition into a divisible design graph and a coclique attaining the Hoffman bound. In particular, it is shown that when the least eigenvalue of such a strongly regular graph is a prime power, its parameters coincide with those of the complement of $\mathsf{Sp}(2d,q)$. Furthermore, a generalization of the construction is discussed.
Deza graphs with parameters $(n,k,k-1,a)$ and $β=1$
Divisible design graphs with parameters $(4n,n+2,n-2,2,4,n)$ and $(4n,3n-2,3n-6,2n-2,4,n)$
The vertex connectivity of some classes of divisible design graphs
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