A spectral characterization of the s-clique extension of the triangular graphs
Abstract
A regular graph is co-edge regular if there exists a constant μ such that any two distinct and non-adjacent vertices have exactly μ common neighbors. In this paper, we show that for integers s 2 and n large enough, any co-edge-regular graph which is cospectral with the s-clique extension of the triangular graph T((n) is exactly the s-clique extension of the triangular graph T(n).
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