Extensions of strongly regular graphs with eigenvalue 2 (Q416908)

A graph \(G\) is called an edge-regular graph with parameters \((v,k,\lambda)\) if it is a regular graph of order \(v\) and degree \(k\) and each of its edges lies in \(\lambda\) triangles. \(G\) is called amply regular with parameters \((v,k,\lambda ,\mu )\) if it is edge-regular with the corresponding parameters and \(N(a)\cap N(b)\) contains exactly \(\mu \) vertices for any two vertices \(a\) and \(b\) such that their distance \(d(a,b)=2\). In this paper the amply regular graphs in which the neighborhoods of vertices are strongly regular with parameters \(v=(2s^{2}+5s+3)/3\), \(k=(2s^{2}-4s)/3\), \(\lambda =(2s^{2}-13s+24)/3\), and \(\mu = (2s^{2}-10s+12)/3\), where \(s \equiv -1 \pmod 3\) are studied.