Abstract
The study of distance-regular graphs in which neighborhoods of vertices are strongly regular graphs with eigenvalue 3 was initiated by Makhnev. In particular, he reduced these graphs to graphs in which neighborhoods of vertices are exceptional graphs or pseudogeometric graphs for pG s−3(s, t). Makhnev and Paduchikh found parameters of exceptional graphs (see the proposition). In the present paper, we study amply regular graphs in which neighborhoods of vertices are exceptional strongly regular graphs with nonprincipal eigenvalue 3 and parameters from conditions 3–6 of the Proposition.
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