On the (non-)existence of tight distance-regular graphs: a local approach

Abstract

Let denote a distance-regular graph with diameter D≥ 3. Jurisi\'c and Vidali conjectured that if is tight with classical parameters (D,b,α,β), b≥ 2, then is not locally the block graph of an orthogonal array nor the block graph of a Steiner system. In the present paper, we prove this conjecture and, furthermore, extend it from the following aspect. Assume that for every triple of vertices x, y, z of , where x and y are adjacent, and z is at distance 2 from both x and y, the number of common neighbors of x, y, z is constant. We then show that if is locally the block graph of an orthogonal array (resp. a Steiner system) with smallest eigenvalue -m, m≥ 3, then the intersection number c2 is not equal to m2 (resp. m(m+1)). Using this result, we prove that if a tight distance-regular graph is not locally the block graph of an orthogonal array or a Steiner system, then the valency (and hence diameter) of is bounded by a function in the parameter b=b1/(1+θ1), where b1 is the intersection number of and θ1 is the second largest eigenvalue of .

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