A characterization of Johnson and Hamming graphs and proof of Babai's conjecture
Abstract
One of the central results in the representation theory of distance-regular graphs classifies distance-regular graphs with μ≥ 2 and second largest eigenvalue θ1= b1-1. In this paper we give a classification under the (weaker) approximate eigenvalue constraint θ1≥ (1-)b1 for the class of geometric distance-regular graphs. As an application, we confirm Babai's conjecture on the minimal degree of the automorphism group of distance-regular graphs.
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