On the automorphism group of a distance-regular graph

Abstract

The motion of a graph is the minimal degree of its full automorphism group. Babai conjectured that the motion of a primitive distance-regular graph on n vertices of diameter greater than two is at least n/C for some universal constant C > 0, unless the graph is a Johnson or Hamming graph. We prove that the motion of a distance-regular graph of diameter d ≥ 3 on n vertices is at least Cn/( n)6 for some universal constant C > 0, unless it is a Johnson, a Hamming or a crown graph. This follows using an improvement of an earlier result by Kivva who gave a lower bound on motion of the form n/cd, where cd depends exponentially on d. As a corollary we derive a quasipolynomial upper bound for the automorphism group of a primitive distance-regular graph acting edge-transitively on the graph and on its distance-2 graph. The proofs use elementary combinatorial arguments and do not depend on the classification of finite simple groups.

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