On the automorphism group of a putative Conway 99-graph

Abstract

Let be a Conway 99-graph, that is, a strongly regular graph with parameters (99,14,1,2). In Makhnev and Minakova (On automorphisms of strongly regular graphs with parameters λ =1, μ= 2, Discrete Math.\ Appl.\ 14 (2) (2004) 201-210), the authors prove that the automorphism group G of must have order dividing 2· 33· 7· 11. They further show that if |G| is divisible by 2 then |G| must divide 42. In the present paper, we refine these results by proving that divisibility by 7 implies G Z7. As a consequence, divisibility by 2 implies |G| divides 6, G is isomorphic to one of Z2, Z6, S3.