A new near octagon and the Suzuki tower
Abstract
We construct and study a new near octagon of order (2,10) which has its full automorphism group isomorphic to the group G2(4):2 and which contains 416 copies of the Hall-Janko near octagon as full subgeometries. Using this near octagon and its substructures we give geometric constructions of the G2(4)-graph and the Suzuki graph, both of which are strongly regular graphs contained in the Suzuki tower. As a subgeometry of this octagon we have discovered another new near octagon, whose order is (2,4).
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