Orthogonal Dual Hyperovals, Symplectic Spreads and Orthogonal Spreads
Abstract
Orthogonal spreads in orthogonal spaces of type V+(2n+2,2) produce large numbers of rank n dual hyperovals in orthogonal spaces of type V+(2n,2). The construction resembles the method for obtaining symplectic spreads in V(2n,q) from orthogonal spreads in V+(2n+2,q) when q is even.
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