New Bounds for Partial Spreads of H(2d-1, q2) and Partial Ovoids of the Ree-Tits Octagon

Abstract

Two results are obtained that give upper bounds on partial spreads and partial ovoids respectively. The first result is that the size of a partial spread of the Hermitian polar space H(3, q2) is at most (2p3+p3 )t+1, where q=pt, p is a prime. For fixed p this bound is in o(q3), which is asymptotically better than the previous best known bound of (q3+q+2)/2. Similar bounds for partial spreads of H(2d-1, q2), d even, are given. The second result is that the size of a partial ovoid of the Ree-Tits octagon O(2t) is at most 26t+1. This bound, in particular, shows that the Ree-Tits octagon O(2t) does not have an ovoid.