On m-ovoids of Q+(7,q) with q odd

Abstract

In this paper, we provide a construction of (q+1)-ovoids of the hyperbolic quadric Q+(7,q), q an odd prime power, by glueing (q+1)/2-ovoids of the elliptic quadric Q-(5,q). This is possible by controlling some intersection properties of (putative) m-ovoids of elliptic quadrics. It yields eventually (q+1)-ovoids of Q+(7,q) not coming from a 1-system. Secondly, we also construct m-ovoids for m ∈ \ 2,4,6,8,10\ in Q+(7,3). Therefore we first investigate how to construct spreads of (3,q) that have as many secants to an elliptic quadric as possible.