On the classification of low degree ovoids of Q+(5,q)
Abstract
Ovoids of the Klein quadric Q+(5,q) of PG(5,q) have been studied in the last 40 year, also because of their connection with spreads of PG(3,q) and hence translation planes. Beside the classical example given by a three dimensional elliptic quadric (corresponding to the regular spread of PG(3,q)) many other classes of examples are known. First of all the other examples (beside the elliptic quadric) of ovoids of Q(4,q) give also examples of ovoids of Q+(5,q). Another important class of ovoids of Q+(5,q) is given by the ones associated to a flock of a three dimensional quadratic cone. To every ovoid of Q+(5,q) two bivariate polynomials f1(x,y) and f2(x,y) can be associated. In this paper, we classify ovoids of Q+(5,q) such that f1(x,y)=y+g(x) and \deg(f1),deg(f2)\<(16.3q)313-1, that is f1(x,y) and f2(x,y) have "low degree" compared with q.
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