Some non-existence results on m-ovoids in classical polar spaces

Abstract

In this paper we develop non-existence results for m-ovoids in the classical polar spaces Q-(2r+1,q), W(2r-1,q) and H(2r,q2) for r>2. In [4] a lower bound on m for the existence of m-ovoids of H(4,q2) is found by using the connection between m-ovoids, two-character sets, and strongly regular graphs. This approach is generalized in [3] for the polar spaces Q-(2r+1,q), W(2r-1,q) and H(2r,q2), r>2. In [1] an improvement for the particular case H(4,q2) is obtained by exploiting the algebraic structure of the collinearity graph, and using the characterization of an m-ovoid as an intruiging set. In this paper, we use an approach based on geometrical and combinatorial arguments, inspired by the results from [10], to improve the bounds from [3].