A relative m-cover of a Hermitian surface is a relative hemisystem

Abstract

An m-cover of the Hermitian surface H(3,q2) of PG(3,q2) is a set S of lines of H(3,q2) such that every point of H(3,q2) lies on exactly m lines of S, and 0<m<q+1. Segre (1965) proved that if q is odd, then m=(q+1)/2, and called such a set S of lines a hemisystem. Penttila and Williford (2011) introduced the notion of a relative hemisystem: a set of lines R of H(3,q2), q even, disjoint from a symplectic subgeometry W(3,q) such that every point of H(3,q2) W(3,q) lies on exactly q/2 elements of R. In this paper, we provide an analogue of Segre's result by introducing relative m-covers of H(3,q2) with respect to a symplectic subgeometry and proving that m must necessarily be q/2.