On line-parallelisms of PG(3, q)

Abstract

Let PG(3, q) denote the three-dimensional projective space over the finite field with q elements. A line-spread of PG(3, q) is a collection S of mutually skew lines such that every point of PG(3, q) lies on exactly one line of S. A parallelism of PG(3, q) is a set of mutually skew line-spreads of PG(3, q) such that every line of PG(3, q) is contained in precisely one line-spread of . For a Desarguesian spread D and an elementary abelian group E of order q2 that stabilizes D and one of its lines, let T be the class of parallelisms of PG(3, q) admitting E, and comprising D and q2+q Hall spreads, each of which is obtained by switching one of the q2+q reguli of D through its E-fixed line. In this paper, the parallelisms in T are characterized geometrically and enumerated. Moreover, it is shown that T contains at least (qq-1 q!) mutually inequivalent parallelisms for q even, and at least (q2q-3) mutually inequivalent parallelisms when q is odd.