Parallelisms of PG(3, R) admitting a 3-dimensional group

Abstract

Betten and Riesinger constructed Parallelisms of PG(3, R) with automorphism group SO(3, R) by applying the reducible SO(3, R)-action to a rotational Betten spread. This was generalized by the present author so as to include oriented parallelisms (i.e., parallelisms of oriented lines). In this way, a much larger class of examples was produced. Here we show that, apart from Clifford parallelism, these are the only topological parallelisms admitting an automorphism group of dimension 3 or larger. In particular, we show that a topological parallelism admitting the irreducible action of SO(3, R) is Clifford.