Collineation group as a subgroup of the symmetric group

Abstract

Let be the projectivization (i.e., the set of one-dimensional vector subspaces) of a vector space of dimension 3 over a field. Let H be a closed (in the pointwise convergence topology) subgroup of the permutation group S of the set . Suppose that H contains the projective group and an arbitrary self-bijection of transforming a triple of collinear points to a non-collinear triple. It is well-known from KantorMcDonough that if is finite then H contains the alternating subgroup A of S. We show in Theorem density below that H=S, if is infinite.