Characterizations of strong semilinear embeddings in terms of general linear and projective linear groups

Abstract

Let V and V' be vector spaces over division rings. Suppose V is finite and not less than 3. Consider a mapping l:V V with the following property: for every u∈ GL(V) there is u'∈ GL(V') such that lu=u'l. Our first result states that l is a strong semilinear embedding if l|V0 is non-constant and the dimension of the subspace of V' spanned by l(V) is not greater than n. We present examples showing that these conditions can not be omitted. In some special cases, this statement can be obtained from Dicks and Hartley (1991) and Zha (1996). Denote by P(V) the projective space associated with V and consider the mapping f: P(V) P(V') with the following property: for every h∈ PGL(V) there is h'∈ PGL(V') such that fh=h'f. By the second result, f is induced by a strong semilinear embedding of V in V' if f is non-constant and its image is contained in a subspace of V' whose dimension is not greater than n, we also require that R' is a field.