On the maximum field of linearity of linear sets

Abstract

Let V denote an r-dimensional Fqn-vector space. For an m-dimensional Fq-subspace U of V assume that q ( vFqn U) ≥ 2 for each non zero vector v∈ U. If n≤ q then we prove the existence of an integer 1<d n such that the set of one-dimensional Fqn-subspaces generated by non-zero vectors of U is the same as the set of one-dimensional Fqn-subspaces generated by non-zero vectors of UFqd. If we view U as a point set of AG(r,qn), it means that U and U Fqd determine the same set of directions. We prove a stronger statement when n m. In terms of linear sets it means that an Fq-linear set of PG(r-1,qn) has maximum field of linearity Fq only if it has a point of weight one. We also present some consequences regarding the size of a linear set.