On the existence of a (2,3)-spread in V(7,2)

Abstract

An (s,t)-spread in a finite vector space V=V(n,q) is a collection F of t-dimensional subspaces of V with the property that every s-dimensional subspace of V is contained in exactly one member of F. It is remarkable that no (s,t)-spreads has been found yet, except in the case s=1. In this note, the concept α-point to a (2,3)-spread F in V=V(7,2) is introduced. A classical result of Thomas, applied to the vector space V, states that all points of V cannot be α-points to a given (2,3)-spread F in V. In this note, we strengthened this result by proving that every 6-dimensional subspace of V must contain at least one point that is not an α-point to a given (2,3)-spread of V.