A local to global question for linear functionals

Abstract

Let F be an algebraically closed field and let n≥ 3. Consider V=Fn with standard basis \e1,…,en\ and its dual space V*= HomF-lin(V,F) with dual basis \y1,…,yn\⊂eq V* and let y = Σi yi ei∈ V* V. Let d<n and consider the vectors q1,…,qd∈ V* V. In this note we consider the question of whether y(v) = v ∈ SpanF(q1(v),…,qd(v)) for all v∈ V implies that y∈ SpanF(q1,…,qd). We show this is true for d=1 or d=2, but that additional properties are needed for d≥ 3. We then interpret this result in terms of subspaces of Mn(F) that do not contain any rank 1 idempotents.