Non-Defectivity of Grassmannians of planes

Abstract

Let Gr(k,n) be the Pl\"ucker embedding of the Grassmann variety of projective k-planes in n. For a projective variety X, let σs(X) denote the variety of its s-1 secant planes. More precisely, σs(X) denotes the Zariski closure of the union of linear spans of s-tuples of points lying on X. We exhibit two functions s0(n) s1(n) such that σs(Gr(2,n)) has the expected dimension whenever n≥ 9 and either s s0(n) or s1(n) s. Both s0(n) and s1(n) are asymptotic to n218. This yields, asymptotically, the typical rank of an element of 3 1pt Cn+1. Finally, we classify all defective σs(Gr(k,n)) for s 6 and provide geometric arguments underlying each defective case.