Linear subspaces of minimal codimension in hypersurfaces

Abstract

Let k be a perfect field and let X⊂ PN be a hypersurface of degree d defined over k and containing a linear subspace L defined over an algebraic closure k with codim PNL=r. We show that X contains a linear subspace L0 defined over k with codim PNL dr. We conjecture that the intersection of all linear subspaces (over k) of minimal codimension r contained in X, has codimension bounded above only in terms of r and d. We prove this when either d 3 or r 2.