Partial derivatives of a generic subspace of a vector space of forms: quotients of level algebras of arbitrary type
Abstract
Given a vector space V of homogeneous polynomials of the same degree over an infinite field, consider a generic subspace W of V. The main result of this paper is a lower-bound (in general sharp) for the dimensions of the spaces spanned in each degree by the partial derivatives of the forms generating W, in terms of the dimensions of the spaces spanned by the partial derivatives of the forms generating the original space V. Rephrasing our result in the language of commutative algebra (where this result finds its most important applications), we have: let A be a type t artinian level algebra with h-vector h=(1,h1,h2,...,he), and let, for c=1,2,...,t-1, Hc,gen=(1,H1c,gen,H2c,gen,...,Hec,gen) be the h-vector of the generic type c level quotient of A having the same socle degree e. Then we supply a lower-bound (in general sharp) for the h-vector Hc,gen. Explicitly, we will show that, for any u∈ 1,...,e , Huc,gen≥ 1 t2-1((t-c)he-u+(ct-1)hu). This result generalizes a recent theorem of Iarrobino (which treats the case t=2). Finally, we begin to obtain, as a consequence, some structure theorems for level h-vectors of type bigger than 2, which is, at this time, a very little explored topic.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.