Length of local cohomology of powers of ideals

Abstract

Let R be a polynomial ring over a field k with irrelevant ideal m and dimension d. Let I be a homogeneous ideal in R. We study the asymptotic behavior of the length of the modules Hi m(R/In) for n 0. We show that for a fixed number α ∈ Z, n→ ∞λ(Hi m(R/In)≥ -α n)nd<∞. Combining this with recent strong vanishing results gives that n→ ∞λ(Hi mR/In)nd<∞ in many situations. We also establish that the actual limit exists and is rational for certain classes of monomial ideals I such that the lengths of local cohomology of In are eventually finite. Our proofs use Gr\"obner deformation and Presburger arithmetic. Finally, we utilize more traditional commutative algebra techniques to show that n→ ∞λ(Hi m(R/In))nd>0 when R/I has "nice" singularities in both zero and positive characteristics.