On Hellus--Lyubeznik--Yildirim's conjecture of local cohomology modules

Abstract

The goal of this paper is to study the so--called Hellus--Lyubeznik--Yildirim (HLY) conjecture, that predicts the following: given a regular local ring (R,m), and any ideal I⊂ R, zero is an associated prime ideal of the Matlis dual of any non--zero local cohomology module supported on I. Among other results, we give some partial positive answers to this conjecture in the following cases: when depth (R/I)=1, when depth (R/I)=2 under some extra assumptions, when I is a squarefree monomial ideal inside a formal power series ring over a field, and when R is a formal power series over a discrete valuation ring of mixed characteristic.