On the relationship between depth and cohomological dimension

Abstract

Let (S, m) be an n-dimensional regular local ring essentially of finite type over a field and let I be an ideal of S. We prove that if depth S/I 3, then the cohomological dimension cd(S, I) of I is less than or equal to n-3. We also show, under the assumption that S has an algebraically closed residue field of characteristic zero, that if depth S/I 4, then cd(S, I) n-4 if and only if the local Picard group of the completion S/I is torsion. We give a number of applications, including sharp bounds on cohomological dimension of ideals whose quotients satisfy good depth conditions such as Serre's conditions (Si).