Splitting of Local Cohomology of Syzygies of the Residue Field

The Galois group of a Galois extension of local fields with an inseparable residue class field extension has two intertwined filtrations with ramification groups. This note contains some elementary results on the structure of these filtrations, that are similar to those given by J.-P. Serre in "Corp

We prove that two arithmetically significant extensions of a field F coincide if w x and only if the Witt ring WF is a group ring ‫ޚ‬rn G . Furthermore, working modulo squares with Galois groups which are 2-groups, we establish a theorem analogous to Hilbert's Theorem 90 and show that an identity li

This paper gives characterizations for the largest non-vanishing degree of the local cohomology modules of a graded ring S in terms of a reduction of S and of q the associated graded ring of an ideal I in terms of any reduction of I. As a consequence, this invariant can be computed explicitly for th

If is a split Lie algebra, which means that is a Lie algebra with a root decomposition = + α∈ α , then the roots of can be classified into different types: a root α ∈ is said to be of nilpotent type if all subalgebras x α x -α = span x α x -α x α x -α for x ±α ∈ ±α are nilpotent, and of simple type