Introductory Workshop: Commutative Algebra: "Castelnuovo-Mumford Regularity for Standard Graded Rings Over Noetherian Base Rings-Pt 3"
Presenter
January 25, 2024
Keywords:
- Commutative rings
- computational commutative algebra
- D-modules
- free resolutions
- Gröbner deformations
- Homological conjectures
- Lech's conjecture
- maximal Cohen-Macaulay modules
- McKay correspondence
- mixed characteristic
- multiplicities
- perfectoid spaces
- prismatic cohomology
- symbolic powers
- syzygies
- Tight closure theory
MSC:
- 13-XX - Commutative algebra
- 14-XX - Algebraic geometry
Abstract
We will present a self-contained introduction to the Castelnuovo–Mumford regularity for standard graded rings over general Noetherian base rings. In particular, we will show that it can be defined in terms of the vanishing of local cohomology modules, vanishing of Koszul homology and the shifts in a minimal free resolution. We will present a proof of a classical result on regularity of the powers of an ideal due originally to Cutkosky, Herzog and Trung and, independently, to Kodiyalam. Variants for products of powers and generalizations will be discussed as well. Examples of determinantal or combinatorial nature will be presented.