Item Details

Homological Methods, Singularities, and Numerical Invariants

De Stefani, Alessandro
Format
Thesis/Dissertation; Online
Author
De Stefani, Alessandro
Advisor
Huneke, Craig
Abstract
The contents of this dissertation are various in nature and background. A connection between them is a common effort to measure the singularities of a commutative Noetherian ring using homological tools, and associated numerical invariants. First, we study the index of a Gorenstein local ring, a numerical invariant that is defined in terms of Auslander's delta invariant. In particular, we find a counterexample to a conjecture of Songqing Ding relating the index and the minimal Löewy length of an Artinian reduction of the ring. Successively, we focus on two numerical invariants for rings of prime characteristic, the F-pure threshold and the diagonal F-threshold. We relate them with a third number, the a-invariant, proving most of a conjecture made by Hirose, Watanabe, and Yoshida. Finally, we study Golod rings. We present an example of a quotient of a polynomial ring over a field by a product of monomial ideals that is not Golod. This answers, in negative, a question of Welker.
Language
English
Date Received
20160407
Published
University of Virginia, Department of Mathematics, PHD (Doctor of Philosophy), 2016
Published Date
2016-04-01
Degree
PHD (Doctor of Philosophy)
Collection
Libra ETD Repository
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