Hopf Algebras and Galois Module Theory

Hopf Algebras and Galois Module Theory
Author: Lindsay N. Childs
Publisher: American Mathematical Soc.
Total Pages: 311
Release: 2021-11-10
Genre: Education
ISBN: 1470465167

Hopf algebras have been shown to play a natural role in studying questions of integral module structure in extensions of local or global fields. This book surveys the state of the art in Hopf-Galois theory and Hopf-Galois module theory and can be viewed as a sequel to the first author's book, Taming Wild Extensions: Hopf Algebras and Local Galois Module Theory, which was published in 2000. The book is divided into two parts. Part I is more algebraic and focuses on Hopf-Galois structures on Galois field extensions, as well as the connection between this topic and the theory of skew braces. Part II is more number theoretical and studies the application of Hopf algebras to questions of integral module structure in extensions of local or global fields. Graduate students and researchers with a general background in graduate-level algebra, algebraic number theory, and some familiarity with Hopf algebras will appreciate the overview of the current state of this exciting area and the suggestions for numerous avenues for further research and investigation.

An Introduction to Hopf Algebras

An Introduction to Hopf Algebras
Author: Robert G. Underwood
Publisher: Springer Science & Business Media
Total Pages: 283
Release: 2011-08-30
Genre: Mathematics
ISBN: 0387727655

Only book on Hopf algebras aimed at advanced undergraduates

Brauer Groups, Hopf Algebras and Galois Theory

Brauer Groups, Hopf Algebras and Galois Theory
Author: Stefaan Caenepeel
Publisher: Springer Science & Business Media
Total Pages: 516
Release: 2002-03-31
Genre: Mathematics
ISBN: 9781402003462

This volume is devoted to the Brauer group of a commutative ring and related invariants. Part I presents a new self-contained exposition of the Brauer group of a commutative ring. Included is a systematic development of the theory of Grothendieck topologies and étale cohomology, and discussion of topics such as Gabber's theorem and the theory of Taylor's big Brauer group of algebras without a unit. Part II presents a systematic development of the Galois theory of Hopf algebras with special emphasis on the group of Galois objects of a cocommutative Hopf algebra. The development of the theory is carried out in such a way that the connection to the theory of the Brauer group in Part I is made clear. Recent developments are considered and examples are included. The Brauer-Long group of a Hopf algebra over a commutative ring is discussed in Part III. This provides a link between the first two parts of the volume and is the first time this topic has been discussed in a monograph. Audience: Researchers whose work involves group theory. The first two parts, in particular, can be recommended for supplementary, graduate course use.

Galois Theory, Hopf Algebras, and Semiabelian Categories

Galois Theory, Hopf Algebras, and Semiabelian Categories
Author: George Janelidze
Publisher: American Mathematical Soc.
Total Pages: 582
Release: 2004
Genre: Mathematics
ISBN: 0821832905

This volume is based on talks given at the Workshop on Categorical Structures for Descent and Galois Theory, Hopf Algebras, and Semiabelian Categories held at The Fields Institute for Research in Mathematical Sciences (Toronto, ON, Canada). The meeting brought together researchers working in these interrelated areas. This collection of survey and research papers gives an up-to-date account of the many current connections among Galois theories, Hopf algebras, and semiabeliancategories. The book features articles by leading researchers on a wide range of themes, specifically, abstract Galois theory, Hopf algebras, and categorical structures, in particular quantum categories and higher-dimensional structures. Articles are suitable for graduate students and researchers,specifically those interested in Galois theory and Hopf algebras and their categorical unification.

Hopf Algebras

Hopf Algebras
Author: Eiichi Abe
Publisher: Cambridge University Press
Total Pages: 304
Release: 2004-06-03
Genre: Mathematics
ISBN: 9780521604895

An introduction to the basic theory of Hopf algebras for those familiar with basic linear and commutative algebra.

Tensor Categories

Tensor Categories
Author: Pavel Etingof
Publisher: American Mathematical Soc.
Total Pages: 362
Release: 2016-08-05
Genre: Mathematics
ISBN: 1470434415

Is there a vector space whose dimension is the golden ratio? Of course not—the golden ratio is not an integer! But this can happen for generalizations of vector spaces—objects of a tensor category. The theory of tensor categories is a relatively new field of mathematics that generalizes the theory of group representations. It has deep connections with many other fields, including representation theory, Hopf algebras, operator algebras, low-dimensional topology (in particular, knot theory), homotopy theory, quantum mechanics and field theory, quantum computation, theory of motives, etc. This book gives a systematic introduction to this theory and a review of its applications. While giving a detailed overview of general tensor categories, it focuses especially on the theory of finite tensor categories and fusion categories (in particular, braided and modular ones), and discusses the main results about them with proofs. In particular, it shows how the main properties of finite-dimensional Hopf algebras may be derived from the theory of tensor categories. Many important results are presented as a sequence of exercises, which makes the book valuable for students and suitable for graduate courses. Many applications, connections to other areas, additional results, and references are discussed at the end of each chapter.

Quasi-Hopf Algebras

Quasi-Hopf Algebras
Author: Daniel Bulacu
Publisher: Cambridge University Press
Total Pages: 545
Release: 2019-02-21
Genre: Mathematics
ISBN: 1108427014

This self-contained book dedicated to Drinfeld's quasi-Hopf algebras takes the reader from the basics to the state of the art.