The Strong Knneth Theorem For Topological Periodic Cyclic Homology
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Author |
: Andrew J. Blumberg |
Publisher |
: American Mathematical Society |
Total Pages |
: 114 |
Release |
: 2024-10-23 |
ISBN-10 |
: 9781470471385 |
ISBN-13 |
: 1470471388 |
Rating |
: 4/5 (85 Downloads) |
Synopsis The Strong K�nneth Theorem for Topological Periodic Cyclic Homology by : Andrew J. Blumberg
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Author |
: Andrew J. Blumberg |
Publisher |
: Cambridge University Press |
Total Pages |
: 441 |
Release |
: 2022-07-21 |
ISBN-10 |
: 9781009123297 |
ISBN-13 |
: 1009123297 |
Rating |
: 4/5 (97 Downloads) |
Synopsis Stable Categories and Structured Ring Spectra by : Andrew J. Blumberg
A graduate-level introduction to the homotopical technology in use at the forefront of modern algebraic topology.
Author |
: Gonçalo Tabuada |
Publisher |
: American Mathematical Soc. |
Total Pages |
: 127 |
Release |
: 2015-09-21 |
ISBN-10 |
: 9781470423971 |
ISBN-13 |
: 1470423979 |
Rating |
: 4/5 (71 Downloads) |
Synopsis Noncommutative Motives by : Gonçalo Tabuada
The theory of motives began in the early 1960s when Grothendieck envisioned the existence of a "universal cohomology theory of algebraic varieties". The theory of noncommutative motives is more recent. It began in the 1980s when the Moscow school (Beilinson, Bondal, Kapranov, Manin, and others) began the study of algebraic varieties via their derived categories of coherent sheaves, and continued in the 2000s when Kontsevich conjectured the existence of a "universal invariant of noncommutative algebraic varieties". This book, prefaced by Yuri I. Manin, gives a rigorous overview of some of the main advances in the theory of noncommutative motives. It is divided into three main parts. The first part, which is of independent interest, is devoted to the study of DG categories from a homotopical viewpoint. The second part, written with an emphasis on examples and applications, covers the theory of noncommutative pure motives, noncommutative standard conjectures, noncommutative motivic Galois groups, and also the relations between these notions and their commutative counterparts. The last part is devoted to the theory of noncommutative mixed motives. The rigorous formalization of this latter theory requires the language of Grothendieck derivators, which, for the reader's convenience, is revised in a brief appendix.
Author |
: Ralph Abraham |
Publisher |
: CRC Press |
Total Pages |
: 849 |
Release |
: 2019-04-24 |
ISBN-10 |
: 9780429689048 |
ISBN-13 |
: 0429689047 |
Rating |
: 4/5 (48 Downloads) |
Synopsis Foundations Of Mechanics by : Ralph Abraham
Foundations of Mechanics is a mathematical exposition of classical mechanics with an introduction to the qualitative theory of dynamical systems and applications to the two-body problem and three-body problem.
Author |
: James F. Davis |
Publisher |
: American Mathematical Society |
Total Pages |
: 385 |
Release |
: 2023-05-22 |
ISBN-10 |
: 9781470473686 |
ISBN-13 |
: 1470473682 |
Rating |
: 4/5 (86 Downloads) |
Synopsis Lecture Notes in Algebraic Topology by : James F. Davis
The amount of algebraic topology a graduate student specializing in topology must learn can be intimidating. Moreover, by their second year of graduate studies, students must make the transition from understanding simple proofs line-by-line to understanding the overall structure of proofs of difficult theorems. To help students make this transition, the material in this book is presented in an increasingly sophisticated manner. It is intended to bridge the gap between algebraic and geometric topology, both by providing the algebraic tools that a geometric topologist needs and by concentrating on those areas of algebraic topology that are geometrically motivated. Prerequisites for using this book include basic set-theoretic topology, the definition of CW-complexes, some knowledge of the fundamental group/covering space theory, and the construction of singular homology. Most of this material is briefly reviewed at the beginning of the book. The topics discussed by the authors include typical material for first- and second-year graduate courses. The core of the exposition consists of chapters on homotopy groups and on spectral sequences. There is also material that would interest students of geometric topology (homology with local coefficients and obstruction theory) and algebraic topology (spectra and generalized homology), as well as preparation for more advanced topics such as algebraic $K$-theory and the s-cobordism theorem. A unique feature of the book is the inclusion, at the end of each chapter, of several projects that require students to present proofs of substantial theorems and to write notes accompanying their explanations. Working on these projects allows students to grapple with the “big picture”, teaches them how to give mathematical lectures, and prepares them for participating in research seminars. The book is designed as a textbook for graduate students studying algebraic and geometric topology and homotopy theory. It will also be useful for students from other fields such as differential geometry, algebraic geometry, and homological algebra. The exposition in the text is clear; special cases are presented over complex general statements.
Author |
: J. P. May |
Publisher |
: University of Chicago Press |
Total Pages |
: 262 |
Release |
: 1999-09 |
ISBN-10 |
: 0226511839 |
ISBN-13 |
: 9780226511832 |
Rating |
: 4/5 (39 Downloads) |
Synopsis A Concise Course in Algebraic Topology by : J. P. May
Algebraic topology is a basic part of modern mathematics, and some knowledge of this area is indispensable for any advanced work relating to geometry, including topology itself, differential geometry, algebraic geometry, and Lie groups. This book provides a detailed treatment of algebraic topology both for teachers of the subject and for advanced graduate students in mathematics either specializing in this area or continuing on to other fields. J. Peter May's approach reflects the enormous internal developments within algebraic topology over the past several decades, most of which are largely unknown to mathematicians in other fields. But he also retains the classical presentations of various topics where appropriate. Most chapters end with problems that further explore and refine the concepts presented. The final four chapters provide sketches of substantial areas of algebraic topology that are normally omitted from introductory texts, and the book concludes with a list of suggested readings for those interested in delving further into the field.
Author |
: Joachim J. R. Cuntz |
Publisher |
: American Mathematical Soc. |
Total Pages |
: 199 |
Release |
: 1997 |
ISBN-10 |
: 9780821808238 |
ISBN-13 |
: 0821808230 |
Rating |
: 4/5 (38 Downloads) |
Synopsis Cyclic Cohomology and Noncommutative Geometry by : Joachim J. R. Cuntz
Noncommutative geometry is a new field that is among the great challenges of present-day mathematics. Its methods allow one to treat noncommutative algebras - such as algebras of pseudodifferential operators, group algebras, or algebras arising from quantum field theory - on the same footing as commutative algebras, that is, as spaces. Applications range over many fields of mathematics and mathematical physics. This volume contains the proceedings of the workshop on "Cyclic Cohomology and Noncommutative Geometry" held at the Fields Institute in June 1995.
Author |
: Douglas C. Ravenel |
Publisher |
: Princeton University Press |
Total Pages |
: 228 |
Release |
: 1992-11-08 |
ISBN-10 |
: 069102572X |
ISBN-13 |
: 9780691025728 |
Rating |
: 4/5 (2X Downloads) |
Synopsis Nilpotence and Periodicity in Stable Homotopy Theory by : Douglas C. Ravenel
Nilpotence and Periodicity in Stable Homotopy Theory describes some major advances made in algebraic topology in recent years, centering on the nilpotence and periodicity theorems, which were conjectured by the author in 1977 and proved by Devinatz, Hopkins, and Smith in 1985. During the last ten years a number of significant advances have been made in homotopy theory, and this book fills a real need for an up-to-date text on that topic. Ravenel's first few chapters are written with a general mathematical audience in mind. They survey both the ideas that lead up to the theorems and their applications to homotopy theory. The book begins with some elementary concepts of homotopy theory that are needed to state the problem. This includes such notions as homotopy, homotopy equivalence, CW-complex, and suspension. Next the machinery of complex cobordism, Morava K-theory, and formal group laws in characteristic p are introduced. The latter portion of the book provides specialists with a coherent and rigorous account of the proofs. It includes hitherto unpublished material on the smash product and chromatic convergence theorems and on modular representations of the symmetric group.
Author |
: Bjørn Ian Dundas |
Publisher |
: Springer Science & Business Media |
Total Pages |
: 447 |
Release |
: 2012-09-06 |
ISBN-10 |
: 9781447143932 |
ISBN-13 |
: 1447143930 |
Rating |
: 4/5 (32 Downloads) |
Synopsis The Local Structure of Algebraic K-Theory by : Bjørn Ian Dundas
Algebraic K-theory encodes important invariants for several mathematical disciplines, spanning from geometric topology and functional analysis to number theory and algebraic geometry. As is commonly encountered, this powerful mathematical object is very hard to calculate. Apart from Quillen's calculations of finite fields and Suslin's calculation of algebraically closed fields, few complete calculations were available before the discovery of homological invariants offered by motivic cohomology and topological cyclic homology. This book covers the connection between algebraic K-theory and Bökstedt, Hsiang and Madsen's topological cyclic homology and proves that the difference between the theories are ‘locally constant’. The usefulness of this theorem stems from being more accessible for calculations than K-theory, and hence a single calculation of K-theory can be used with homological calculations to obtain a host of ‘nearby’ calculations in K-theory. For instance, Quillen's calculation of the K-theory of finite fields gives rise to Hesselholt and Madsen's calculations for local fields, and Voevodsky's calculations for the integers give insight into the diffeomorphisms of manifolds. In addition to the proof of the full integral version of the local correspondence between K-theory and topological cyclic homology, the book provides an introduction to the necessary background in algebraic K-theory and highly structured homotopy theory; collecting all necessary tools into one common framework. It relies on simplicial techniques, and contains an appendix summarizing the methods widely used in the field. The book is intended for graduate students and scientists interested in algebraic K-theory, and presupposes a basic knowledge of algebraic topology.
Author |
: Douglas C. Ravenel |
Publisher |
: American Mathematical Soc. |
Total Pages |
: 418 |
Release |
: 2003-11-25 |
ISBN-10 |
: 9780821829677 |
ISBN-13 |
: 082182967X |
Rating |
: 4/5 (77 Downloads) |
Synopsis Complex Cobordism and Stable Homotopy Groups of Spheres by : Douglas C. Ravenel
Since the publication of its first edition, this book has served as one of the few available on the classical Adams spectral sequence, and is the best account on the Adams-Novikov spectral sequence. This new edition has been updated in many places, especially the final chapter, which has been completely rewritten with an eye toward future research in the field. It remains the definitive reference on the stable homotopy groups of spheres. The first three chapters introduce the homotopy groups of spheres and take the reader from the classical results in the field though the computational aspects of the classical Adams spectral sequence and its modifications, which are the main tools topologists have to investigate the homotopy groups of spheres. Nowadays, the most efficient tools are the Brown-Peterson theory, the Adams-Novikov spectral sequence, and the chromatic spectral sequence, a device for analyzing the global structure of the stable homotopy groups of spheres and relating them to the cohomology of the Morava stabilizer groups. These topics are described in detail in Chapters 4 to 6. The revamped Chapter 7 is the computational payoff of the book, yielding a lot of information about the stable homotopy group of spheres. Appendices follow, giving self-contained accounts of the theory of formal group laws and the homological algebra associated with Hopf algebras and Hopf algebroids. The book is intended for anyone wishing to study computational stable homotopy theory. It is accessible to graduate students with a knowledge of algebraic topology and recommended to anyone wishing to venture into the frontiers of the subject.