Homotopy Theory via Algebraic Geometry and Group Representations

Homotopy Theory via Algebraic Geometry and Group Representations
Title Homotopy Theory via Algebraic Geometry and Group Representations PDF eBook
Author Mark E. Mahowald
Publisher American Mathematical Soc.
Pages 394
Release 1998
Genre Mathematics
ISBN 0821808052

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The academic year 1996-97 was designated as a special year in Algebraic Topology at Northwestern University (Evanston, IL). In addition to guest lecturers and special courses, an international conference was held entitled "Current trends in algebraic topology with applications to algebraic geometry and physics". The series of plenary lectures included in this volume indicate the great breadth of the conference and the lively interaction that took place among various areas of mathematics. Original research papers were submitted, and all submissions were refereed to the usual journal standards.

Modern Classical Homotopy Theory

Modern Classical Homotopy Theory
Title Modern Classical Homotopy Theory PDF eBook
Author Jeffrey Strom
Publisher American Mathematical Soc.
Pages 862
Release 2011-10-19
Genre Mathematics
ISBN 0821852868

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The core of classical homotopy theory is a body of ideas and theorems that emerged in the 1950s and was later largely codified in the notion of a model category. This core includes the notions of fibration and cofibration; CW complexes; long fiber and cofiber sequences; loop spaces and suspensions; and so on. Brown's representability theorems show that homology and cohomology are also contained in classical homotopy theory. This text develops classical homotopy theory from a modern point of view, meaning that the exposition is informed by the theory of model categories and that homotopy limits and colimits play central roles. The exposition is guided by the principle that it is generally preferable to prove topological results using topology (rather than algebra). The language and basic theory of homotopy limits and colimits make it possible to penetrate deep into the subject with just the rudiments of algebra. The text does reach advanced territory, including the Steenrod algebra, Bott periodicity, localization, the Exponent Theorem of Cohen, Moore, and Neisendorfer, and Miller's Theorem on the Sullivan Conjecture. Thus the reader is given the tools needed to understand and participate in research at (part of) the current frontier of homotopy theory. Proofs are not provided outright. Rather, they are presented in the form of directed problem sets. To the expert, these read as terse proofs; to novices they are challenges that draw them in and help them to thoroughly understand the arguments.

Homotopy Theory: Relations with Algebraic Geometry, Group Cohomology, and Algebraic $K$-Theory

Homotopy Theory: Relations with Algebraic Geometry, Group Cohomology, and Algebraic $K$-Theory
Title Homotopy Theory: Relations with Algebraic Geometry, Group Cohomology, and Algebraic $K$-Theory PDF eBook
Author Paul Gregory Goerss
Publisher American Mathematical Soc.
Pages 520
Release 2004
Genre Mathematics
ISBN 0821832859

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As part of its series of Emphasis Years in Mathematics, Northwestern University hosted an International Conference on Algebraic Topology. The purpose of the conference was to develop new connections between homotopy theory and other areas of mathematics. This proceedings volume grew out of that event. Topics discussed include algebraic geometry, cohomology of groups, algebraic $K$-theory, and $\mathbb{A 1$ homotopy theory. Among the contributors to the volume were Alejandro Adem,Ralph L. Cohen, Jean-Louis Loday, and many others. The book is suitable for graduate students and research mathematicians interested in homotopy theory and its relationship to other areas of mathematics.

Abstract Homotopy And Simple Homotopy Theory

Abstract Homotopy And Simple Homotopy Theory
Title Abstract Homotopy And Simple Homotopy Theory PDF eBook
Author K Heiner Kamps
Publisher World Scientific
Pages 476
Release 1997-04-11
Genre Mathematics
ISBN 9814502553

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The abstract homotopy theory is based on the observation that analogues of much of the topological homotopy theory and simple homotopy theory exist in many other categories (e.g. spaces over a fixed base, groupoids, chain complexes, module categories). Studying categorical versions of homotopy structure, such as cylinders and path space constructions, enables not only a unified development of many examples of known homotopy theories but also reveals the inner working of the classical spatial theory. This demonstrates the logical interdependence of properties (in particular the existence of certain Kan fillers in associated cubical sets) and results (Puppe sequences, Vogt's Iemma, Dold's theorem on fibre homotopy equivalences, and homotopy coherence theory).

Representation Theory and Complex Geometry

Representation Theory and Complex Geometry
Title Representation Theory and Complex Geometry PDF eBook
Author Neil Chriss
Publisher Birkhauser
Pages 495
Release 1997
Genre Mathematics
ISBN 0817637923

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This volume provides an overview of modern advances in representation theory from a geometric standpoint. The techniques developed are quite general and can be applied to other areas such as quantum groups, affine Lie groups, and quantum field theory.

Algebraic Statistics for Computational Biology

Algebraic Statistics for Computational Biology
Title Algebraic Statistics for Computational Biology PDF eBook
Author L. Pachter
Publisher Cambridge University Press
Pages 440
Release 2005-08-22
Genre Mathematics
ISBN 9780521857000

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This book, first published in 2005, offers an introduction to the application of algebraic statistics to computational biology.

Motivic Homotopy Theory

Motivic Homotopy Theory
Title Motivic Homotopy Theory PDF eBook
Author Bjorn Ian Dundas
Publisher Springer Science & Business Media
Pages 228
Release 2007-07-11
Genre Mathematics
ISBN 3540458972

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This book is based on lectures given at a summer school on motivic homotopy theory at the Sophus Lie Centre in Nordfjordeid, Norway, in August 2002. Aimed at graduate students in algebraic topology and algebraic geometry, it contains background material from both of these fields, as well as the foundations of motivic homotopy theory. It will serve as a good introduction as well as a convenient reference for a broad group of mathematicians to this important and fascinating new subject. Vladimir Voevodsky is one of the founders of the theory and received the Fields medal for his work, and the other authors have all done important work in the subject.