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Lecture Notes in Algebraic Topology II

By: James F. Davis; Kirk Paul

Description: This note covers the following topics: Chain Complexes, Homology, and Cohomology, Homological algebra, Products, Fiber Bundles, Homology with Local Coefficient, Fibrations, Cofibrations and Homotopy Groups, Obstruction Theory and Eilenberg-MacLane Spaces, Bordism, Spectra, and Generalized Homology and Spectral Sequences.

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Differential Topology Lecture Notes 2

By: Wolf Michael M.

Description: We will follow a direct approach to differential topology and to many of its applications without requiring and exploiting the abstract machinery of algebraic topology. The course will cover immersion, submersions and embeddings of manifolds in Euclidean space (including the basic results by Sard and Whitney), a discussion of the Euler number and winding numbers, fixed point theorems, the Borsuk-Ulam theorem and respective applications. At the end of the cou...

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An Introduction to K-theory ; Topology

By: Eric M. Friedlander

Description: This note provides an overview of various aspects of algebraic K-theory, with the intention of making these lectures accessible to participants with little or no prior knowledge of the subject.

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Lie Algebras by Fulton B. Gonzalez

By: Fulton B. Gonzalez

Description: This note covers the following topics: Background Linear Algebra, Lie Algebras: Definition and Basic Properties, Solvable Lie Algebras and Lie s Theorem, Nilpotent Lie Algebras and Engel s Theorem, Cartan s Criteria for Solvability and Semisimplicity, Semisimple Lie Algebras, root Space Decompositions, Classical Simple Complex Lie Algebras.

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Algebraic Topology

By: Hopkins Michael; Akhil Mathew

Description: This lecture note explains everything about Algebraic Topology.

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Vector Bundles K Theory

By: Allen Hatcher

Description: This note covers the following topics: Vector Bundles, Classifying Vector Bundles, Bott Periodicity, K Theory, Characteristic Classes, Stiefel-Whitney and Chern Classes, Euler and Pontryagin Classes, The J Homomorphism.

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Algebraic Topology Lecture Notes 3

By: Evslin Jarah; Alexander Wijns

Description: This note covers the following topics: Group theory, The fundamental group, Simplicial complexes and homology, Cohomology, Circle bundles.

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Lecture Notes in Algebraic Topology Anant R Shastri

By: Anant R. Shastri

Description: This book covers the following topics: Cell complexes and simplical complexes, fundamental group, covering spaces and fundamental group, categories and functors, homological algebra, singular homology, simplical and cellular homology, applications of homology.

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Elliptic Curves and Algebraic Topology 2

By: Matthew Ando

Description: This note covers the following topics: Geometric reformulation, The Adams-Novikov spectral sequence, Elliptic cohomology, What is TMF, Geometric and Physical Aspect.

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Algebraic Topology Hatcher

By: Allen Hatcher

Description: This book explains the following topics: Some Underlying Geometric Notions, The Fundamental Group, Homology, Cohomology and Homotopy Theory.

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Metric and Topological Spaces

By: T. W. Korner

Description: First part of this course note presents a rapid overview of metric spaces to set the scene for the main topic of topological spaces.Further it covers metric spaces, Continuity and open sets for metric spaces, Closed sets for metric spaces, Topological spaces, Interior and closure, More on topological structures, Hausdorff spaces and Compactness.

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Geometric Topology Localization, Periodicity, and Galois Symmetry I

By: Dennis Sullivan

Description: The seminal `MIT notes' of Dennis Sullivan were issued in June 970 and were widely circulated at the time. The notes had a ma- or in°uence on the development of both algebraic and geometric topology, pioneering

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Lecture Notes on Algebraic K-theory I

By: John Rognes
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Algebraic L Theory and Topological Manifolds

By: A. A. Ranicki
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Lectures on Topics in Algebraic K-theory II

By: Hyman Bass
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A Concise Course in Algebraic Topology

By: J. P. May

Description: This book explains the following topics: The fundamental group and some of its applications, Categorical language and the van Kampen theorem, Covering spaces, Graphs, Compactly generated spaces, Cofibrations, Fibrations, Based cofiber and fiber sequences, Higher homotopy groups, CW complexes, The homotopy excision and suspension theorems, Axiomatic and cellular homology theorems, Hurewicz and uniqueness theorems, Singular homology theory, An introduction to K theory.

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Algebraic Topology Lecture Notes 1

By: David Gauld

Description: This note covers the following topics: The Fundamental Group, Covering Projections, Running Around in Circles, The Homology Axioms, Immediate Consequences of the Homology Axioms, Reduced Homology Groups, Degrees of Spherical Maps again, Constructing Singular Homology Theory.

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Algebraic K Theory ; Topology

By: Olivier Isely

Description: Algebraic K-theory is a branch of algebra dealing with linear algebra over a general ring A instead of over a eld.

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K-theory and Geometric Topology

By: Jonathan Rosenberg

Description: There are two reasons why this may be a useful exercise. First, it may help to show K-theorists brought up in the \algebraic school how their subject is related to topology. And secondly, clarifying the relationship between K- theory and topology may help topologists to extract from the wide body of K-theoretic literature the things they need to know to solve geometric problems

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More Concise Algebraic Topology Localization, Completion, and Mode...

By: J. P. May; K. Ponto

Description: This book explains the following topics: the fundamental group, covering spaces, ordinary homology and cohomology in its singular, cellular, axiomatic, and represented versions, higher homotopy groups and the Hurewicz theorem, basic homotopy theory including fibrations and cofibrations, Poincare duality for manifolds and manifolds with boundary.

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