Why Vector Bundles
Vector bundles are important mathematical objects arising in geometry and topology and include the Mobius band and tangent bundles as examples. In this video, we give an informal introduction to the topic aimed at giving a feel as to what these objects are in the topological case, and how how they help us understand topology. There aren't many good references for the material in this playlist. Most treatments are much more advanced. These include Atiyah's "K-theory".
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Bundles: first definitions
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A Quick Intro to Fiber Bundles (Hopf Fibration)
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Sections of vector bundles
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Topological manifolds and manifold bundles- Lec 06 - Frederic Schuller
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What is a Manifold? - Mikhail Gromov
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Fiber Bundles and Symmetry Groups - Aaron Royers
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Construction of the tangent bundle - Lec 10 - Frederic Schuller
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What is Lie theory? Here is the big picture. | Lie groups, algebras, brackets #3
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Principal fibre bundles - Lec 19 - Frederic Schuller
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Prerequisites III: Manifolds & Fiber Bundles - Maurice Weiler
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Constructing vector bundles via transition functions
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Lie groups and their Lie algebras - Lec 13 - Frederic Schuller
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A Swift Introduction to Geometric Algebra
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What is a Manifold? Lesson 12: Fiber Bundles - Formal Description
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Introduction to Riemannian Geometry - Covariant & Contravariant Vectors
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Conncections and connection 1-forms - Lec 21 - Frederic Schuller
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What is a tensor anyway?? (from a mathematician)
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