Transcription of Math 131: Introduction to Topology 1
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Math 131: Introduction to Topology 1
Math 131: Introduction to Topology1 Professor Denis AurouxFall, 2019 Contents9/4/2019 - Introduction , Metric Spaces, Basic Notions39/9/2019 - Topological Spaces, Bases99/11/2019 - Subspaces, Products, Continuity159/16/2019 - Continuity, Homeomorphisms, Limit Points219/18/2019 - Sequences, Limits, Products269/23/2019 - More Product Topologies, Connectedness329/25/2019 - Connectedness, Path Connectedness379/30/2019 - Compactness4210/2/2019 - Compactness, Uncountability, Metric Spaces4510/7/2019 - Compactness, Limit Points, Sequences4910/9/2019 - Compactifications and Local Compactness5310/16/2019 - Countability, Separability, and Normal Spaces5710/21/2019 - Urysohn s Lemma and the Metrization Theorem611 Please email Beckham Myers at with any corrections, questions, or comments. Anymistakes or errors are - Category Theory, Paths, Homotopy6410/28/2019 - The Fundamental Group(oid)7010/30/2019 - Covering Spaces, Path Lifting7511/4/2019 - Fundamental Group of the Circle, Quotients and Gluing8011/6/2019 - The Brouwer Fixed Point Theorem8511/11/2019 - Antipodes and the Borsuk-Ulam Theorem8811/13/2019 - Deformation Retracts and Homotopy Equivalence9111/18/2019 - Computing the Fundamental Group9511/20/2019 - Equivalence of Cov
a sphere and a torus. For on the torus, there exist closed curves which cannot be ‘shrunk’ to a point. Is a space oriented? For example, the regular cylinder is oriented (as it has two sides), while the M obius space is not (it has only one side). Note that there are easier ways to distinguish these two, namely by examining their boundaries.
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