Course details
A specialist MAGIC course
Semester
- Spring 2021
- Monday, January 25th to Friday, March 19th; Monday, April 26th to Friday, May 7th
Hours
- Live lecture hours
- 10
- Recorded lecture hours
- 0
- Total advised study hours
- 40
Timetable
- Mondays
- 09:05 - 09:55 (UK)
Description
The course will give an introduction to Morse Theory.
This theory studies the topology of smooth manifolds through real-valued smooth functions whose critical points satisfy a certain non-degeneracy condition.
We will investigate how the homotopy type is related to critical points and how the homology of a manifold can be calculated through Morse functions.
This theory studies the topology of smooth manifolds through real-valued smooth functions whose critical points satisfy a certain non-degeneracy condition.
We will investigate how the homotopy type is related to critical points and how the homology of a manifold can be calculated through Morse functions.
Prerequisites
Basic knowledge of Differentiable Manifolds and Algebraic Topology is necessary.
This can be obtained through the Core Courses MAGIC063 and MAGIC064.
This can be obtained through the Core Courses MAGIC063 and MAGIC064.
Syllabus
- Smooth functions, non-degenerate critical points, Morse functions.
- Morse Lemma.
- Morse functions on spheres, projective spaces, orthogonal groups, configuration spaces of linkages.
- Homotopy type, cell decompositions of manifolds.
- Existence of Morse functions, cobordisms.
- Gradient flows, stable and unstable manifolds.
- Resonant Morse functions, ordered Morse functions.
- Morse homology, Morse inequalities.
- Calculations for projective spaces.
- Introduction to the h-cobordism theorem.
Lecturer
-
DS
Dr Dirk Schuetz
- University
- Durham University
Bibliography
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You may be able to preview the book there and see links to places where you can buy the book. There is also link marked 'Find this book in a library' - this sometimes works well, but not always - you will need to enter your location, but it will be saved after you do that for the first time.
Assessment
The assessment for this course will be released on Monday 10th May 2021 at 00:00 and is due in before Monday 24th May 2021 at 11:00.
Assessment is via take-home examination.
Please note that you are not registered for assessment on this course.
Files
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Lectures
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