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401-5741-DRL 2 Credits DR D-MATH

Floer Homology of Three-Manifolds and Applications to Low Dimensional Topology

Lecturers & Examiners: Dr. Tomasz Mrowka

Doctoral students of I-Math (UZH) need to send an email to Jessica Bolsinger ( ) with the course number. The email should have the subject „Graduate course registration (ETH)“.

VVZ CR n/a

Last Updated: 2026-02-05 16:29:40

Abstract

Nachdiplom lecture

Content

Floer homology and the related invariants of 4-manifolds has given us deep insight in smooth differential topology in dimensions 3 and particularly 4. The theory has yielded insights like existence of exotic differentiable structures on 4-dimensional euclidean space, complex curves minimize genus in complex projective space, killing the Hauptvermutung, there even appear to be connections to the 4 color map theorem. This course will build up Floer homology of three-manifolds from scratch. The focus will be on Instanton Floer homology but we will mention other versions and develop applications as the course goes on.

General Information

Language: English
Levels: DR

Examination

Type: ungraded semester performance

Course Components

Type	Title	Time & Place	Hours
lecture	Floer Homology of Three-Manifolds and Applications to Low Dimensional Topology If you would like to attend the lecture, please register by 22 September. For the registration form see	Mon 10:15-12:00 (HG G 43) 23.09 Date 10:15-12:00 (HG G 19.2) 30.09 Date 10:15-12:00 (HG G 19.2)	26 h semesterly

Offered In

Doctorate Mathematics (More Information at: )
- Subject Specialisation (The list of courses eligible for doctoral students is published each semester in the newsletter of the ZGSM.)
  - Graduate School (Official website of the Zurich Graduate School in Mathematics: )