401-3531-00L  Differential Geometry I

SemesterAutumn Semester 2024
LecturersU. Lang
Periodicityyearly recurring course
Language of instructionEnglish
CommentAt most one of the three course units (Bachelor Core Courses)
401-3461-00L Functional Analysis I
401-3531-00L Differential Geometry I
401-3601-00L Probability Theory
can be recognised for the Master's degree in Mathematics or Applied Mathematics. In this case, you cannot change the category assignment by yourself in myStudies but must take contact with the Study Administration Office (www.math.ethz.ch/studiensekretariat) after having received the credits.



Courses

NumberTitleHoursLecturers
401-3531-00 VDifferential Geometry I4 hrs
Mon14:15-16:00CAB G 11 »
Thu10:15-12:00ML H 44 »
U. Lang
401-3531-00 UDifferential Geometry I
Groups are selected in myStudies.
1 hrs
Thu13:15-14:00HG E 22 »
16:15-17:00IFW C 33 »
Fri12:15-13:00HG E 21 »
13:15-14:00HG E 21 »
U. Lang

Catalogue data

AbstractIntroduction to differential geometry and differential topology. Contents: Curves, (hyper-)surfaces in R^n, geodesics, curvature, Theorema Egregium, Theorem of Gauss-Bonnet. Hyperbolic space. Differentiable manifolds, immersions and embeddings, Sard's Theorem, mapping degree and intersection number, vector bundles, vector fields and flows, differential forms, Stokes' Theorem.
Learning objectiveLearn the basic concepts and results in differential geometry and differential topology. Learn to describe, compute, and solve problems in the language of differential geometry.
ContentCurves, (hyper-)surfaces in R^n, first and second fundamental forms, geodesics, curvature, Theorema Egregium, Theorem of Gauss-Bonnet, minimal surfaces. Hyperbolic space. Differentiable manifolds, immersions and embeddings, Sard's Theorem, mapping degree and intersection number, vector bundles, vector fields and flows, differential forms, Stokes' Theorem.
Lecture notesPartial lecture notes are available from https://people.math.ethz.ch/~lang/
LiteratureDifferential geometry in R^n:
- Manfredo P. do Carmo: Differential Geometry of Curves and Surfaces
- S. Montiel, A. Ros: Curves and Surfaces
- Wolfgang Kühnel: Differentialgeometrie. Kurven-Flächen-Mannigfaltigkeiten
- Christian Bär: Elementare Differentialgeometrie
Differential topology:
- Dennis Barden & Charles Thomas: An Introduction to Differential Manifolds
- Victor Guillemin & Alan Pollack: Differential Topology
- Morris W. Hirsch: Differential Topology
- John M. Lee: Introduction to Smooth Manifolds
CompetenciesCompetencies
Subject-specific CompetenciesConcepts and Theoriesassessed
Techniques and Technologiesassessed
Method-specific CompetenciesAnalytical Competenciesassessed
Problem-solvingassessed
Social CompetenciesSensitivity to Diversityassessed
Personal CompetenciesCreative Thinkingassessed
Critical Thinkingassessed

Performance assessment

Performance assessment information (valid until the course unit is held again)
Performance assessment as a semester course
ECTS credits9 credits
ExaminersU. Lang
Typesession examination
Language of examinationEnglish
RepetitionThe performance assessment is offered every session. Repetition possible without re-enrolling for the course unit.
Mode of examinationwritten 180 minutes
Written aidsNone
Distance examinationIt is not possible to take a distance examination.
This information can be updated until the beginning of the semester; information on the examination timetable is binding.

Learning materials

 
Main linkInformation
Only public learning materials are listed.

Groups

401-3531-00 UDifferential Geometry I
GroupsG-01
Thu13:15-14:00HG E 22 »
G-02
Thu16:15-17:00IFW C 33 »
G-03
Fri12:15-13:00HG E 21 »
G-04
Fri13:15-14:00HG E 21 »

Restrictions

There are no additional restrictions for the registration.

Offered in

ProgrammeSectionType
High-Energy Physics (Joint Master with IP Paris)Optional Subjects in MathematicsWInformation
Mathematics BachelorCore Courses: Pure MathematicsWInformation
Mathematics MasterBachelor Core Courses: Pure MathematicsE-Information
Physics BachelorElectivesWInformation
Physics BachelorSelection of Higher Semester CoursesWInformation
Physics MasterSelection: MathematicsWInformation