Riemannsche Geometrie / Riemannian Geometry
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Teaching
Details
Faculty Faculty of Science and Medicine Domain Mathematics Code UE-SMA.03206 Languages English , German Type of lesson Lecture
Level Bachelor Semester SP-2022 Title
French Géométrie Riemannienne German Riemannsche Geometrie English Riemannian Geometry Schedules and rooms
Summary schedule Monday 10:15 - 12:00, Hebdomadaire (Spring semester)
Thursday 10:15 - 12:00, Hebdomadaire (Spring semester)
Contact's hours 56 Teaching
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Dates and rooms
Date Hour Type of lesson Place 21.02.2022 10:15 - 12:00 Cours PER 07, Room 1.309 24.02.2022 10:15 - 12:00 Cours PER 07, Room 1.309 28.02.2022 10:15 - 12:00 Cours PER 07, Room 1.309 03.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 07.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 10.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 14.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 17.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 21.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 24.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 28.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 31.03.2022 10:15 - 12:00 Cours PER 07, Room 1.309 04.04.2022 10:15 - 12:00 Cours PER 07, Room 1.309 07.04.2022 10:15 - 12:00 Cours PER 07, Room 1.309 11.04.2022 10:15 - 12:00 Cours PER 07, Room 1.309 14.04.2022 10:15 - 12:00 Cours PER 07, Room 1.309 25.04.2022 10:15 - 12:00 Cours PER 07, Room 1.309 28.04.2022 10:15 - 12:00 Cours PER 07, Room 1.309 02.05.2022 10:15 - 12:00 Cours PER 07, Room 1.311 05.05.2022 10:15 - 12:00 Cours PER 07, Room 1.309 09.05.2022 10:15 - 12:00 Cours PER 07, Room 1.309 12.05.2022 10:15 - 12:00 Cours PER 07, Room 1.309 16.05.2022 10:15 - 12:00 Cours PER 07, Room 1.309 19.05.2022 10:15 - 12:00 Cours PER 07, Room 1.309 23.05.2022 10:15 - 12:00 Cours PER 07, Room 1.309 30.05.2022 10:15 - 12:00 Cours PER 07, Room 1.309 02.06.2022 10:15 - 12:00 Cours PER 07, Room 1.309 -
Assessments methods
Oral exam - SP-2022, Session d'été 2022
Assessments methods By rating Descriptions of Exams mündliches Examen Oral exam - SP-2022, Autumn Session 2022
Assessments methods By rating Descriptions of Exams mündliches Examen -
Assignment
Valid for the following curricula: Additional Courses in Sciences
Version: ens_compl_sciences
Paquet indépendant des branches > Advanced courses in Mathematics (Bachelor level)
Additional Programme Requirements to the MSc in Computer Science [MA]
Version: 2022_1/V_01
Supplement to the MSc in Computer science > Advanced courses in Mathematics (Bachelor level)
Additional Programme Requirements to the MSc in Mathematics [MA]
Version: 2022_1/V_01
Supplement to the MSc in Mathematics > Advanced courses in Mathematics (Bachelor level)
Additional TDHSE programme in Mathematics
Version: 2022_1/V_01
Additional TDHSE Programme Requirements for Mathematics 60 or +30 > Programme 60 or +30 > Additional Programme Requirements to Mathematics 60 > Additional TDHSE programme for Mathematics 60 (from AS2018 on)Additional TDHSE Programme Requirements for Mathematics 60 or +30 > Programme 60 or +30 > Additional Programme Requirements to Mathematics +30 > Additional TDHSE programme for Mathematics +30 (from AS2018 on)
Mathematics 120
Version: 2022_1/V_01
BSc in Mathematics, Major, 2nd-3rd year > Mathematics, Major, 2nd and 3rd years, elective courses (from AS2018 on)
Mathematics 30 for Mathematicians (MATH 30MA)
Version: 2022_1/V_01
Mathematics for mathematicians (MATH 30MA), minor 30 (from AS2020 on) > Mathematics, minor MATH 30MA, elective courses (from AS2018 on)
Mathematics 30 for Physicists (MATH 30PH)
Version: 2022_1/V_01
Mathematics for physicists (MATH 30PH), minor 30 (from AS2020 on) > Mathematics, minor MATH 30PH, elective courses (from AS2018 on)
Mathematics 60 (MATH 60)
Version: 2022_1/V_01
Mathematics (MATH 60), minor 60 (from AS2020 on) > Mathematics, minor MATH60, elective courses (from AS2018 on)
Mathematics [3e cycle]
Version: 2015_1/V_01
Continuing education > Advanced courses in Mathematics (Bachelor level)
Mathematics [POST-DOC]
Version: 2015_1/V_01
Continuing education > Advanced courses in Mathematics (Bachelor level)
Pre-Master-Programme to the MSc in Mathematics [PRE-MA]
Version: 2022_1/V_01
Prerequisite to the MSc in Mathematics > Advanced courses in Mathematics (Bachelor level)