260226 VO Linear Algebra for Physicists (2021W)
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Registration/Deregistration
Note: The time of your registration within the registration period has no effect on the allocation of places (no first come, first served).
Details
Language: German
Examination dates
Monday
31.01.2022
09:15 - 10:45
Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien
Tuesday
01.03.2022
09:15 - 10:45
Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien
Friday
13.05.2022
13:30 - 15:00
Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien
Tuesday
28.06.2022
16:30 - 18:00
Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien
Lecturers
- Franz Embacher
- Sophie Rosenmeier (Student Tutor)
Classes (iCal) - next class is marked with N
Monday
04.10.
08:30 - 10:00
Digital
Friday
08.10.
08:30 - 10:00
Digital
Monday
11.10.
08:30 - 10:00
Digital
Friday
15.10.
08:30 - 10:00
Digital
Monday
18.10.
08:30 - 10:00
Digital
Friday
22.10.
08:30 - 10:00
Digital
Monday
25.10.
08:30 - 10:00
Digital
Friday
29.10.
08:30 - 10:00
Digital
Friday
05.11.
08:30 - 10:00
Digital
Monday
08.11.
08:30 - 10:00
Digital
Friday
12.11.
08:30 - 10:00
Digital
Monday
15.11.
08:30 - 10:00
Digital
Friday
19.11.
08:30 - 10:00
Digital
Monday
22.11.
08:30 - 10:00
Digital
Friday
26.11.
08:30 - 10:00
Digital
Monday
29.11.
08:30 - 10:00
Digital
Friday
03.12.
08:30 - 10:00
Digital
Monday
06.12.
08:30 - 10:00
Digital
Friday
10.12.
08:30 - 10:00
Digital
Monday
13.12.
08:30 - 10:00
Digital
Friday
17.12.
08:30 - 10:00
Digital
Friday
07.01.
08:30 - 10:00
Digital
Monday
10.01.
08:30 - 10:00
Digital
Friday
14.01.
08:30 - 10:00
Digital
Monday
17.01.
08:30 - 10:00
Digital
Friday
21.01.
08:30 - 10:00
Digital
Monday
24.01.
08:30 - 10:00
Digital
Information
Aims, contents and method of the course
The students obtain basic knowledge and skills in linear algebra.Content: elementary algebraic structures (groups, fields), geometry in the plane and in hree-dimensional space (vevtor addition, scalar product, vektor product, sum convention, Kronecker symbol, epsilon symbol), real and complex vector spaces, linear operators and matrices, quotient spaces (equivalence relation), dual space, systems of linear equations, determinants, eigenvalues and normal forms (diagonalizability, Jordan normal form), Euclidean und unitary vector spaces, tensor product.
Assessment and permitted materials
Written exam (multiple choice)
Minimum requirements and assessment criteria
Acquiring basic skills in linear algebra that are central to physics and related fields.
Examination topics
Content of the lecture course
Reading list
Klaus Jänich: Lineare Algebra (Springer, 2008),
eBook der Universitätsbibliothek unter http://ubdata.univie.ac.at/AC06432777
und ein Ergänzungsskriptum des VortragendenWeitere Literaturhinweise und Informationen finden Sie im Moodle-Kurs der Vorlesung und unter https://homepage.univie.ac.at/franz.embacher/Lehre/Lineare_Algebra_fuer_PhysikerInnen/LfP_ws2021.html.
eBook der Universitätsbibliothek unter http://ubdata.univie.ac.at/AC06432777
und ein Ergänzungsskriptum des VortragendenWeitere Literaturhinweise und Informationen finden Sie im Moodle-Kurs der Vorlesung und unter https://homepage.univie.ac.at/franz.embacher/Lehre/Lineare_Algebra_fuer_PhysikerInnen/LfP_ws2021.html.
Association in the course directory
LINALG, P 1
Last modified: Tu 14.11.2023 00:23