[ 261MATHMP3V20 ] VL Mathematics for Physics III (Analysis of Several Variables)

Es ist eine neuere Version 2023W dieser LV im Curriculum Bachelor's programme Fundamentals of Natural Sciences for Technology 2023W vorhanden.
(*) Unfortunately this information is not available in english.
Workload Education level Study areas Responsible person Hours per week Coordinating university
6 ECTS B1 - Bachelor's programme 1. year Mathematics Thomas Vetterlein 4 hpw Johannes Kepler University Linz
Detailed information
Original study plan Bachelor's programme Technical Physics 2020W
Objectives Introduction to basic concepts and methods in mathematical analysis with focus on areas particularly relevant to physics.
Subject differentiation of multivariate functions (partial derivative, Fréchet derivative) and multiple integrals, gradient, divergence, curl, and the theorems of Green, Stokes, and Gauss, coordinate transformations; differentiation and integration of complex functions, Cauchy integral theorem and formula, residual theorem, Fourier series, Fourier and Laplace transforms.
Criteria for evaluation to be announced by the instructor.
Methods lecture and discussion with students
Language German
Study material to be announced by the instructor.
Changing subject? No
Corresponding lecture (*)TPBPAVOANA2: VL Analysis für Physiker(innen) II (6 ECTS)
Earlier variants They also cover the requirements of the curriculum (from - to)
TPBPAVOANA2: VL Analysis for physicists II (2008S-2020S)
On-site course
Maximum number of participants -
Assignment procedure Direct assignment