Lehrinhalte
Linear Algebra: linear mappings, determinants, complex numbers, eigenvalues;
power series, Fourier series; differential calculus: curves, scalar and vector
fields, partial derivatives, totally differentiable functions, implicit function
theorem, optimization with constraints; ordinary differential equations:
separation of variables, linear ODEs, systems of linear ODEs with constant
coefficients; integral calculus: path integrals, potential, computation of volumes,
coordinate transformations
Voraussetzungen
keine
Linear Algebra: linear mappings, determinants, complex numbers, eigenvalues;
power series, Fourier series; differential calculus: curves, scalar and vector
fields, partial derivatives, totally differentiable functions, implicit function
theorem, optimization with constraints; ordinary differential equations:
separation of variables, linear ODEs, systems of linear ODEs with constant
coefficients; integral calculus: path integrals, potential, computation of volumes,
coordinate transformations
Voraussetzungen
keine
- Lehrende: Maximilian Gläser
- Lehrende: Robert Haller
Semester: ST 2021