Existence theorems for ordinary differential equations, linear equations of third and higher order, the elements of the theory for power series solutions, qualitative properties of solutions to differential equations of order 2, Liapunov functions.
The fast Fourier transform, some properties of continuous functions, the Radon transform, wavelets, the heat equation and the Laplace equation, a few properties of Lebesgue integrals.
- Analytic, harmonic och subharmonic functions, Dirichlet’s problem, dynamical systems, fractals, Julia and Mandelbrot sets, uniform convergence, univalent functions, conformal mapping, quaternions
After this course the students should be able to
give an account of existence theorems for ordinary differential equations
give an account of the theory for linear equations of third and higher order
give an account of the elements of the theory for power series solutions
give an account of qualitative properties of solutions to differential equations of order 2
give an account of Liapunov functions and their use
give an account of the fast Fourier transform
give an account of some properties of continuous functions
give an account of some properties of the Radon transform
give an account of some properties of wavelets
give an account of some properties of the heat equation and the Laplace equation
give an account of some properties of the Lebesgue integral
- Solve Dirichlet’s problem in a disk and in a half plane
- Give an account of the maximum principle for harmonic functions and Harnack’s ineauality
- Describe the basic concepts and theorems of the theory of complex dynamics in one variable
- Formulate and prove convergence properties of power series, notably the theorems about termwise differentiation and integration
- Formulate and prove certain theorems from the basic theory of univalent functions
- Use Schwarz-Christofels och Joukowskis transformations to solve applied problems
- Give an account of quaternions, their applications and links to complex numbers
