Nonlinear Differential Equations and Dynamic Systems
MA-310-1
Included in Study
Industrial Mathematics, Bachelor's Programme
Language of teaching
English
Recommended previous knowledge
60 sp in mathematics including MA-226
Learning outcomes
Upon successful completion of the course, the student will be able to
Have knowledge about basic priciples and techniques in the theory of differential equations and dynamical systems
Know the basic properties of linear systems
Have knowledge about techniques for analysing phase-spaces
Identify relevant analytic and geometric methods and use these for qualitative analysis of non-linear systems (equilibria, limit cycles, stability and bifurcations).
Apply theoretical knowledge for investigating real world problems
Contents
This course introduces basic analytic and qualitative methods for analysing differential equations and dynamical systems. It covers local theory (existence and uniquenessl, equilibria, linearization, stabile manifold theorem) and gobal theory (limits, periodic paths, the Poincare map, homoclinic and heteroclinic orbits). Basic techniques for phase-analysis and stability theory will be discussed. Other subjects can encompass bifurcations, perturbation methods, discrete dynamical systems, chaos and applications.
Teaching and learning methods
Lectures, group work, and mandatory hand-ins. Estimated workload of the course is 267 hours.
Examination requirements
Mandatory hand-ins must be approved. See Canvas for details.
Examinations
Individual, oral exam. Graded grade.
Student evaluation
The person responsible for the course decides, in cooperation with student representative, the form of student evaluation and whether the course is to have a midway or end of course evaluation in accordance with the quality system for education, chapter 4.1.