Duration
30h Th, 25h Pr
Number of credits
| Bachelor in mathematics | 6 crédits | |||
| Bachelor in physics | 5 crédits |
Lecturer
Language(s) of instruction
French language
Organisation and examination
Teaching in the second semester
Schedule
Units courses prerequisite and corequisite
Prerequisite or corequisite units are presented within each program
Learning unit contents
This course is dedicated to the study of finite dimensional linear algebra. A large part of the course is devoted to linear maps (kernel, range, theorem of dimension,...), eigenvectors and eigenvalues of an endomorphism, a fine study of diagonalization. We also consider normal, hermitian and unitary matrices and their applications. Finally, polynomials and rational functions are studied: the fundamental theorem of algebra, Viète's formulas, Descartes' rule, decomposition into partial fractions.
Learning outcomes of the learning unit
At the end of this course, the student should have mastered the rigor of mathematical reasoning and a strong ability to grasp abstract structures and concepts arising in linear algebra. He/she will be able to give arguments about his/her assertions. The student will have at his/her disposal a set of deeply understood theoretical results for which he/she will be able to give a proof. He/she will be able to arrange several results from the course to solve an exercise. The student will make use of matrix representations of linear maps, diagonalization (in particular for normal, hermitian and unitary matrices). Moreover, he/she will easily work with polynomial and rational functions (for instance, finding GCD, asymptotic behavior, decomposing into simple functions,...). In particular, the student will be able to adapt the learned techniques to other contexts appearing in mathematics or physical sciences: geometrical loci, extrema of a function of several variables, applying the theory of diagonalization to solve systems of differential equations, Markov chains, in combinatorics (for instance, give estimate on the number of paths of length n in a graph) or in statistics (like in principal components analysis), computing n-th power of a matrix, ...
Prerequisite knowledge and skills
Perfect knowledge from the course 'calcul matriciel" (MATH0069-1) is expected, in particular the notions arising in the study of vector (or linear) spaces will be used extensively.
Planned learning activities and teaching methods
The practical sessions are mainly dedicated to solve exercises corresponding to the theory considered during the lecture sessions. These sessions are also useful to obtain extra informations or enlightenments on the concepts presented during the lecture sessions.
Moreover, the preparation of lists of exercices for the next practical session will be systematically asked .
Mode of delivery (face to face, distance learning, hybrid learning)
The theoretical lectures are given on a three hours a week basis. The schedule for lectures and practical sessions is available on-line. Theoretical lectures using "blackboard and chalk" interacting with students and recorded using "podcast" (students have later on access to recorded courses). During exercises sessions, students are facing exercises that must be solved. Depending on the evolution of the health situation, distance learning videos and question/answer sessions in the classroom could also be considered.
Organisational adjustments related to the current health context
...
Recommended or required readings
Lecture notes are available (in french) and can be downloaded from http://www.discmath.ulg.ac.be/
Assessment methods and criteria
Below you will find information on the evaluation methods planned for in-person and remote exams as well as those planned for hybrid sessions. Depending on how the health crisis evolves, the chosen method will be communicated to you no later than one month before the start of the exam session.
Any session :
- In-person
written exam ( open-ended questions )
- Remote
written exam ( open-ended questions )
- If evaluation in "hybrid"
preferred in-person
Additional information:
The final examination will be exclusively written. It will cover both the solving of exercises and the theory (in particular, students are expected to know the proofs and justifications of the stated results) and immediate applications of the latter.
Work placement(s)
Organizational remarks
Some useful informations are given on http://www.discmath.ulg.ac.be/ In particular, one has access to the log of the year and also the ones of previous years.
Contacts
M. Rigo
Institut de Mathématique (B37) -
Grande Traverse 12 -
Sart Tilman, 4000 Liège
Tél. : (04) 366.94.87 -
E-mail : M.Rigo@ulg.ac.be
Items online
Notes de cours
ensemble des notes