Duration
30h Th, 30h Pr
Number of credits
| Bachelor in physics | 6 crédits |
Lecturer
Language(s) of instruction
French language
Organisation and examination
Teaching in the first semester, review in January
Schedule
Units courses prerequisite and corequisite
Prerequisite or corequisite units are presented within each program
Learning unit contents
Short table of contents.
-Reminding of integral calculus
-Uniform convergence and pointwise convergence
-Integrales 'Euleriennes'
-Integrable, square integrable functions and ae bounded functions
-Convolution of functions
-Fourier transforms
-Orthogonal bases in infinite dimensional spaces
-Trigonometric Fourier series
Learning outcomes of the learning unit
The purpose of the course is to present standard techniques of analysis with theoritical mathematical support, with the aim of being carefully used in applications.
Prerequisite knowledge and skills
Knowledge of basic analysis (series, functions of one and more than one variables, integration, differentiation, ... )
Planned learning activities and teaching methods
Many exercices will be presented and suggested to students following a precise schedule (available at the beginning of the academic year).
Mode of delivery (face to face, distance learning, hybrid learning)
Face-to-face course
Additional information:
See web (celcat)
Recommended or required readings
Notes
see http://www.afo.ulg.ac.be/fb
Exam(s) in session
Any session
- In-person
written exam ( open-ended questions ) AND oral exam
Additional information:
Written and oral exams will be organized.
Work placement(s)
Organisational remarks and main changes to the course
See also web pages dedicated to the course available from the the address http://www.afo.ulg.ac.be/fb
Contacts
Françoise BASTIN,
Institute of Mathematics, B37
Tel 04 366 94 74
email F.Bastin@uliege.be
Laura REMACLE , email : l.remacle@uliege.be
(Secretary Department:
04 366 94 10)