Algebra

Note from June 29, 2020
Although we do not yet know how long the social distancing related to the Covid-19 pandemic will last, and regardless of the changes that had to be made in the evaluation of the June 2020 session in relation to what is provided for in this learning unit description, new learnig unit evaluation methods may still be adopted by the teachers; details of these methods have been - or will be - communicated to the students by the teachers, as soon as possible.

5 credits

30.0 h + 30.0 h

Teacher(s)

Glineur François; Jungers Raphaël; Remacle Jean-François; SOMEBODY; Wertz Vincent (coordinator);

Language

French

Main themes

Linear algebra : linear equation systems, matrix calculus, linear applications, euclidean spaces, vector spaces on a field, linear sequences, quadratic forms. Modelling and solving of simple problems.

Aims

At the end of this learning unit, the student is able to :

Contribution of the course to the program objectives
Regarding the learning outcomes of the program of Bachelor in Engineering, this course contributes to the development and the acquisition of the following learning outcomes:

LO1.1, 1.2
LO 2.2, 2.3, 2.4, 2.6, 2.7
LO 3.1, 3.2, 3.3
LO 4.1, 4.4

Specific learning outcomes of the course
At the end of the course the students will be able to

Master the elementary notions of linear algebra ;
Apply the notion of euclidean space and orthogonal projection to solve approximation problems in Rn and other spaces;
Calculate vector spaces of a linear operator;
Diagonalize a linear space if possible;
Study the evoluation of a linear system and of a linear recurrence:
Determine the caracteristics of a quadratic form;
Understand the main mathematical proof techniques ;
Make a critical reading and analysis of a problem statement;
Find examples and counter-examples related to a mathematical statement;
Write short mathematical proofs with rigor;
Modelli of simple problems, and problem solving using the methods cited above.

The contribution of this Teaching Unit to the development and command of the skills and learning outcomes of the programme(s) can be accessed at the end of this sheet, in the section entitled “Programmes/courses offering this Teaching Unit”.

Content

Systems of linear equations,
Matrix calculus,
Vector spaces,
Linear applications,
Euclidean spaces, orthogonal projection and approximation problems,
Linear operators, eigenvectors and diagonalization, Jordan form and matrix exponential
Adjoint operator, spectral theorem, quadratic forms, law of inertia,
Sequences and series, linear differential equations

Teaching methods

Lectures in auditorium, supervised exercise sessions and problem based learning, possibly supplemented with writing assignments and online exercises.

Evaluation methods

Students will be evaluated with an individual written exam, based on the above-mentioned objectives. Results from continuous assessment may also be taken into account for the final grade. The exact modalities will be specified in class.

Online resources

https://moodleucl.uclouvain.be/course/view.php?id=12098

Bibliography

G. Strang, Introduction to linear algebra, 5th edition

G. Strang, Introduction to linear algebra, 5th edition, Cambridge University Press

Teaching materials

G. Strang, Introduction to linear algebra, 5th edition

Faculty or entity

BTCI

Programmes / formations proposant cette unité d'enseignement (UE)

Title of the programme

Sigle

Credits

Prerequisites

Aims

Bachelor in Engineering

FSA1BA

Bachelor in Engineering : Architecture

ARCH1BA