[linfo1114]

5 credits

30.0 h + 15.0 h

This learning unit is not being organized during year 2018-2019.

Language

French

Prerequisites

This course assumes that the student already masters notions of algebra covered by the course LINFO1112

The prerequisite(s) for this Teaching Unit (Unité d’enseignement – UE) for the programmes/courses that offer this Teaching Unit are specified at the end of this sheet.

Main themes

Set theory

Set notations and operations
Binary relations between sets: applications and link with functions in analysis
Cardinality of a set (finite and infinite) and notion of inclusion-exclusion
Equivalence, equivalence classes

Logic

Introduction to the logic of the proposals
Introduction to the logic of predicates
Prove methods
Mathematical induction
Notions of Boolean Algebra

Introduction to number theory

Natural integer numbers, principle of recurrence, prime numbers, etc.
Euclidean division, representation in a base, modulo arithmetic, representation of the integers in the computer
Gcd, Euclid's algorithm
Basic notions of cryptography

Combinatorial mathematics

counting
permutations
arrangements
Recurrence relations
Solutions of recurrence equations

Introduction to graph theory

Oriented and non-oriented graphs and their matrix representations
Bipartite graphs and matching problems
Paths on a graph and Eulerian / Hamiltonian circuits
Planar graphs and coloring
Problems of shorter path
Ranking of the nodes of a graph: PageRank

Aims

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

Given the learning outcomes of the "Bachelor in Engineering" program, this course contributes to the development, acquisition and evaluation of the following learning outcomes:

S1.I1, S1.G1
S2.2

Students who have successfully completed this course will be able to:

Use the terminology of functions, relationships and together well and perform related operations when the context requires it
Explain the basic structure of the main proof techniques (direct proof, counterexample, proof by the absurd, induction, recurrence)
Apply the various proof techniques in a convincing way by selecting the most adapted to the problem posed
Analyze a problem to determine the underlying recurrence relationships
Calculate counts, permutations, arrangements on sets as part of an application.
Modeling various real-world problems encountered in computer science using the appropriate forms of graphs
Explain the problem of the shortest path in a graph and apply classical algorithms to solve this problem

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”.

Faculty or entity

INFO

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

Title of the programme

Sigle

Credits

Prerequisites

Aims

Bachelor in Computer Science

SINF1BA

LINFO1112