5.00 credits
30.0 h + 15.0 h
Q1
Teacher(s)
Pereira Olivier;
Language
English
> French-friendly
> French-friendly
Content
We introduce the core concepts of modern cryptography, with a specific focus on the mathematical and algorithmic aspects. Historical problems and constructions will be discussed and serve as a basis for the introduction of the core security notions and cryptographic mechanisms that are in use to day, as well as for the development of methods for justifying the security of these mechanisms. The contents may include:
- Information theoretic cryptography, perfect encryption.
- Probabilistic algorithms, computational security, attacker models, elaboration of security proofs in cryptography.
- Symmetric encryption: security definitions, basis constructions, block ciphers (AES, DES), cryptanalysis, operation modes.
- Authentication codes, hash functions.
- Asymmetric cryptography: Diffie-Hellman protocol, public key encryption (ElGamal, RSA, ...), signature (Schnorr, DSA/DSS, RSA hash-and-sign, ...), public key infrastructures.
- Basic algorithmic number theory (modular arithmetic, primality testing, elliptic curves)
- Protocols: challenge-response, identification, authentication, zero-knowledge
- Standards and norms: discussion, practical concerns,
Teaching methods
The class is organised around lectures and exercise sessions. Homeworks may also be proposed.
A specific attention is placed on the links between the theoretical concepts introduced in the class and the practical applications of cryptography.
A specific attention is placed on the links between the theoretical concepts introduced in the class and the practical applications of cryptography.
Evaluation methods
The evaluation is based on a written examination. Homeworks proposed during the semester may contribute to the final grade, for at most 20% of the grade, and provided that it is to the student's benefit.
Online resources
Moodle website.
Bibliography
J. Katz et Y. Lindell, Introduction to Modern Cryptography, 2nd edition. (Chapman and Hall/CRC Press).
More references are available on Moodle.
More references are available on Moodle.
Teaching materials
- slides sur moodle
Faculty or entity
MATH
Programmes / formations proposant cette unité d'enseignement (UE)
Title of the programme
Sigle
Credits
Prerequisites
Learning outcomes
Additionnal module in Mathematics
Master [120] in Mathematics
Master [120] in Electrical Engineering
Master [120] in Computer Science and Engineering
Master [120] in Computer Science
Master [120] in Mathematical Engineering
Master [120] in Data Science Engineering
Master [120] in Data Science: Information Technology