spring 2024
MAT-3305 Advanced Cryptography - 10 ECTS
Objectives of the course
Knowledge - The candidate
- has knowledge about groups, rings and fields, and the use of these objects in cryptography and coding theory
- have a broad knowledge about research challenges in cryptography
- has advanced knowledge in the theory of elliptic curves and the use of elliptic curves in cryptography
- is able to explain how lattice methods can be used in cryptanalyses
- has knowledge about error correcting codes like linear codes, Goppa codes
- has advanced knowledge about cryptosystems based on the difficulty of finding the nearest code word or the shortest vector in a lattice
- has advanced knowledge of homomorphic encryption, and which established encryption methods it can be used to supplement
Skills - The candidate
- can assess strengths and weaknesses with the various cryptosystems
- is able to explain how elliptic curve cryptosystems works, and why they perform better
- can apply code-based, lattice- and elliptic curve cryptosystems
in concrete cases
- can perform homomorphic encryption
- has enough background knowledge to be able to read and understand research articles in the field
General competence -The candidate
- can give an interpretation of recent developments and provide an intuition of the open questions in the field
- has general knowledge about the importance of cryptography and coding theory in modern communication.
- understands the challenges of the post-quantum era in cryptography.
- can communicate independent work and master the subject area´s terminology.
Information to incoming exchange students
This course is available for inbound exchange students.
This course is open for inbound exchange student who meets the admission requirements. Please see the Admission requirements.
Do you have questions about this module? Please check the following website to contact the course coordinator for exchange students at the faculty: INBOUND STUDENT MOBILITY: COURSE COORDINATORS AT THE FACULTIES | UiT
Schedule
Examination
Examination: | Date: | Duration: | Grade scale: |
---|---|---|---|
Oral exam | 04.06.2024–05.06.2024 | 45 Minutes | A–E, fail F |
Coursework requirements:To take an examination, the student must have passed the following coursework requirements: |
|||
Mandatory assignment | Approved – not approved |
- About the course
- Campus: Tromsø |
- ECTS: 10
- Course code: MAT-3305
- Responsible unit
- Matematihka ja statistihka instituhtta
- Earlier years and semesters for this topic