ECTS
5 credits
Training structure
Faculty of Science
Description
Further explore the basic concepts of group and ring theory covered in the previous semester.
Objectives
This EU will address the following points:
Group theory
- Action of a group on a set, quotient of a set by a group action. Cayley's theorem. Class formula, Burnside formula. Application to enumeration.
- Sylow's theorems and applications.
- Distinguished subgroup, quotient of groups. Isomorphism and factorization theorems. Simple group. The special case of abelian groups.
- Group extensions and semi-direct products. Examples. The special case of vector spaces.
Ring theory
- Review of ideals, quotient of a ring by an ideal. Isomorphism and factorization theorems. Ideals of a quotient. Application of the quotient to the construction of field extensions and (small) finite fields.
- Prime and maximal ideals. Operations on ideals. The Chinese remainder theorem.
Teaching hours
- CMLecture22.5 hours
- TutorialTutorials22.5 hours
Mandatory prerequisites
Algebra courses in the first year, second year, and first semester of the third year.
Recommended prerequisites: first semester of L3
Additional information
Hourly volumes:
CM: 22.5
TD: 22.5
TP: -
Land: -