Homological Algebra

Basic information

In this course, we develop the necessary tools for the definition and the study of various (co)homology theories.

The plan is roughly:

1. Introduction to category theory.
2. Universal properties, representable functors and adjoint functors.
3. Tensor product of bimodules.
4. Additive categories and their categories of (co)chain complexes.
5. Abelian categories and homology.
6. Derived functors, Ext and Tor.
7. Yoneda's Ext.
8. Application to algebraic topology: singular homology.

There might be some changes, depending on our progess.

Handwritten notes

Week 1
Week 2
Week 3
Week 4
Week 5
Week 6

Exercise sheets

Sheet 1
Sheet 2
Sheet 3
Sheet 4

Solutions for the exercises

Sheet 1
Sheet 2
Sheet 3
Exercise 2
Sheet 4
Exercise 6

Progress

1. Introduction to category theory.
2. Universal properties, representable functors and adjoint functors.
3. Tensor product of bimodules.
4. Additive categories and their categories of (co)chain complexes.
5. Abelian categories, chain complexes, homology, long exact sequence
6. Projectives and injectives objects. Projective resolutions.
7. Derived functors, long exact sequence, exemple of Ext and Tor.

References

1. For Chapters 1 and 2, Category theory in context, E. Riehl or Introduction au langage catégorique, I. Assem.
2. For Chapters 3 and 4, Introduction au langage catégorique, I. Assem or An introduction to homological algebra, C. Weibel.
3. For chapters 5 and 6, An introduction to homological algebra, C. Weibel.
4. For chapter 8, An introduction to algebraic topology. J. Rotman.

Category: teaching