Masters Course: Homological Algebra

Lectures in Winter Semester 2024/25
Lecturer: Prof. Dr. William Crawley-Boevey
Exercises: Raphael Bennett-Tennenhaus

Contents and Literature

Homological algebra is the algebra that was invented in order to define and study the homology and cohomology of topological spaces, but it has applications all over mathematics. Planned contents (subject to change):

Abelian categories
Projective, injective and flat modules
Complexes
Resolutions, Ext and Tor
Applications to commutative algebra and group actions
Triangulated categories and derived categories

Students are expected to already have some familiarity with rings and modules - as background reading, I suggest my notes for Algebra II.

Some suggested books:

C. A. Weibel, An introduction to homological algebra, CUP 1994, E-book.
J. J. Rotman, An introduction to homological algebra, Springer 2009, E-book.
M. S. Osborne, Basic homological algebra, Springer 2000.
S. I. Gelfand and Yu. I. Manin, Methods of homological algebra, 2nd ed., Springer 2010.
H. Krause, Homological theory of representations, CUP 2022, E-book.
The Stacks Project, https://stacks.math.columbia.edu/.

Exercises

By Raphael Bennett-Tennenhaus. See here

Examination

Oral examination at the end of the semester, by arrangement with the lecturer.

Notes

This course should be of interest to many students. For those who like it, it is the first part of a masters' sequence which is planned to continue with part 2 on the representation theory of algebras and part 3 on geometric methods for studying representations of algebras.

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Masters Course: Homological Algebra

Contents and Literature

Exercises

Examination

Notes