Introduction to Homological Algebra
Such concepts as homology and cohomology of algebraic objects, spaces and varieties have become an integral part of modern mathematics. This course is dedicated to introducing this range of ideas from the side of algebra.
Lecturer
Date
23rd September ~ 23rd December, 2022
Website
Prerequisite
basic theory of rings and modules, basic group theory, basic category theory
Reference
[1] C.A. Weibel. An introduction to homological algebra. No. 38. Cambridge university press, 1994.
[2] P.J. Hilton and U. Stammbach. A Course in Homological Algebra. Graduate texts in Mathematics 4, Springer-Verlag, 1971.
[3] M. S. Osborne, Basic homological algebra, Graduate Texts in Mathematics, Springer, 2000.
[4] H. Cartan and S. Eilenberg. Homological algebra. Princeton University Press, 1956.
[5] S. Mac Lane, Homology, Springer, Berlin, 1963
[2] P.J. Hilton and U. Stammbach. A Course in Homological Algebra. Graduate texts in Mathematics 4, Springer-Verlag, 1971.
[3] M. S. Osborne, Basic homological algebra, Graduate Texts in Mathematics, Springer, 2000.
[4] H. Cartan and S. Eilenberg. Homological algebra. Princeton University Press, 1956.
[5] S. Mac Lane, Homology, Springer, Berlin, 1963
Audience
Graduate
Video Public
Yes
Notes Public
Yes
Language
English
Lecturer Intro
Prof. Sergei Ivanov is a mathematician from St. Petersburg, Russia. His research interests include homological algebra, algebraic topology, group theory, simplicial homotopy theory, simplicial groups.