Content: Algebraic K-Theory
Algebraic K-theory associates to a ring a graded abelian group. This invariant has a rich history and numerous applications. For example, the algebraic K-theory of group rings has applications to geometric topology, the algebraic K-theory of rings of integers in number fields has applications to number theory, and algebraic K-theory of the coordinate ring of an affine variety has applications to algebraic geometry. Following the insight of Quillen, Segal, and Waldhausen it is beneficial to generalize the input to a category and the output to a space whose homotopy groups are the algebraic K-theory groups. Therefore category theory and topology in addition to algebra are fundamental to the subject.
In this course, we will survey different constructions of algebraic K-theory, describe some fundamental properties of algebraic K-theory, and discuss some important applications. The prerequisites are Topology I-III or equivalent. The course will be targeted at second year masters students who have finished the Topology sequence.
| Course No | Course Type | Hours |
|---|---|---|
| 19243901 | Vorlesung | 2 |
| Time Span | 02.11.2020 - 22.02.2021 |
|---|---|
| Instructors |
Gabriel James Angelini-Knoll
Holger Reich
Elmar Vogt
|
| 0089c_MA120 | 2014, MSc Informatik (Mono), 120 LPs |
| 0280b_MA120 | 2011, MSc Mathematik (Mono), 120 LPs |
| 0280c_MA120 | 2018, MSc Mathematik (Mono), 120 LP |
| Day | Time | Location | Details |
|---|---|---|---|
| Monday | 10-12 | Online | 2020-11-02 - 2021-02-22 |
Dear Students,
Our first class in algebraic K-theory is next week on Monday November 2nd at 10 am. As is customary, the official lecture begins at 10:15 am, but please arrive at 10 am on Monday so that we can spend the first 15 minutes introducing ourselves and discussing some logistics. The course will be taught on WebEx and I will send the WebEx link later in the week.
If you are already ready to dive into the material, I have prepared some TeXed notes on the first two or three lectures and they are available on my website here. Please check this webpage periodically throughout the course for updated information. The notes we cover in class will be handwritten and they will likely differ to some degree from the TeXed notes in terms of exposition. I mainly include the TeXed notes as a supplemental reference.
Looking forward to meeting you next Monday.
Dr. Gabriel Angelini-Knoll