Math 552 is the second semester of the standard introductory graduate algebra course. A significant portion of the course is devoted to the theory of field extensions, including Galois theory, rings of polynomials, Nullstellensatz, intro to homological algebra, structure of Artin rings. Additional topics are chosen in part based on the interests of the students.
| Due | Assigned Problems | |
|---|---|---|
| 2/1 | Answer the 5 "why?" questions in Lecture 1 (on paper) | |
| 2/4 | Answer the 3+4=7 "why?" questions in Lectures 2,3 (Jan. 21,25) | |
| 2/11 | Answer the 1+3=4 "why?" questions in Lectures 4,5
(Jan. 28, Feb.1) and do the Exercise in the Jan.28 notes |
|
| 2/18 (Exam 1) | From BAI: 4.8 #2,5; 4.9 #6; 4.15 #1,3,4,6; and 4.16 #8 | |
| 2/22,25 | No class | |
| 3/8 (Tues) | From BAII: 7.1 #2,3; 7.2 #1; 7.4 #1,2; 7.5 #1,3 | |
| 3/22 (Tues) | BAII: 3.7 #3,5; 7.6 #1,2; 7.7 #2 | |
| 3/29 (Tues) | BAII: 3.2 #1; 7.10 #2;
3) If Ri and R2 are noetherian, so is Ri×R2; 4) if R has ACC on {fin.gen. ideals}, show that R is noetherian; 5) If M is an R-module, and I=ann(x) is maximal among annihilators of nonzero elements of M, show that I is a prime ideal; 6) if R is noetherian and M a f.g. R-module, show that there is a chain of submodules Mi and primes Pi such that Mi/Mi+1≅R/Pi (hint: use 5) |
|
| 4/1 (Fri) | Midterm (Commutative rings) | |
| 4/12 (Tues) | Group representations supplement, exercise (on p.2) and #1-3 (on p.4) | |
| 4/19 (Tues) | Group representations supplement, on p.4: prove the Proposition and do exercises #4,5,6 | |
| 4/26 (Tues) | BAII: 3.10 #3,6; 6.2 #2; 6.7 #1; 6.8 #2 (problems 6.6 #1,2 are optional) | |
| 4/29 (Tues) | Last class | |
An R-module P is projective if (P⊕Q) is a free R-module for some Q
An R-module P is flat if P⊗- is exact, i.e.,
when L is a submodule of M then L⊗P injects into M⊗P.
Charles Weibel / Spring 2022