Difference between revisions of "MAT3233"
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==Modern Algebra== | ==Modern Algebra== | ||
| − | MAT 3233 Modern Algebra. (3-0) 3 Credit Hours. | + | [https://catalog.utsa.edu/undergraduate/sciences/mathematics/#courseinventory MAT 3233 Modern Algebra]. (3-0) 3 Credit Hours. |
Prerequisites: [[MAT2233]] and [[MAT3003]]. | Prerequisites: [[MAT2233]] and [[MAT3003]]. | ||
| − | An introduction to modern algebra building up from concrete examples in elementary algebra and number theory which lead to the abstract theory of groups, rings, and fields. Topics include: Basic examples of groups. Cyclic groups. Permutation groups and cycle decompositions. Group homomorphisms. Normal subgroups, factor groups, and direct products of groups. Definitions and basic examples of rings, integral domains and fields. Ring homomorphisms. Ideals, factor rings, and direct products of rings. Unique factorization of integers and polynomials. Generally offered: Fall, Spring, Summer. Differential Tuition: $150. | + | <!-- An introduction to modern algebra building up from concrete examples in elementary algebra and number theory which lead to the abstract theory of groups, rings, and fields. Topics include: Basic examples of groups. Cyclic groups. Permutation groups and cycle decompositions. Group homomorphisms. Normal subgroups, factor groups, and direct products of groups. Definitions and basic examples of rings, integral domains and fields. Ring homomorphisms. Ideals, factor rings, and direct products of rings. Unique factorization of integers and polynomials. Generally offered: Fall, Spring, Summer. Differential Tuition: $150. --> |
| + | |||
| + | An introduction to modern algebra building up from concrete examples in elementary algebra and number theory which lead to the abstract theory of groups, rings, and fields. Topics include: Arithmetic congruences in the ring ℤ of integers; residue rings ℤₙ; finite fields 𝔽ₚ; the group of units 𝑈ₙ; cyclic groups; the Chinese Remainder, Fermat’s and Euler’s theorems; polynomial rings; the Fundamental Theorem of Algebra; irreducible polynomials and factorization in 𝔽[x] and ℤ[𝑥]; quotient rings and construction of the Galois fields 𝐺𝐹(𝑝ⁿ). | ||
| + | |||
| + | <!-- Basic examples of groups. Cyclic groups. Permutation groups and cycle decompositions. Group homomorphisms. Normal subgroups, factor groups, and direct products of groups. Definitions and basic examples of rings, integral domains and fields. Ring homomorphisms. Ideals, factor rings, and direct products of rings. Unique factorization of integers and polynomials. Generally offered: Fall, Spring, Summer. Differential Tuition: $150. --> | ||
==Textbook== | ==Textbook== | ||
| − | Lindsay N. Childs, ''A Concrete Introduction to Higher Algebra'' (3rd. ed.) Springer-Verlag (2009). ISBN: 978-0-387-74527-5 | + | Lindsay N. Childs, [https://utsa.primo.exlibrisgroup.com/permalink/01UTXSANT_INST/1du13se/cdi_springer_books_10_1007_978_0_387_74725_5 ''A Concrete Introduction to Higher Algebra''] (3rd. ed.) Springer-Verlag (2009). ISBN: 978-0-387-74527-5 |
| + | ==Topics== | ||
{| class="wikitable sortable" | {| class="wikitable sortable" | ||
|- | |- | ||
| − | ! Week !! | + | ! Week !! Chapters !! Topics !! Student learning outcomes |
|- | |- | ||
| − | | | + | | |
| + | 1 | ||
|| | || | ||
| − | + | 1–2 | |
|| | || | ||
| − | + | Integers. Inductive proofs. | |
|| | || | ||
| − | + | ||
|- | |- | ||
| − | | | + | | |
| + | 2 | ||
| + | || | ||
| + | 3–4 | ||
| + | || | ||
| + | Divisibility. The Euclidean Algorithm. Unique factorization of integers. | ||
|| | || | ||
| − | + | ||
| − | |||
|- | |- | ||
| − | | | + | | |
| + | 3 | ||
| + | || | ||
| + | 5–6 | ||
| + | || | ||
| + | Congruences and congruence classes. Modular rings ℤₙ. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 4 | ||
| + | || | ||
| + | 7 & 9 | ||
| + | || | ||
| + | Rings and fields. Theorems of Fermat and Euler. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 5 | ||
| + | || | ||
| + | 11–12 | ||
| + | || | ||
| + | Groups. The Chinese Remainder Theorem. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 6 | ||
| + | || | ||
| + | --- | ||
| + | || | ||
| + | Review. First midterm exam. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 7 | ||
| + | || | ||
| + | 13–14 | ||
| + | || | ||
| + | Polynomials: division and factorization. | ||
| + | Divisibility and the Euclidean Algorithm. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 8 | ||
| + | || | ||
| + | 15 & 17 | ||
| + | || | ||
| + | The Fundamental Theorem of Algebra. | ||
| + | Polynomial congruences. The Chinese Remainder Theorem in 𝔽[𝑥]. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 9 | ||
| + | || | ||
| + | 19-20 | ||
| + | || | ||
| + | Primitive roots and cyclic groups. | ||
| + | Carmichael numbers. | ||
| + | || | ||
| + | |||
| + | |- | ||
| + | | | ||
| + | 10 | ||
| + | || | ||
| + | --- | ||
| + | || | ||
| + | Review. Second midterm exam. | ||
| + | || | ||
| + | |||
| + | |- | ||
| + | | | ||
| + | 11 | ||
| + | || | ||
| + | 21 | ||
| + | || | ||
| + | Quadratic Reciprocity | ||
| + | || | ||
| + | |||
| + | |- | ||
| + | | | ||
| + | 12 | ||
| + | || | ||
| + | 23 | ||
| + | || | ||
| + | Polynomial congruences and quotients of 𝔽[𝑥]. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 13 | ||
| + | || | ||
| + | 24 | ||
| + | || | ||
| + | Homomorphisms. Finite fields. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 14 | ||
| + | || | ||
| + | 26 | ||
| + | || | ||
| + | Factorization in ℤ[𝑥]. Irreducible polynomials. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | | | + | | |
| + | 15 | ||
| + | || | ||
| + | --- | ||
| + | || | ||
| + | Wrap-up and review. Student Study Day. | ||
| + | || | ||
| + | |||
|- | |- | ||
| − | |||
|} | |} | ||
Latest revision as of 10:56, 25 March 2023
Modern Algebra
MAT 3233 Modern Algebra. (3-0) 3 Credit Hours.
Prerequisites: MAT2233 and MAT3003.
An introduction to modern algebra building up from concrete examples in elementary algebra and number theory which lead to the abstract theory of groups, rings, and fields. Topics include: Arithmetic congruences in the ring ℤ of integers; residue rings ℤₙ; finite fields 𝔽ₚ; the group of units 𝑈ₙ; cyclic groups; the Chinese Remainder, Fermat’s and Euler’s theorems; polynomial rings; the Fundamental Theorem of Algebra; irreducible polynomials and factorization in 𝔽[x] and ℤ[𝑥]; quotient rings and construction of the Galois fields 𝐺𝐹(𝑝ⁿ).
Textbook
Lindsay N. Childs, A Concrete Introduction to Higher Algebra (3rd. ed.) Springer-Verlag (2009). ISBN: 978-0-387-74527-5
Topics
| Week | Chapters | Topics | Student learning outcomes |
|---|---|---|---|
|
1 |
1–2 |
Integers. Inductive proofs. |
|
|
2 |
3–4 |
Divisibility. The Euclidean Algorithm. Unique factorization of integers. |
|
|
3 |
5–6 |
Congruences and congruence classes. Modular rings ℤₙ. |
|
|
4 |
7 & 9 |
Rings and fields. Theorems of Fermat and Euler. |
|
|
5 |
11–12 |
Groups. The Chinese Remainder Theorem. |
|
|
6 |
--- |
Review. First midterm exam. |
|
|
7 |
13–14 |
Polynomials: division and factorization. Divisibility and the Euclidean Algorithm. |
|
|
8 |
15 & 17 |
The Fundamental Theorem of Algebra. Polynomial congruences. The Chinese Remainder Theorem in 𝔽[𝑥]. |
|
|
9 |
19-20 |
Primitive roots and cyclic groups. Carmichael numbers. |
|
|
10 |
--- |
Review. Second midterm exam. |
|
|
11 |
21 |
Quadratic Reciprocity |
|
|
12 |
23 |
Polynomial congruences and quotients of 𝔽[𝑥]. |
|
|
13 |
24 |
Homomorphisms. Finite fields. |
|
|
14 |
26 |
Factorization in ℤ[𝑥]. Irreducible polynomials. |
|
|
15 |
--- |
Wrap-up and review. Student Study Day. |
