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Mathematics & Science
Abstract Algebra
Hungerford 지음 | 2013
| ISBN | 9781111569624 (1111569622) |
|---|---|
| Author | Hungerford |
| Copyright | 2013 |
| Edition | 3E |
| Page | 616쪽 |
| Size | 7 3/8 X 9 1/4 |
| Bookseller |
경문사
자세히보기
* 교재는 판매처를 통해 구매하실 수 있습니다. 
|
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).1. Arithmetic in Z Revisited.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).
1. Arithmetic in Z Revisited.
2. Congruence in Z and Modular Arithmetic.
3. Rings.
4. Arithmetic in F[x].
5. Congruence in F[x] and Congruence-Class Arithmetic.
6. Ideals and Quotient Rings.
7. Groups.
8. Normal Subgroups and Quotient Groups
9. Topics in Group Theory.
10. Arithmetic in Integral Domains.
11. Field Extensions.
12. Galois Theory.
13. Public-Key Cryptography.
14. The Chinese Remainder Theorem.
15. Geometric Constructions.
16. Algebraic Coding Theory.
17. Lattices and Boolean Algebras (available online only).