Difference between revisions of "MAT5123"
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| + | == Catalog entry == | ||
MAT 5123. Introduction to Cryptography. (3-0) 3 Credit Hours. | MAT 5123. Introduction to Cryptography. (3-0) 3 Credit Hours. | ||
Prerequisite: MAT 4213. Congruences and residue class rings, Fermat’s Little Theorem, the Euler phi-function, the Chinese Remainder Theorem, complexity, symmetric-key cryptosystems, cyclic groups, primitive roots, discrete logarithms, one-way functions, public-key cryptosystems, digital signatures, finite fields, and elliptic curves. Differential Tuition: $150. Course Fees: GS01 $90. | Prerequisite: MAT 4213. Congruences and residue class rings, Fermat’s Little Theorem, the Euler phi-function, the Chinese Remainder Theorem, complexity, symmetric-key cryptosystems, cyclic groups, primitive roots, discrete logarithms, one-way functions, public-key cryptosystems, digital signatures, finite fields, and elliptic curves. Differential Tuition: $150. Course Fees: GS01 $90. | ||
| − | Textbook | + | == Textbook == |
| + | J. Hoffstein, J. Pipher, J. H. Silverman, ''An Introduction to Mathematical Cryptography'' (2nd Ed.) Springer Undergraduate Mathematics Series, Springer-Verlag (2014). ISBN: 978-1-4939-1711-2. | ||
{| class="wikitable sortable" | {| class="wikitable sortable" | ||
| Line 10: | Line 12: | ||
|1 | |1 | ||
|| | || | ||
| − | 1.2 | + | 1.2, 1.3 |
|| | || | ||
Substitution ciphers and basic theory of divisibility. | Substitution ciphers and basic theory of divisibility. | ||
| Line 28: | Line 30: | ||
* Modular arithmetic and shift ciphers. | * Modular arithmetic and shift ciphers. | ||
* Modular rings and finite fields 𝔽ₚ. | * Modular rings and finite fields 𝔽ₚ. | ||
| − | * Powers and primitive roots in finite fields. | + | * Powers and primitive roots in finite fields. Fermat's Little Theorem. |
* Fast exponentiation. | * Fast exponentiation. | ||
|- <!-- START ROW --> | |- <!-- START ROW --> | ||
| Line 36: | Line 38: | ||
1.7, 2.1–2.3. | 1.7, 2.1–2.3. | ||
|| <!-- Topics --> | || <!-- Topics --> | ||
| − | Public and private-key cryptosystems. Cyclic groups. Discrete Logarithms. Diffie-Hellman key exchange. | + | Public and private-key cryptosystems. |
| + | |||
| + | Cyclic groups. | ||
| + | |||
| + | Discrete Logarithms. | ||
| + | |||
| + | Diffie-Hellman key exchange. | ||
|| <!-- SLOs --> | || <!-- SLOs --> | ||
* Symmetric and asymmetric ciphers. | * Symmetric and asymmetric ciphers. | ||
| Line 50: | Line 58: | ||
2.4, 2.5. 2.6, 2.7. | 2.4, 2.5. 2.6, 2.7. | ||
|| <!-- Topics --> | || <!-- Topics --> | ||
| − | Elgamal public-key cryptosystem (EGPKC). Cyclic groups. Collision algorithms. | + | Elgamal public-key cryptosystem (EGPKC). |
| + | |||
| + | Cyclic groups. | ||
| + | |||
| + | Collision algorithms. | ||
|| <!-- SLOs --> | || <!-- SLOs --> | ||
* Theory of finite cyclic groups. | * Theory of finite cyclic groups. | ||
| Line 61: | Line 73: | ||
2.8, 2.9, 2.10 | 2.8, 2.9, 2.10 | ||
|| <!-- Topics --> | || <!-- Topics --> | ||
| − | Rudiments of ring theory. The Chinese Remainder Theorem. The Pohlig-Hellman Algorithm. | + | Rudiments of ring theory. |
| + | |||
| + | The Chinese Remainder Theorem. | ||
| + | |||
| + | The Pohlig-Hellman Algorithm. | ||
|| <!-- SLOs --> | || <!-- SLOs --> | ||
* Rings. Polynomial rings. Quotient rings. | * Rings. Polynomial rings. Quotient rings. | ||
| Line 80: | Line 96: | ||
3.1, 3.2, 3.3. | 3.1, 3.2, 3.3. | ||
|| <!-- Topics --> | || <!-- Topics --> | ||
| − | Modular groups of units. The RSA cryptosystem. Practical considerations of security in implementation. | + | Modular groups of units. |
| + | |||
| + | The RSA cryptosystem. | ||
| + | |||
| + | Practical considerations of security in implementation. | ||
|| <!-- SLOs --> | || <!-- SLOs --> | ||
* Modular groups 𝑈ₙ. | * Modular groups 𝑈ₙ. | ||
| + | * Euler's “totient” function 𝜑. Euler's Theorem. | ||
* Powers and roots modulo 𝒑𝒒. | * Powers and roots modulo 𝒑𝒒. | ||
* The Rivest-Shamir-Adleman (RSA) cryptosystem. | * The Rivest-Shamir-Adleman (RSA) cryptosystem. | ||
| Line 97: | Line 118: | ||
* Fermat's Little Theorem and Carmichael numbers. | * Fermat's Little Theorem and Carmichael numbers. | ||
* The Miller-Rabin probabilistic primality test. | * The Miller-Rabin probabilistic primality test. | ||
| − | * Pollard's | + | * Pollard's “𝒑−𝟣” factorization algorithm. |
|- <!-- START ROW --> | |- <!-- START ROW --> | ||
| <!-- Week# --> | | <!-- Week# --> | ||
| Line 148: | Line 169: | ||
6.4, 6.7 | 6.4, 6.7 | ||
|| <!-- Topics --> | || <!-- Topics --> | ||
| − | Elliptic-Curve Cryptography (ECC). Elliptic curves in characteristic 2. | + | Elliptic-Curve Cryptography (ECC). |
| + | |||
| + | Elliptic curves in characteristic 2. | ||
|| <!-- SLOs --> | || <!-- SLOs --> | ||
* EC Diffie-Hellman key exchange. | * EC Diffie-Hellman key exchange. | ||
| Line 160: | Line 183: | ||
|| <!-- Sections --> | || <!-- Sections --> | ||
6.6 | 6.6 | ||
| − | Atkin-Morain's “ECs and Primality Proving” (Math. Comp. 61 ( | + | |
| − | [https://www.ams.org/journals/mcom/1993-61-203/S0025-5718-1993-1199989-X/] | + | Atkin-Morain's “ECs and Primality Proving” (Math. Comp. 61 (1993) 29–68. |
| + | [https://www.ams.org/journals/mcom/1993-61-203/S0025-5718-1993-1199989-X/]) | ||
|| <!-- Topics --> | || <!-- Topics --> | ||
EC-based primality testing and factorization techniques. | EC-based primality testing and factorization techniques. | ||
Latest revision as of 22:06, 25 March 2023
Catalog entry
MAT 5123. Introduction to Cryptography. (3-0) 3 Credit Hours.
Prerequisite: MAT 4213. Congruences and residue class rings, Fermat’s Little Theorem, the Euler phi-function, the Chinese Remainder Theorem, complexity, symmetric-key cryptosystems, cyclic groups, primitive roots, discrete logarithms, one-way functions, public-key cryptosystems, digital signatures, finite fields, and elliptic curves. Differential Tuition: $150. Course Fees: GS01 $90.
Textbook
J. Hoffstein, J. Pipher, J. H. Silverman, An Introduction to Mathematical Cryptography (2nd Ed.) Springer Undergraduate Mathematics Series, Springer-Verlag (2014). ISBN: 978-1-4939-1711-2.
| Week | Sections | Topics | Student Learning Outcomes |
|---|---|---|---|
| 1 |
1.2, 1.3 |
Substitution ciphers and basic theory of divisibility. |
|
|
2 |
1.4, 1.5. |
Modular arithmetic and finite fields. |
|
|
3 |
1.7, 2.1–2.3. |
Public and private-key cryptosystems. Cyclic groups. Discrete Logarithms. Diffie-Hellman key exchange. |
|
|
4 |
2.4, 2.5. 2.6, 2.7. |
Elgamal public-key cryptosystem (EGPKC). Cyclic groups. Collision algorithms. |
|
|
5 |
2.8, 2.9, 2.10 |
Rudiments of ring theory. The Chinese Remainder Theorem. The Pohlig-Hellman Algorithm. |
|
|
6 |
None |
Review. First midterm exam. |
|
|
7 |
3.1, 3.2, 3.3. |
Modular groups of units. The RSA cryptosystem. Practical considerations of security in implementation. |
|
|
8 |
3.4, 3.5. |
Primality testing and factorization attacks on RSA. |
|
|
9 |
4.1, 4.2, 4.3 |
Digital Signatures. |
|
|
10 |
5.1, 5.3, 5.6, 5.7. |
Probability, entropy, information theory and complexity. |
|
|
11 |
None |
Review. Second midterm exam. | |
|
12 |
6.1, 6.2., 6.3 |
Elliptic curves and discrete logarithms. |
|
|
13 |
6.4, 6.7 |
Elliptic-Curve Cryptography (ECC). Elliptic curves in characteristic 2. |
|
|
14 |
6.6 Atkin-Morain's “ECs and Primality Proving” (Math. Comp. 61 (1993) 29–68. [1]) |
EC-based primality testing and factorization techniques. |
|
|
15 |
None. |
Student Presentations. Wrap-up and review. |
