MAT5123

1.2 & 1.3

Substitution ciphers and basic theory of divisibility.

• Caesar’s and more general substitution ciphers.
• Greatest common divisor. The extended Euclidean algorithm.

2

1.4, 1.5.

Modular arithmetic and finite fields.

• Primes and integer factorizations.
• The Fundamental Theorem of Arithmetic.
• Modular arithmetic and shift ciphers.
• Modular rings and finite fields 𝔽ₚ.
• Powers and primitive roots in finite fields.
• Fast exponentiation.

3

1.7, 2.1–2.3.

Public and private-key cryptosystems. Cyclic groups. Discrete Logarithms. Diffie-Hellman key exchange.

• Symmetric and asymmetric ciphers.
• Encoding schemes.
• Perfect secrecy. Vernon’s cipher.
• Examples of symmetric ciphers.
• Discrete Logarithms.
• The Diffie-Hellman key exchange.

4

2.4, 2.5. 2.6, 2.7.

Elgamal public-key cryptosystem. Cyclic groups. Collision algorithms.

• Theory of finite cyclic groups.
• The Discrete Logarithm Problem (DLP).
• Shanks’ Babystep-Giantstep DLP algorithm.

5

2.8, 2.9, 2.10

Rudiments of ring theory. The Chinese Remainder Theorem. The Pohlig-Hellman Algorithm.

• Rings. Polynomial rings. Quotient rings.
• Systems of congruences. 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.

• Modular groups 𝑈ₙ.
• Powers and roots modulo 𝒑𝒒.
• The Rivest-Shamir-Adleman (RSA) cryptosystem.
• Implementation and security issues of cryptosystems: Kerchoff's Principle, Known- and Chosen-Plaintext attacks, Man-in-the-Middle attacks, obfuscation (Random-Oracle) attacks, parameter re-use.

8

5.4 & 5.5

Estimation and convergence of line integrals.

• Majorization of path integrals by arclength and bound on magnitude of integrand.
• Antiderivatives of complex functions with path-independent line integrals.
• Uniform and non-uniform convergence of sequences and series of complex functions.
• Continuous uniform limits of continuous sequences and series, and their integrals.

9

6.1, 6.2, 6.3

Cauchy's Theorem and its basic consequences.

• Statement of Cauchy's Theorem.
• Proof of Cauchy's Theorem.
• The Deformation Theorem.

10

7.1 & 7.2

Cauchy's Integral Formula. Taylor series.

• Statement and proof of Cauchy's Integral Formula.
• Existence, uniqueness, and general theory of Taylor series of holomorphic functions.
• Rigorous definition of and proof that complex logarithms are holomorphic.

11

None

Review. Second midterm exam.

12

8.1–8.3

Isolated singularities and Laurent series. The Residue Theorem.

• Definition of Laurent series about an isolated singularity. Examples.
• Types of isolated singularities: Removable, polar, essential. The Cassorati-Weierstrass Theorem.
• Statement and proof of the Residue Theorem.
• Elementary techniques to evaluate residues.

13

Chapter 9.

Calculus of residues.

• Evaluation of integrals of real analytic functions using residues.
• Evaluation of series of real analytic functions using residues.

14

11.1–11.3

Conformal mappings.

• Preservation of angles and conformal mappings of the plane.
• Conformal mappings yield pairs of conjugate harmonic functions.
• Dirichlet's Problem on a planar region.
• The Riemann Mapping Theorem.
• Möbius transformations and their use in solving elementary Dirichlet Problems.

15

Chapter 10. (At instructor's discretion, week 15 may be used to wrap-up and review instead.)

Complex integration and geometric properties of holomorphic functions

• Rouché's Theorem.
• The Open Mapping Theorem.
• Winding numbers.