Record of daily activities and homework, Math 617, Theory of Functions of a Complex Variable I, Fall 2003

Monday, September 1: We discussed three definitions of the complex numbers: the everyday working definition as the set of a+bi with the usual algebraic operations subject to the rule that i²=-1; the formal definition as the set of ordered pairs of real numbers with componentwise addition and a special multiplication rule; and the algebraic definition as R[x]/(x²+1). Also we looked at the condition for a real-linear transformation of R² to correspond to a complex-linear mapping of C.; Homework for Wednesday: Read sections 1.1 to 1.3 on pages 1-14 and do exercises 2b, 3a, 13a, and 14c on pages 20-22.
Wednesday, September 3: We discussed the notion of continuity for functions from C to C and also the notion of complex differentiability (Cauchy-Riemann equations).; Homework for Friday: Read sections 1.4 and 1.5 on pages 14-20 and do exercises 8, 9, 18, and 33 on pages 21-23.
Friday, September 5: We continued the discussion of the Cauchy-Riemann equations as the defining property of holomorphic functions. In particular, we interpreted the Cauchy-Riemann equations for f(z) as being the standard necessary condition from advanced calculus for exactness of the differential f dz.; Homework for Monday: Read section 2.1 and the first part of section 2.2, pages 29-37, and do exercises 34, 37, and 47 on pages 25-26 (Chapter 1) and exercise 1 on page 60 (Chapter 2).
Monday, September 8: We discussed the definition of the logarithm as a holomorphic function, and we worked some concrete examples of computing line integrals,; Homework for Wednesday: Read the end of section 2.2, all of section 2.3, and the beginning of section 2.4, pages 38-45, and do exercises 3, 5, and 8 on pages 60-61 (Chapter 2) and exercise 52 on page 27 (Chapter 1).
Wednesday, September 10: We discussed Cauchy's Integral Theorem from the point of view of closed and exact forms and Green's Theorem.; Homework for Friday: Read pages 46-52 (the end of section 2.4 and section 2.5). Do exercise 55 on page 27 (Chapter 1) and exercises 9b, 15, and 17 on pages 61-62 (Chapter 2).
Friday, September 12: We discussed the various different characterizations that we know so far of holomorphic functions.; Homework for Monday: Read section 2.6, pages 53-60, and the start of section 3.1, pages 69-72. Do exercises 18c, 23, and 36 on pages 62-66 (Chapter 2).
Monday, September 15: We discussed the significance of the Cauchy integral formula and looked at examples of using it to compute integrals.; Homework for Wednesday: Read the proof of Morera's theorem on pages 73-74 and section 3.2 on pages 74-81. Group z should do starred problem 4z on page 67 to present in class.
Wednesday, September 17: We looked at problems 41, 42, and 44 on page 67 at the end of Chapter 2 related to Morera's theorem and special path integrals.; Homework for Friday: Read section 3.3 (pages 81-84) and do exercises 9, 10, and 11(a) on page 95 (Chapter 3).
Friday, September 19: We discussed convergence of power series in the complex domain.; Homework for Monday: Read section 3.4 (pages 85-88) and do exercises 19, 20(a), and 26 on pages 96-97 (Chapter 3).
Monday, September 22: We worked an exercise on uniform convergence.; Homework for Wednesday: Read sections 3.5 and 3.6 (pages 88-94) and do exercises 15, 17, and 21 on pages 96-97 (Chapter 3).
Wednesday, September 24: We discussed some of the homework exercises, and we took a quiz.; Homework for Friday: The new groups will prepare exercises 44, 45, 46, and 48 on pages 100-101 (Chapter 3) for presentation in class.
Friday, September 26: We discussed the four problems assigned on Wednesday. The solution of problem 46 involved the Arzelà-Ascoli theorem, for which one may find the statement and a reference on page 487 in Appendix A of the textbook.; Homework for Monday: Study for the examination.
Monday, September 29: First examination
Wednesday, October 1: The graded examinations were returned, and we discussed the solutions. Also we discussed the tripartite classification of isolated singularities as removable singularities, poles, or essential singularities.; Homework for Friday: Read section 4.1 (pages 105-109) and do exercises 3, 5(c,d), and 7 on pages 145-146 (Chapter 4).
Friday, October 3: We discussed Laurent series.; Homework for Monday: Read section 4.2 (pages 109-113) and section 4.4 (pages 119-122) and do exercises 4, 13(b), and 17(b) on pages 145-148 (Chapter 4).
Monday, October 6: We worked on exercises 2, 6, 9, and 12 in Chapter 4 (pages 145-147).; Homework for Wednesday: Read section 4.3 (pages 113-119). Each group should be prepared to present the solution to its problem on Wednesday.
Wednesday, October 8: We looked at solutions to the problems from last time.; Homework for Friday: Read section 4.5 (pages 122-127) and do exercises 14, 23, and 36(a) on pages 147-150 (Chapter 4).
Friday, October 10: We worked on exercises 35 and 36 on page 150 (calculation of residues and integrals).; Homework for Monday: The groups will prepare the following items. (A) Find and correct the mistake in Example 4.6.3 (group 2); (B) Fill in the details of Example 4.6.6 (group 3); (C) Exercise 54, page 154 (group 1); (D) Exercise 57, page 155 (group 4).
Monday, October 13: We discussed solutions to problems 54 and 57.; Homework for Wednesday: Read section 4.6 (pages 128-137). The groups will prepare the following items. (A) Exercise 53 on page 154 (group 1); (B) Exercise 58 on page 155 (group 2); (C) Exercise 61 on page 155 (group 3); (D) Use contour integration to prove that the sum of 1/k⁴ over positive integers k equals π⁴/90 (group 4).
Wednesday, October 15: We discussed Examples 4.6.3 and 4.6.6 of contour integration.; Homework for Friday: Read section 4.7 (pages 137-145) and do exercises 37 and 40 on pages 151-152 (Chapter 4).
Friday, October 17: We discussed meromorphic functions, Mittag-Leffler's theorem, singularities at infinity, and the rational parametrization of the unit circle.; Homework for Monday: Do exercises 42, 43, and 44 on pages 152-153 (Chapter 4).
Monday, October 20: We discussed the computation by residues of the sum of 1/k⁴ over the positive integers k, the Riemann zeta function, and related topics.; Homework for Wednesday: Read section 5.1, pages 157-162, and review for the take-home examination to be distributed at the end of class on Wednesday.
Wednesday, October 22: We discussed the geometric viewpoint on inversion in the complex plane and on stereographic projection. The take-home examination was distributed.
Friday, October 24: No class meeting because of the take-home examination that is due at the beginning of class on Monday.
Monday, October 27: The discussion was an overview of the key topics in Chapter 5: the argument principle, the open mapping theorem, the maximum principle, the Schwarz lemma, the group of holomorphic automorphisms of the unit disc, Hurwitz's theorem, and Rouché's theorem.; Homework for Wednesday: Read sections 5.2 and 5.3 (pages 162-169) and do exercises 2, 3, and 6 on pages 174-175 (Chapter 5).
Wednesday, October 29: We worked on problem 10 on page 176 (Chapter 5) having to do with Rouché's theorem.; Homework for Friday: Read sections 5.4 and 5.5 (pages 169-174) and do exercises 5, 10(f), and 16 on pages 174-177 (Chapter 5).
Friday, October 31: We discussed some exercises involving Rouché's theorem (in particular, the interpretation of the hypothesis as meaning that equality does not hold in the triangle inequality). Also, we looked at a concrete solution of the fourth problem on the second examination.; Homework for Monday: Do exercises 11 and 14 on pages 176-177 (Chapter 5).
Monday, November 3: We worked on an exercise on properties of holomorphic functions.; Homework for Wednesday: Read sections 6.1-6.3 (pages 179-189) and do exercise 8 on page 202 (Chapter 6).
Wednesday, November 5: We discussed properties of linear fractional transformations and their representation on projective space.; Homework for Friday: Read section 6.4 (pages 189-192) and do exercises 1 and 27 on pages 202-205 (Chapter 6).
Friday, November 7: We continued the discussion of linear fractional transformations and of quantities that they preserve (cross ratios, symmetry, angles).; Homework for Monday: Read section 6.5 (pages 192-196) and do exercises 20 and 32 on pages 204-206 (Chapter 6).
Monday, November 10: We worked on an exercise on normal families of holomorphic functions.; Homework for Wednesday: Read sections 6.6-6.7 (pages 196-201). Groups 1, 2, 3, and 4 will do exercises 21, 22, 23, and 24 respectively (pages 204-205, Chapter 6).
Wednesday, November 12: We discussed solutions to exercises 21 and 22 on page 204 (Chapter 6).; Homework for Friday: Read sections 7.1 and 7.2 (pages 207-212) and do exercises 4, 10, and 17 on pages 243-245 (Chapter 7).
Friday, November 14: We worked on an exercise on properties of harmonic functions.; Homework for Monday: Read section 7.3 (pages 212-218) and do exercises 11 and 15 on pages 244-245 (Chapter 7).
Monday, November 17: We discussed the Poisson integral and compared its properties to those of the Cauchy integral. Also we summarized properties equivalent to simple connectivity of planar regions.; Homework for Wednesday: Read section 7.4 (pages 218-220) and review for the examination to be given on Friday.
Wednesday, November 19: We reviewed for the examination on Chapters 5 and 6 to be given on Friday.; Homework for Friday: Prepare for the examination.
Friday, November 21: Third examination
Monday, November 24: We discussed solutions to the third examination.
Wednesday, November 26: There will be no class meeting this day. Enjoy the Thanksgiving holiday. The next class meeting will be Monday, December 1.
Monday, December 1: We discussed subharmonic functions and Perron's method for solving the Dirichlet problem.; Homework for Wednesday: Read section 7.7 (pages 227-236) and do exercises 43 and 49 on pages 247-248 (Chapter 7).
Wednesday, December 3: We worked on an exercise on subharmonic functions and Perron's method.; Homework for Friday: Read section 7.6 (pages 224-226) and section 7.8 (pages 236-239). The groups will prepare the remaining parts of the class exercise on subharmonic functions and exercise 30 on page 246 (Chapter 7).
Friday, December 5: We discussed solutions to the exercise on subharmonic functions from last time and also to exercise 30 on page 246 (Chapter 7).; Homework for Monday: Read section 7.5 (pages 220-224) and section 7.9 (pages 240-243).
Monday, December 8: This was the last class meeting for the semester. We did the course evaluations and discussed the Schwarz reflection principle and holomorphic mappings of annuli. The final examination is scheduled for Tuesday, December 16 from 10:30 to 12:30.