

Math 140C (Foundations of Analysis) Spring 2013 (http://www.math.ucsd.edu/~bdriver//140_F12S13/index.htm) You should also routinely login to your TED account for more course information. TED (was Website Course Tools) is the web interface through which solutions and possibly other course materials will be communicated. Please check it frequently for announcements. The TED site will also contain a record of your grades for this course  please make sure they are accurate. Announcements
Instructor: Bruce Driver, Office: AP&M 5260, Phone:
5342648. TA: Ali Behzadan: Office: APM 5748, Email: abehzada@ucsd.edu,
Phone: (858) 8222604. Lecture times: MWF 11:00  11:50 AM, APM B412.
Observed Holidays: Memorial Day, May 27. Homework: Homework assignments will be given weekly and are
due by 2:00PM on the due date (Wednesday) in the homework drop box in the
Basement of the APM building. The homework assignments are posted here on this
Website. Late homeworks will not be accepted!
140A Course Topics: Foundations of Real Analysis I (4) Math 140A is the first quarter of a rigorous
introduction to real analysis. The topics covered will be basic properties of
the real numbers, complex numbers, metric spaces, sequences and series of real
numbers, functions of a real variable and continuity. Most of the material for
these topics will be taken from the first four chapters of the text by Rudin.
(Students may not receive credit for both Math 140A and Math 142A.)
Prerequisites:
Math 31CH or Math 109, or consent of instructor. 140B Course Topics: Foundations of Real Analysis II (4) Second course in a rigorous threequarter sequence on real analysis. Topics include: differentiation, the RiemannStieltjes integral, sequences and series of functions, power series, Fourier series, and special functions. (Students may not receive credit for both Math 140B and Math 142B.) Prerequisites: Math 140A or consent of instructor. 140C Course Topics: Foundations of Real Analysis III (4) Third course in a rigorous threequarter sequence on real analysis. Topics include: differentiation of functions of several real variables, the implicit and inverse function theorems, the Lebesgue integral, infinitedimensional normed spaces. Prerequisites: Math 140B or consent of instructor. 
Jump to Bruce Driver's Homepage. Go to list of mathematics course pages. Last modified on Friday, 07 June 2013 10:20 AM.
