MATH 312---Autumn, 2007
Analysis I: Measure, Integration, and Probability
MWF 11:30 -- 12:20, 206 Eckhart
Greg Lawler , 415 Eckhart,
e-mail: lawler at math.uchicago.edu
Grader: Catalin Carstea
Text
Rudin, Real and Complex Analysis
Notes on Probability,
This is the first quarter of a three-quarter sequence on
real and complex analysis intended primarily for first-year
graduate students in the department of mathematics (but is open to
all students with the appropriate background and mathematical
maturity). The plan is to have lectures on Mondays and Wednesdays
from the half of Rudin's book and for Friday lectures to be on
probability.
There will be weekly homework exercises due on Wednesdays. That
assignment will cover material from the lectures of the previous
week. There will also be a large problem set at the end of
the semester that will serve as a final exam.
Students may work together on homework exercises EXCEPT FOR THE FINAL
PROBLEM SET, but must write-up their work separately.
Problem Set 1 (due Oct 3)
Problem Set 2 (due Oct 10)
Problem Set 3 (due Oct 17)
Problem Set 4 (due Oct 24) (CORRECTION:
In part 3 of the long extra exercise (which is part 4 if you downloaded
this a few days ago), we want to show that there is a __G-measurable__
E(X|G) satisfying (1). Without that condition of G-measurability,
the problem is really
trivial! This then defines E(X|G) for all integrable X. In parts
5 and 6, assume that X is integrable. In part 4, XY must be integrable
if X,Y are square integrable.)
Problem Set 5 (due Oct 31)
Problem Set 6 (due Nov 7)
Problem Set 7 (due Nov 14)
(revised Nov. 9 --- problem
8 from Rudin removed and a new extra problem added)
Problem Set 8 (due Nov 21)