STA2112F - Mathematical Statistics I (Fall,
1999)
http://utstat.toronto.edu/~brunner/2112F99
This course is designed for graduate students in Statistics and Biostatistics.
Content:
Review of basic probability theory, distribution theory for normal samples,
convergence of random variables, statistical models, sufficiency and
ancillarity, statistical functionals, influence curves, maximum likelihood
estimation, computational methods.
Instructor: Jerry Brunner (brunner@utstat.utoronto.ca).
Office Hours: Tuesday, Sid Smith 6022 (behind the mail room),
10:30-11:30 and 1-2.
Required Text: "Statistical Inference" by G. Casella and R. Berger,
published by Wadsworth.
Texts on Reserve in the Math/Stat Library (Basement of Sidney Smith
Hall):
- Hogg and Craig: Introduction to Mathematical Statistics - A
traditional undergraduate text, about one step below our textbook.
- D. A. S. Fraser: Probability and Statistics - A
non-traditional "undergraduate" text, about one step above our textbook.
- M. Spiegel: Schaumm's outline of advanced calculus - all you
need to know, in compact format. Also for sale at the bookstore.
- W. Feller: Introduction to probability theory and its
applications, Vol. 1 - A classic, useful for some homework problems.
Time and Place: Every Thursday from 9-12 a.m. in RW229
Prerequisites: Advanced calculus (eg. MAT239), linear algebra
(eg. MAT223, MAT224), mathematical statistics (eg. STA257, STA261)
Evaluation: Mark will be based on weekly quizzes starting on
Thursday Sept. 23d, and a final exam. Quizzes count for 70% and the final
counts for 30%. Your lowest quiz mark will be dropped. No makeup quizzes
will be given under any circumstances.
Quiz Marks 1-10
Assignments (Not to be handed in; do them in preparation for the
quizzes)
- Quiz 1: Thursday September 23d., based on Parts 1 and 2 of the
Review Assignment
- Quiz 2: Thursday September 30th., based on Parts 3 and 4 of the
Review Assignment. Please use indicator
functions!
- Quiz 3: Thursday October 7th, based on lecture material from September
16th, Textbook examples from Chapter 1, Exercises 1.1, 1.4, 1.5, 1.10, 1.13,
1.17*, 1.23*, 1.41, 1.44, 1.45, 1.52, 1.54, 1.56, 1.59, 1.60, 1.61, 1.62,
1.63, and some homework on limits of sequences
- Quiz 4: Thursday Oct 14th
- Text problems 2.8, 2.15, 2.16, 2.18, 2.19* (assume continuous,
but it still gets a star), 2.26, 2.27, 1.62 (This is a repeat. Express as a
mixed random variable and also draw a picture. I was
able to make this problem fairly mechanical by writing
V = 5 I{T<3} + 2T I{T>3}).
- An infinite collection of random variables is sometimes called
a stochastic process. Let X= (X1,X2, ... )
be a stochastic process in which Xn is a discrete random variable
supported on the same set of 3 real numbers {a,b,c}, for n = 1, 2, ....
- What is the sample space inhabited by X?
- Is this sample space countable or uncountable? Prove
your answer.
- Quiz 5: Thursday Oct 21st
- Quiz 6: Thursday Oct 28
- Quiz 7: Thursday Nov 4th. Problems 3.25, 3.26, 3.28, 3.29, 3.30,
4.41, 4.43. Want a hint on problem 4.41c?
- Quiz 9: Thursday Nov 18th.
- Quiz 10: Thursday Nov 25th. Bring the convergence handout.
- Quiz 11: Thursday Dec. 2nd. Bring the convergence handout.
Handouts
- Indicator Handout
- Epsilon-delta Notes
- Mixed Distribution Handout
- Math tools Handout
- Convergence of Random Variables
If you are connecting from a computer not located on campus, you may need
to download Adobe Acrobat Reader (free software) in order to see mathematical
text, including some assignments. You can get it from either of these
locations; one may be busy.
Adobe Acrobat
Adobe Acrobat (Mirror sites)