Table of Contents

Math 570 Applied Multivariate Analysis.
Fall 2014

Prerequisite

Math 501 and Math 502, or equivalent. Graduate students from outside of the mathematical department and senior undergraduate students may take this course with some preparation (please consult the instructor prior to the semester). One lecture session will be devoted to reviewing linear algebra materials that are useful in this course.

Learning Objectives

  1. A review of the theoretical aspect of Multivariate Statistical Analysis, including: multivariate normal distributions, the multivariate Central Limit Theorem, quadratic forms, Wishart distributions, Hotelling's T square, inference about multivariate normal distributions.
  2. Modern applied multivariate statistical methods, including: Principal Component Analysis, Canonical Correlation Analysis, Classification (Bayes rule, Linear and Quadratic discriminant analysis, cross-validation, and logistic regression etc.), factor analysis and Independent Component Analysis, clustering and multidimensional scaling.
  3. Machine learning approaches, including Classification and Regression Trees, Support Vector Machine and other large margin classifiers, kernel methods, LASSO and sparsity methods, additive models, etc., if time permits.

The required texts are Härdle & Simar 2012 and Izenman 2013 (see below for details).

Most of the books listed above have been left on course reserve. You can go to the Newcomb Reading Room to loan the books for up to 1 day a time.

Grading

Software

There is no designated software for this course. You may use the software that makes the most sense for you. Many pharmaceutical companies use SAS for compliance with FDA regulations. Academic intuitions as well as labs often use R and python. Corporations often use MATLAB, Stata, Minitab, S, etc. because of the relatively high reliability despite the cost. However, it is expected that the student immerse herself with use of at least one software.

Used to be expensive, SAS University Edition is now free for download and use.

Course decks

You need to log in this website in order to download these documents. They can also be downloaded from the blackboard (see the content page).

Schedule

Presentations

Nov 4 Xiaojie Du (zou06)
Nov 6 Lin Yao (shen07)
Nov 11 Lishun Li (Jung09)
Nov 13 Armin Pillhofer (tibshirani02)
Nov 18 Zach Seymour (Witten10)
Nov 20 Ruiqi Liu (sun12)