MULTIVARIATE
ANALYSIS
SPRING 2015
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Instructor: |
Guan-Hua Huang, Ph.D. |
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Office: 423 Joint Education Hall |
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Phone: 03-513-1334 |
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Email: ghuang@stat.nctu.edu.tw |
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Class meetings: |
Tuesday 9:00-12:00 at 406 Joint Education Hall |
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Office hours: |
By
appointment |
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Class website: |
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Credit: |
Three (3) credits |
COURSE
SUMMARY
The aims of this course are
Ÿ To illustrate extensions of univariate statistical
methodology to multivariate data.
Ÿ To introduce students to some of the distinctive
statistical methodologies which arise only in multivariate data.
Ÿ To introduce students to some of the computational
techniques required for multivariate analysis available in standard statistical
packages.
Topics include: multivariate
techniques and analyses, multivariate analysis of variance, principal component
analysis and factor analysis, cluster analysis, discrimination and
classification, structural equation models.
HANDOUTS
AND TEXTBOOKS
Handouts corresponding to each lecture
will be available on the class website before each class. The required textbook
for this course is:
Johnson, R.A. and Wichern, D.W., 2007. Applied
Multivariate Statistical Analysis (6th
Edition). Prentice Hall,
Reading
assignments will be made primary in this book.
PREREQUISITES
Students
are expected to have background on undergraduate linear algebra, probability, mathematical
statistics, and linear regression.
METHOD
OF STUDENT EVALUATION
The course grade will be based on 4 homework assignments (50%), 1 midterm exam (20%), and 1 final exam (30%).
COURSE OUTLINE
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Module |
Topic |
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1 |
Aspects of multivariate
analysis: - introduction - review of linear algebra and matrices |
1-30, 49-110 |
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2 |
Random vectors and random
sampling: - random vectors/matrices - distance - the sample - random sampling of the sample mean vector and
covariance matrix - generalized variance - matrix operations of sample values |
30-37, 60-78, 111-148 |
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3 |
Multivariate normal
distribution: - density and properties - sampling from multivariate normal and MLE - sampling distribution and large sample behavior
of - assessing the assumption of normality - transformation to near normality |
149-209 |
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4 |
Inferences about a mean
vector: - inference for a normal population mean - Hotelling's T2 and likelihood ratio
test - confidence regions and simultaneous comparisons
of component means - large sample inferences about a population mean
vector |
210-238 |
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5 |
Comparisons of several
multivariate means: - paired comparisons and repeated measures design - comparing mean vectors from two populations - comparing several multivariate population means
(one-way MANOVA) |
273-312 |
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6 |
Principal components: - introduction - population principal components - summarizing sample variation by principal
components - large sample inferences |
430-459 |
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7 |
Factor analysis: - introduction - orthogonal factor model - methods of estimation - factor rotation - factor scores |
481-526 |
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8 |
Clustering: - introduction - similarity measures - hierarchical clustering methods - k-means clustering methods - multidimensional scaling |
671-715 |
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9 |
Discrimination and
classification: - introduction - separation and classification for two populations - classification with two multivariate normal
populations - evaluating classification functions - fisher discriminant function - classification with several population |
575-644 |
