Presentation is loading. Please wait.

Presentation is loading. Please wait.

1 Matrix Algebra and Random Vectors Shyh-Kang Jeng Department of Electrical Engineering/ Graduate Institute of Communication/ Graduate Institute of Networking.

Published byEvangeline Lucas Modified over 8 years ago

Similar presentations

Presentation on theme: "1 Matrix Algebra and Random Vectors Shyh-Kang Jeng Department of Electrical Engineering/ Graduate Institute of Communication/ Graduate Institute of Networking."— Presentation transcript:

1 1 Matrix Algebra and Random Vectors Shyh-Kang Jeng Department of Electrical Engineering/ Graduate Institute of Communication/ Graduate Institute of Networking and Multimedia

2 2 General Statistical Distance

3 3

4 4 Quadratic Form

5 5 Statistical Distance under Rotated Coordinate System

6 6 Rotated Coordinate System 

7 7 Coordinate Transformation

8 8 Quadratic Form in Transformed Coordinate Systems

9 9 Diagonalized Quadratic Form

10 10 Orthogonal Matrix

11 11 Diagonalization

12 12 Concept of Mapping x

13 13 Eigenvalues

14 14 Eigenvectors

15 15 Spectral Decomposition

16 16 Positive Definite Matrix Matrix A is non-negative definite if for all x ’ =[ x 1, x 2, …, x k ] for all x ’ =[ x 1, x 2, …, x k ] Matrix A is positive definite if for all non-zero x for all non-zero x

17 17 Positive Definite Matrix

18 18 Inverse and Square-Root Matrix

19 19 Random Vectors and Random Matrices Random vector –Vector whose elements are random variables Random matrix –Matrix whose elements are random variables

20 20 Expected Value of a Random Matrix

21 21 Population Mean Vectors

22 22 Covariance

23 23 Statistically Independent

24 24 Population Variance-Covariance Matrices

25 25 Population Correlation Coefficients

26 26 Standard Deviation Matrix

27 27 Correlation Matrix from Covariance Matrix

28 28 Partitioning Covariance Matrix

29 29 Partitioning Covariance Matrix

30 30 Linear Combinations of Random Variables

31 31 Example of Linear Combinations of Random Variables

32 32 Linear Combinations of Random Variables

33 33 Sample Mean Vector and Covariance Matrix

34 34 Partitioning Sample Mean Vector

35 35 Partitioning Sample Covariance Matrix

36 36 Cauchy-Schwarz Inequality

37 37 Extended Cauchy-Schwarz Inequality

38 38 Maximization Lemma

39 39 Maximization of Quadratic Forms for Points on the Unit Sphere

40 40 Maximization of Quadratic Forms for Points on the Unit Sphere

41 41 Maximization of Quadratic Forms for Points on the Unit Sphere

42 42 Maximization of Quadratic Forms for Points on the Unit Sphere

Download ppt "1 Matrix Algebra and Random Vectors Shyh-Kang Jeng Department of Electrical Engineering/ Graduate Institute of Communication/ Graduate Institute of Networking."

Similar presentations

1er. Escuela Red ProTIC - Tandil, 18-28 de Abril, 2006 Principal component analysis (PCA) is a technique that is useful for the compression and classification.

1er. Escuela Red ProTIC - Tandil, de Abril, 2006 Principal component analysis (PCA) is a technique that is useful for the compression and classification.
Refresher: Vector and Matrix Algebra Mike Kirkpatrick Department of Chemical Engineering FAMU-FSU College of Engineering.

Refresher: Vector and Matrix Algebra Mike Kirkpatrick Department of Chemical Engineering FAMU-FSU College of Engineering.
An introduction to Principal Component Analysis (PCA)

An introduction to Principal Component Analysis (PCA)
Linear Transformations

Linear Transformations
3D Geometry for Computer Graphics

3D Geometry for Computer Graphics
Probability theory 2011 The multivariate normal distribution  Characterizing properties of the univariate normal distribution  Different definitions.

Probability theory 2011 The multivariate normal distribution  Characterizing properties of the univariate normal distribution  Different definitions.
Chapter 3 Determinants and Matrices

Chapter 3 Determinants and Matrices
The Terms that You Have to Know! Basis, Linear independent, Orthogonal Column space, Row space, Rank Linear combination Linear transformation Inner product.

The Terms that You Have to Know! Basis, Linear independent, Orthogonal Column space, Row space, Rank Linear combination Linear transformation Inner product.
3D Geometry for Computer Graphics

3D Geometry for Computer Graphics
236607 Visual Recognition Tutorial1 Random variables, distributions, and probability density functions Discrete Random Variables Continuous Random Variables.

Visual Recognition Tutorial1 Random variables, distributions, and probability density functions Discrete Random Variables Continuous Random Variables.
6 1 Linear Transformations. 6 2 Hopfield Network Questions.

6 1 Linear Transformations. 6 2 Hopfield Network Questions.
NUU Department of Electrical Engineering Linear Algebra---Meiling CHEN1 Lecture 28 is positive definite Similar matrices Jordan form.

NUU Department of Electrical Engineering Linear Algebra---Meiling CHEN1 Lecture 28 is positive definite Similar matrices Jordan form.
Digital Control Systems Vector-Matrix Analysis. Definitions.

Digital Control Systems Vector-Matrix Analysis. Definitions.
Probability theory 2008 Outline of lecture 5 The multivariate normal distribution  Characterizing properties of the univariate normal distribution  Different.

Probability theory 2008 Outline of lecture 5 The multivariate normal distribution  Characterizing properties of the univariate normal distribution  Different.
資訊科學數學11 : Linear Equation and Matrices

資訊科學數學11 : Linear Equation and Matrices
Techniques for studying correlation and covariance structure

Techniques for studying correlation and covariance structure
Correlation. The sample covariance matrix: where.

Correlation. The sample covariance matrix: where.
The Multivariate Normal Distribution, Part 2 BMTRY 726 1/14/2014.

The Multivariate Normal Distribution, Part 2 BMTRY 726 1/14/2014.
1 Multivariate Normal Distribution Shyh-Kang Jeng Department of Electrical Engineering/ Graduate Institute of Communication/ Graduate Institute of Networking.

1 Multivariate Normal Distribution Shyh-Kang Jeng Department of Electrical Engineering/ Graduate Institute of Communication/ Graduate Institute of Networking.
12.215 Modern Navigation Thomas Herring

Modern Navigation Thomas Herring

Similar presentations

Ads by Google