Difference between revisions of "MAT3633"

Section 0.2 & 1.1

• Loss of Significant Digits
• Nested Multiplication for Evaluating Polynomials
• Machine Representation of Real Numbers
• Loss of Significant Digits in Numerical Computing
• Review of Taylor's Theorem

• Bisection Method
• Bisection Method and Implementation
• Brief Introduction to Matlab

• Binary Number System
• Taylor's Theorem
• Intermediate Value Theorem

• (To be Entered)

Sections 1.2 & 1.3

• Fixed-Point Iteration
• Geometric Interpretation
• Convergence of Fixed Point Iterations
• Order of Convergence of Iterative Methods

• Limits of Accuracy: Conditioning of Problems
• Wilkinson Polynomial
• Sensitivity Analysis of Root-Finding
• Error Magnification Factor for Solution of Equations

• Limit of Sequences
• Solution Multiplicity of Equations

• (TBD)

Sections 1.4 & 1.5

• Newton's Method
• Algebraic and Geometric Interpretation of Newton's method
• Error Analysis for Newton's Method Based on Taylor's Theorem
• Newton's Method as a Fixed Point Iteration
• Modified Newton's Method and its Rate of Convergence

• Root-Finding Without Derivatives
• Secant Method and its Convergence
• Method of False Position, Muller's Method
• Stopping Criteria for Iterative Methods

• Remainder of Taylor's Series
• Intermediate Value Theorem

• (TBD)

Sections 2.1 & 2.2

• Solve Systems of Linear Equations: Gaussian Elimination
• Gaussian Elimination and its Operation Counts
• Gaussian Elimination with Pivoting
• Implementation of Gauss Elimination

• Solve System of Linear Equations: LU Decomposition
• Matrices for Elementary Row Operations
• Gauss Elimination as Matrix Products
• Advantages of Solutions by LU Decomposition

• Matrix-Matrix Products
• Matrix-Vector Products
• Inverse Matrix
• Elementary Row Operations

• (TBD)

Sections 2.3 & 2.5

• Error Analysis for Solution of Ax=b
• Various Norms for Vectors and Matrices: Compatibility of Vector and Matrix Norms
• Error Analysis for Solution of Ax=b
• Error Magnification Factor and Condition Number of Matrix

• Iterative Methods for Solving Ax=b
• Jacobi Method
• Gauss-Seidel Method
• Successive-Over-Relaxation (SOR) Method
• Convergence of Iterative Methods
• Spectral Radius of Matrix
• Convergence of General Iterative Method for Solving System of Linear Equations
• Sparse Matrix
• Comparison of Gauss Elimination and Iterative Methods

• Length of Vectors
• Eigenvalues of a Matrix
• Eigenvectors of a Matrix

• (TBD)

Sections 2.6 & 2.7

• Conjugate Gradient Method
• Symmetric Positive Definite Matrix and Properties
• Construction of Conjugate Gradient (CG) Method
• Properties of CG Method
• Preconditioning for CG Method

• Nonlinear System of Equations
• Taylor's Theorem for Multi-Variate Vector Valued Functions
• Newton's Method
• Broyden's Method

• Scalar Product of Vectors
• Determinant of a Matrix
• Eigenvalues of a Matrix
• Quadratic Polynomials of n-variables
• Partial Derivatives
• Gradients
• Chain Rule for Partial Derivatives

• (TBD)

Sections 3.1 & 3.2

• Data and Interpolating Functions
• Lagrange Basis Functions
• Properties of Lagrange Basis Functions
• Lagrange Form of the Interpolation Polynomials
• Newton's Divided Differences
• Properties of Newton's Divided Differences
• Newton's Form of the Interpolation Polynomials

• Interpolation Error and Runge Phenomenon
• Interpolation Error Analysis
• Runge Phenomenon
• Chebyshev Polynomial
• Error Estimates for Chebyshev Interpolation

• Fundamental Theorem of Algebra
• Rolle's Theorem

• (TBD)

Sections 3.4, 3.5, & 4.1

• Cubic Splines
• Cubic Splines
• Construction of Cubic Splines for Interpolation
• End Conditions
• Properties of Cubic Spline Interpolation

• Bezier Curves
• Bezier Curve and Fonts

• Least Square Method
• Least Square Method for Solving Inconsistent System of Linear Equations
• Basic Properties of Least Square Solutions

• One-Sided Limits
• Continuity of Functions
• Indefinite Integrals
• Extremum Values of Multivariate Quadratic Functions

• (TBD)

Sections 4.2 & 4.5

• Mathematical Models and Data Fitting
• Least square method for curve fitting and statistical modeling
• Survey of Models: linear model, periodic model, exponential models, logistic model, etc

• Nonlinear Least Square Fitting
• Taylor's Theorem for Vector Valued Multivariate Functions
• Gauss-Newton Method
• Levenberg-Marquardt Method

• Linear Spaces
• Basis Functions
• Product Rule for Vector Valued Multivariate Functions
• Chain Rule for Vector Valued Multivariate Functions

• (TBD)

Sections 5.1, 5.2, & 5.3

• Numerical Differentiation
• Finite difference (FD) Approximations of 1st order Derivative and Their Error Analysis
• FD approximations of 2nd order Derivatives and Their Error Analysis
• Undetermined Coefficient Method for FD Approximation
• Extrapolation Technique for Improving the Order of Approximation

• Numerical Integration: Newton-Cotes Formulas
• Midpoint rule
• Trapezoid rule
• Simpson's rule
• Error Analysis based on Taylor's Theorem
• Error Analysis based on Interpolation Errors
• Degree of Precision of Quadrature Rules
• Composite Quadrature Rules

• Numerical Integration: Romberg's Technique
• Motivation, construction and implementation of Romberg's Technique.

• Taylor's Theorem
• Interpolation Error Estimates
• Properties of Definite Integrals

• (TBD)

Sections 5.4 & 5.5

• Adaptive Numerical Integration
• Implementation of Adaptive Numerical Integration Techniques

• Gauss Quadrature Formulas
• Orthogonal Polynomials
• Legendre polynomials
• Gauss Quadrature Rule

• Long Divisions
• Substitution Methods for definite integrals

• How to estimate the error on a sub interval
• How to mark sub intervals to be further refinement?

• Motivation and difficulties with straightforward approach
• Legendre polynomials and their basic properties
• Gauss Quadrature rule based on Legendre polynomials
• Degree of precision of Gauss Quadrature
• Gauss quadrature formula on general interval and composite Gauss rules

Sections 10.1, 11.1, & 11.2

• Discrete Fourier Transform and Fast Fourier Transform (FTT)
• Fourier Series
• Discrete Fourier Transform (DFT)
• Matrix Form of Discrete Fourier Transform
• Inverse Discrete Fourier Transform
• DFT and Trigonometric Interpolation
• Fast Fourier Transform (FFT)

• Discrete Cosine Transform(optional)
• Discrete Cosine Transform(DCT)

• Image Compression(optional)
• Quantization
• Image Compression
• Image Decompression

• Complex Numbers
• Complex Variables
• Integration by Parts
• Convergence of Sequences
• Convergence of Series

• DCT and Interpolation by Cosine Functions
• Relation between DFT and DCT
• Fourier Transform of 2-Dimensional Functions
• DCT of 2-Dimensional Functions
• Interpolation Theorem for 2-Dimensional DCT

• Digital Gray scale images and color color images
• RGB format
• YCbCr (or YUV) format
• Convertion between RGB and YUV formats

Sections 12.1 & 12.2

• Power Iteration Methods
• Power Iteration Methods
• Convergence of Power Iteration Methods
• Inverse Power Iteration
• Inverse Power Iteration with Shift
• Rayleigh Quotient Iteration

• QR Algorithm for Computing Eigenvalues
• Orthogonal Matrices
• QR-Factorization
• Normalized Simultaneous Iteration(NSI)
• Unshifted QR Algorithm
• Shifted QR Algorithm

• Eigenvalues
• Eigenvectors
• Orthonormal Bases and the Gram-Schmidt Process

• Definition and basic properties of orthogonal matrices
• QR-Factorization based on Gram-Schmidt Orthogonalization

Sections 12.2

• QR Algorithm for Computing Eigenvalues
• Upper Hessenberg Form (UHF)
• Householder Reflector

• Matrices for Orthogonal Projection
• Matrices for Reflection
• Block Matrices
• Similar Matrices

• Convert a matrix into UHF by Householder reflectors