Difference between revisions of "MAT4223"

Uniform Convergence of Sequences of Functions

• Sequences and Their Limits
• The Cauchy Criterion for Convergence
• The Definition of the Limit of a Function
• Continuous Functions on Intervals
• The Derivative
• Riemann Integrable Functions

• Understand the difference between pointwise convergence and uniform convergence
• Understand how the continuity, diferrentiablity and integrability behave under uniform convergence

Uniform Convergence of Series of Functions

• Introduction to Infinite Series
• Uniform Convergence of Sequences of Functions

• Learn the term-by-term differentiation (resp. integration) theorem
• Weierstrass M-test

Power Series and Analytic Functions

• Power Series and Functions
• Ratio and Root Tests
• Comparison Tests
• Taylor's Theorem
• Uniform Convergence of Series of Functions

• Determine the set of convergence for a power series
• Apply the results of the previous sections to power series.
• Apply the results to the elementary functions

Weierstrass Example

• The Weierstrass M-test

• Learn to construct a continuous function everywhere which is not differentiable anywhere

Euclidean Spaces: Algebraic Structure and Inner Product

• Vectors and the Dot Product
• Properties of the Trigonometric Functions

• Norms in the Euclidean space, comparison
• Cauchy-Schwartz inequality, triangle inequality

Linear Transformations

• Introduction to Linear Transformations
• Basics of Matrices
• Euclidean Spaces: Algebraic Structure and Inner Product

• The matrix of a linear transformation
• The norm of a linear transformation
• Write equations of hyperplanes in the Euclidean space

The Topology of Higher Dimensions: interior, closure and boundary

• Closed and open intervals
• Cluster Points
• Absolute Value and the Real Line

• Learn basic notions of topology in the Euclidean space

Limits of Sequences in the Euclidean space and the Bolzano-Weierstrass Theorem

• Sequences and Their Limits
• The Cauchy Criterion for Convergence
• Subsequences

• Convergence theorems
• Bolzano-Weierstrass Theorem

Heine-Borel Theorem

• The Bolzano-Weierstrass Theorem
• The Topology of Higher Dimensions: interior, closure and boundary

• Understand the structure of compact sets
• Applications

Limits of Vector Functions

• The Definition of the Limit of a Function
• The Limit Theorems for Functions
• The Topology of Higher Dimensions: interior, closure and boundary

• Limit theorems, sequential criterion
• Iterated limits
• Commutation of iterated limits

Continuous Vector Functions

• Continuous Functions
• The Topology of Higher Dimensions: interior, closure and boundary

• Characterizations of continuity
• Properties of continuous functions
• Extreme value theorem

Partial Derivatives and Integrals

• The Derivative
• The Riemann Integral
• Continuous Functions

• Commutation of partial derivatives
• Commutation of the limit with the the integral
• Differentiating under the integral sign

Derivatives of Vector Functions

• Continuous Vector Functions
• Partial Derivatives and Integrals
• Euclidean Spaces: Algebraic Structure and Inner Product

• Necessary and sufficient conditions for differentiation
• The total derivative of a differentiable function
• Determine whether a function if differentiable or not

Rules for Differentiation and Tangent Planes

• Differentiation of Vector-valued Functions
• The Derivative
• Euclidean Spaces: Algebraic Structure and Inner Product

• Basic rules for differentiation and applications
• Tangent hyperplanes to surfaces
• Chain rule

Mean-Value Theorems for Vector Valued Functions

• The Mean Value Theorem
• Partial Derivatives and Integrals
• Derivatives of Vector Functions

• Mean-value theorems for vector-valued functions
• Lipschitz functions

Taylor's Formula in Several Variables

• Taylor's Theorem
• Power Series and Analytic Functions
• Mean-Value Theorems for Vector Valued Functions

• Taylor's Formula in several variables, applications

The Inverse Function Theorem and the Implicit Function Theorem

• Inverse Functions
• Cramer's Rule
• Mean-Value Theorems for Vector Valued Functions

• The inverse function theorem and the implicit function theorem for vector-valued functions
• Applications

Lebesque Theorem for Riemann Integrability on the Real Line

• Continuous Functions
• Riemann Integrable Functions

• Define an almost everywhere continuous function
• The Riemann integrable functions are those almost everywhere continuous

Integration in the Euclidean space: Jordan Regions and Volume

• Riemann Integrable Functions
• The Darboux Integral

• Jordan regions: volume and properties

Riemann Integration on Jordan Regions in Higher Dimensions

• Integration in the Euclidean space: Jordan Regions and Volume

• Definition of a Riemann integrable function, characterization, properties
• Any continuous function on a closed Jordan region is integrable
• Mean-valued theorems for multiple integrals

Iterated Integrals and Fubini's Theorem

• Riemann Integration on Jordan Regions in Higher Dimensions

• Fubini's theorem and applications