Courses:

Differential Analysis >> Content Detail



Calendar / Schedule



Calendar

LEC #TOPICSKEY DATES
0Course Overview

Examples of Harmonic Functions

Fundamental Solutions for Laplacian and Heat Operator
1Harmonic Functions and Mean Value Theorem

Maximum Principle and Uniqueness

Harnack Inequality

Derivative Estimates for Harmonic Functions

Green's Representation Formula
2Definition of Green's Function for General Domains

Green's Function for a Ball

The Poisson Kernel and Poisson Integral

Solution of Dirichlet Problem in Balls for Continuous Boundary Data

Continuous + Mean Value Property <-> Harmonic
3Weak Solutions

Further Properties of Green's Functions

Weyl's Lemma: Regularity of Weakly Harmonic Functions
4A Removable Singularity Theorem

Laplacian in General Coordinate Systems

Asymptotic Expansions
5Kelvin Transform I: Direct Computation

Harmonicity at Infinity, and Decay Rates of Harmonic Functions

Kelvin II: Poission Integral Formula Proof

Kelvin III: Conformal Geometry Proof
6Weak Maximum Princple for Linear Elliptic Operators

Uniqueness of Solutions to Dirichlet Problem

A Priori C^0 Estimates for Solutions to Lu = f, c leq 0

Strong Maximum Principle
Homework 1 due
7Quasilinear Equations (Minimal Surface Equation)

Fully Nonlinear Equations (Monge-Ampere Equation)

Comparison Principle for Nonlinear Equations
8If Delta u in L^{infty}, then u in C^{1,alpha}, any 0 < alpha < 1

If Delta u in L^{p}, p > n, then u in C^{1,alpha}, p = n/(1 - alpha)
9If Delta u in C^{alpha}, alpha > 0, then u in C^{2}

Moreover, if alpha < 1, then u in C^{2,alpha} (Proof to be completed next lecture)
10Interior C^{2,alpha} Estimate for Newtonian Potential

Interior C^{2,alpha} Estimates for Poisson's Equation

Boundary Estimate on Newtonian Potential: C^{2,alpha} Estimate up to the Boundary for Domain with Flat Boundary Portion
11Schwartz Reflection Reviewed

Green's Function for Upper Half Space Reviewed

C^{2,alpha} Boundary Estimate for Poisson's Equation for Flat Boundary Portion

Global C^{2,alpha} Estimate for Poisson's Equation in a Ball for Zero Boundary Data

C^{2,alpha} Regularity of Dirichlet Problem in a Ball for C^{2,alpha} Boundary Data
Homework 2 due
12Global C^{2,alpha} Solution of Poisson's Equation Delta u = f in C^{alpha}, for C^{2,alpha} Boundary Values in Balls

Constant Coefficient Operators

Interpolation between Hölder Norms
13Interior Schauder Estimate
14Global Schauder Estimate

Banach Spaces and Contraction Mapping Principle
15Continuity Method

Can Solve Dirichlet Problem for General L Provided can Solve for Laplacian

Corollary: Solution of C^{2, alpha} Dirichlet Problem in Balls for General L

Solution of Dirichlet Problem in C^{2,alpha} for Continuous Boundary Values, in Balls
16Elliptic Regularity: If f and Coefficients of L in C^{k,alpha}, Lu = f, then u in C^{k+2,alpha}

C^{2,alpha} Regularity up to the Boundary
17C^{k,alpha} Regularity up to the Boundary

Hilbert Spaces and Riesz Representation Theorem

Weak Solution of Dirichlet Problem for Laplacian in W^{1,2}_0

Weak Derivatives

Sobolev Spaces
18Sobolev Imbedding Theorem p < n

Morrey's Inequality
19Sobolev Imbedding for p > n, Hölder Continuity

Kondrachov Compactness Theorem

Characterization of W^{1,p} in Terms of Difference Quotients
20Characterization of W^{1,p} in Terms of Difference Quotients (cont.)

Interior W^{2,2} Estimates for W^{1,2}_0 Solutions of Lu = f in L^2
21Interior W^{k+2,2} Estimates for Solutions of Lu = f in W^{k,2}

Global (up to the Boundary) W^{k+2,2} Estimates for Solutions of Lu = f in W^{k,2}
22Weak L^2 Maximum Principle

Global a priori W^{k+2,2} Estimate for Lu = f, f in W^{k,2}, c(x) leq 0
23Cube Decomposition

Marcinkiewicz Interpolation Theorem

L^p Estimate for the Newtonian Potential

W^{1,p} Estimate for N.P.

W^{2,2} Estimate for N.P.
24W^{2,p} Estimate for N.P., 1 < p < infty

W^{2,p} Estimate for Operators L with Continuous Leading Order Coefficients

 








© 2010-2017 OpenHigherEd.com, All Rights Reserved.
Open Higher Ed ® is a registered trademark of AmeriCareers LLC.