Assignment 1 as a (PDF)
Prove that a Harmonic function with an interior maximum is constant.
Write out the laplacian in planepolar coordinates.
A Green's function on n is a harmonic function on n \{0} which depends only on the radius (for example log r on 2). Find nontrivial Green's functions for all dimensions.
The heat equation for a function u: × [0, ∞) is . Find all solutions of the form u = ƒ(t)g(x).
Find all solutions u of the heat equation on [0, 1] × [0, ∞) with the u = 0 on ({0} ∪ {1}) × [0, ∞).
Assignment 2 as a (PDF)
Let u be a function on the ball B1(0) ⊂ 2 with ∫B1(0) |u|p <]infty for some constant p > 2. Show that u is holder continuous. [Hint: Use Morrey on ∫ 1.|u|2 ]
Let u: n → , and define OSCBr(x)u = supBr(x)u - infBr(x)u. Show that if there is some constant 0 < γ < 1 with
oscBr(x)u ≤ γ oscB2r(x)u
for all x and all r then u is Holder continuous.
Let L be a uniformly elliptic 2nd order operator in divergence form taking
Let u be a function with Lu ≥ 0, and Φ: → a function with Φ', Φ" ≥ 0. Show that L(Φ(u))≥ 0.
Let L be an operator as in question 3, and let u be an L harmonic function. Prove that |u|2 is holder contiuous. [This is likely to be difficult.]