An Introduction to Analysis/Differential forms

In particular, the chapter covers subharmonic functions.

4 Theorem A linear operator ${\displaystyle T}$ from a finite-diemnsional vector space ${\displaystyle 𝒳}$ into itself is injective if and only if it is surjective.
Proof: Let ${\displaystyle e_1,...e_n}$ be a basis for ${\displaystyle 𝒳}$. The following are equivalent: (i) ${\displaystyle T}$ has zero kernel. (ii) ${\displaystyle 0=T({\displaystyle \sum _{j=1}^n}{a}_j{e}_j)={\displaystyle \sum _{j=1}^n}{a}_{j}T(e_j)}$ implies that all the ${\displaystyle a_j}$ are zero. (iii) ${\displaystyle T(e_1),...T(e_n)}$ is a basis for ${\displaystyle 𝒳}$. Since the range of T is the span of the set ${\displaystyle \{T(e_1),...T(e_n)\}}$, the theorem now follows. ${\displaystyle ◻}$

4 Theorem Let ${\displaystyle \mathrm{\Omega }}$ be a neighborhood of a point ${\displaystyle (a,b)\in {ℝ}^n\times {ℝ}^m}$. If ${\displaystyle f_j(a,b)=0}$ and ${\displaystyle f_j\in {𝒞}^1(\mathrm{\Omega })}$ for ${\displaystyle j=1...n}$, and if the matrix

${\displaystyle \left[\begin{array}{ccc}\frac{\partial f_1}{\partial x_1}& \cdots & \frac{\partial f_1}{\partial x_n}\\ ⋮& \ddots & ⋮\\ \frac{\partial f_n}{\partial x_1}& \cdots & \frac{\partial f_n}{\partial x_n}\end{array}\right]}$

is invertible at ${\displaystyle (a,b)}$, then the equations ${\displaystyle f_j(x,y)=0,j=1...n}$, has a unique solution ${\displaystyle x}$ such that ${\displaystyle x(b)=a}$ and ${\displaystyle x}$ is ${\displaystyle {𝒞}^1}$ in some neighborhood of ${\displaystyle b}$.
Proof (from [1]):

We need

4 Lemma If a linear operator ${\displaystyle T}$ is injective in ${\displaystyle \mathrm{\Omega }}$, then ${\displaystyle T^{-1}}$ is defined and continuously differentiable in ${\displaystyle T(\mathrm{\Omega })}$.

Let ${\displaystyle F(x,y)=(f(x,y),y)}$ for ${\displaystyle (x,y)\in \mathrm{\Omega }}$.

A set

${\displaystyle E}$

is connected if there exists no open cover of

${\displaystyle E}$

consisting of two disjoint open sets.

A connected component of a set ${\displaystyle E}$ in ${\displaystyle G}$ is the "maximal" connected subsets containing ${\displaystyle E}$; that is, the component = ${\displaystyle \bigcup }$ connected set ${\displaystyle \subset G}$ containing ${\displaystyle E}$. Every topological space, in other words, consists of components, which are necessarily disjoint and closed. That a topological space consists of exactly one component is equivalent to that the space is connected.

To give an example, induce to an arbitrary set ${\displaystyle G}$ a topology as a collection of any subsets of ${\displaystyle G}$ (i.e., the finest topology). The topological space ${\displaystyle G}$ has no closed sets since every open set in ${\displaystyle G}$ is also closed. The components of ${\displaystyle G}$ are the same as all the subsets of ${\displaystyle G}$ since .

4.3 Theorem The following are equivalent. Given a topological space ${\displaystyle G}$,

1. ${\displaystyle G}$ is connected.
2. If ${\displaystyle G=A\cup B}$, then both ${\displaystyle \bar{A}\cap B}$ and ${\displaystyle A\cap \bar{B}}$ are nonempty.
3. Only ${\displaystyle \varnothing }$ and ${\displaystyle G}$ have empty boundary.

Proof: Suppose ${\displaystyle G=A\cup B}$ for some sets ${\displaystyle A}$ and ${\displaystyle B}$. If ${\displaystyle \bar{A}}$ and ${\displaystyle B}$ are disjoint, so are ${\displaystyle A}$ and ${\displaystyle B}$ since ${\displaystyle A\subset \bar{A}}$. This is to say that (1) is false, which also follows if ${\displaystyle A}$ and ${\displaystyle \bar{B}}$ are disjoint for the same reasoning. This shows that (1) implies (2). Now suppose ${\displaystyle E}$ is nonempty, open, closed subset of ${\displaystyle G}$ that is not ${\displaystyle G}$. Then so is ${\displaystyle G\mathrm{\setminus }E}$. Thus, ${\displaystyle G=E\cup (G\mathrm{\setminus }E)}$, the disjoint union of an open set and a closed set. This contradicts (2). Hence, (2) implies (3. Finally, suppose (1) is false; that is, there are at least two components of ${\displaystyle G}$, either of which has empty boundary but is not ${\displaystyle G}$. ${\displaystyle ◻}$

A path is a continuous function from [0, 1] to some space; e.g., a straight-line represented by ${\displaystyle f(t)}$ = A path is a loop if f(0) = f(1). e.g., a unit circle represented by ${\displaystyle f(t)=e^{t2\pi i}}$.

Two points ${\displaystyle a}$ and ${\displaystyle b}$ are said to be jointed by a path ${\displaystyle f}$ if f(0) = a and f(1) = b. We say the space is path-connected, the importance of which notion is the following.

5.1 Theorem A set ${\displaystyle E}$ is path-connected set if and only if it is connected.

Two paths are said to be homotopic if FIXME.

We say a space is simply connected if every path in the space is homotopic to a point. For example, in the plane ${\displaystyle {ℝ}^2}$, every circle centered at the origin is homotopic to the origin. But in ${\displaystyle {ℝ}^2/0}$ the circle fails to be homotopic to the origin. Hence, the former is simply connected while the latter is not. We also see, in light of theorem 3.1, that every simply-connected space is connected.

5.1 Theorem Let ${\displaystyle E}$ be a set. The following are equivalent.

• (i) ${\displaystyle df=0}$ implies that ${\displaystyle f}$ is constant for any ${\displaystyle f\in {𝒞}^1(E)}$
• (ii) ${\displaystyle E}$ is connected.

4 Lemma (Urysohn) A topological space ${\displaystyle X}$ is normal if and only if for any disjoint closed sets ${\displaystyle A}$ and ${\displaystyle B}$ there exists a continuous function ${\displaystyle f}$ such that ${\displaystyle 0\le f\ge 1}$, ${\displaystyle f=0}$ on ${\displaystyle A}$ and ${\displaystyle f=1}$ on ${\displaystyle B}$. Proof (from Urysohn's lemma):

4 Corollary A topological space ${\displaystyle X}$ is completely regular if and only if there exists a continuous injection from ${\displaystyle X}$ to a compact Hausdorff space with continuous inverse.

4 Theorem A Hausdorff space is paracompact if and only if it admits a partition of unity.

We say ${\displaystyle ℱ}$ is a pre-sheaf on a topological space ${\displaystyle M}$ if for any open subsets ${\displaystyle U\subset V\subset W}$ of ${\displaystyle M}$

• ${\displaystyle ℱ(U)}$ is an abelian group, ring, module, etc.
• If ${\displaystyle {\rho }_{U,V}:U\to V}$ is a set-inclusion (i.e., ${\displaystyle \rho (x)=x}$), then:

${\displaystyle ℱ({\rho }_{U,V}):ℱ(V)\to ℱ(U)}$ is a group (resp. ring, module, etc.) homomorphism such that ${\displaystyle ℱ({\rho }_{U,U})}$ = ${\displaystyle {\mathrm{id}}_{ℱ(U)}}$ and ${\displaystyle ℱ({\rho }_{U,W})=ℱ({\rho }_{U,V})\circ ℱ({\rho }_{V,W})}$

If in addition the following holds a pre-sheaf is called a sheaf: for open sets ${\displaystyle U_j\subset M}$ and their union ${\displaystyle U}$

• (a) If ${\displaystyle f,g\in ℱ(U)}$ and ${\displaystyle f{|}_{U_j}=g{|}_{U_j}}$ for all ${\displaystyle j}$, then ${\displaystyle f{|}_U=g{|}_U}$
• (b) If ${\displaystyle f\in ℱ(U_j)}$ and ${\displaystyle f_j{|}_{U_j\cap U_k}=f_k{|}_{U_j\cap U_k}}$ for all ${\displaystyle j,k}$, then there exists a ${\displaystyle f\in ℱ(U)}$ such that ${\displaystyle f{|}_{U_j}=f_j}$ for all ${\displaystyle j}$.

Here, we used (and will use) the notation ${\displaystyle g{|}_B=ℱ({\rho }_{B,A})(g)}$ for ${\displaystyle g\in ℱ(A)}$ and ${\displaystyle B\subset A}$. We shall also denote ${\displaystyle ℱ({\rho }_{U,V})}$ simply by ${\displaystyle {\rho }_{U,V}}$ when no confusion is possible. ${\displaystyle ◻}$

Given sheaves ${\displaystyle ℱ,𝒢}$ a sheaf (resp. pre-sheaf) homomorphism ${\displaystyle \varphi :ℱ\to 𝒢}$ is given by a group (or ring, module, etc) homomorphism ${\displaystyle {\varphi }_U:ℱ(U)\to 𝒢(U)}$ such that ${\displaystyle {\varphi }_U\circ ℱ({\rho }_{U,V})=𝒢({\rho }_{U,V})\circ {\varphi }_V}$ for any ${\displaystyle U\subset V}$.

A sheaf homomorphism ${\displaystyle \varphi :ℱ\to 𝒢}$ is called an isomorphism if there is another sheaf homomorphism ${\displaystyle \psi :𝒢\to ℱ}$ such that ${\displaystyle \varphi \circ \psi }$ = identity = ${\displaystyle \psi \circ \varphi }$. A word of caution: it is not necessary that if ${\displaystyle \varphi }$ is surjective, then ${\displaystyle {\varphi }_U}$ is surjective for every open subset ${\displaystyle U}$, though the converse holds.

4 Corollary If ${\displaystyle \varphi }$ is a sheaf homomorphism, then its kernel ${\displaystyle \ker (\varphi )}$ is a sheaf when it is defined by

${\displaystyle \ker (\varphi )(U)=\ker ({\varphi }_U)}$ for each ${\displaystyle U}$.

Proof: Everything is clear except that ${\displaystyle f\in \ker (\varphi )(U=\cup U_j)}$ (while we know ${\displaystyle f\in ℱ(U)}$) in (b) of the definition. But since ${\displaystyle ({\varphi }_{U}f){|}_{U_j}={\varphi }_U(f{|}_{U_j})={\varphi }_U{f}_j=0}$ for all ${\displaystyle j}$ and ${\displaystyle 𝒢}$ is a sheaf, we have ${\displaystyle {\varphi }_{U}f=0}$. ${\displaystyle ◻}$

Though ${\displaystyle \mathrm{im}(\varphi )}$ can be defined similarly, in general it need not be a sheaf. Thus, we shall use the following formal procedure.

4 Lemma (sheafification) Every pre-sheaf ${\displaystyle ℱ}$ on ${\displaystyle M}$ gives rise to a sheaf ${\displaystyle 𝒢}$ on ${\displaystyle M}$ defined for each open subset ${\displaystyle U\subset M}$ by ${\displaystyle 𝒢(U)=}$ all the maps ${\displaystyle f:U\to {\cup }_{z\in U}{ℱ}_z}$ satisfying the following:

• ${\displaystyle U}$ is the union of open sets ${\displaystyle V_j\subset U}$, and
• For every ${\displaystyle j}$ there is some ${\displaystyle g_j\in ℱ(V_j)}$ such that ${\displaystyle f_z=(g_j{)}_z}$ for all ${\displaystyle z\in V_j}$ (where ${\displaystyle f_z=f(z)}$ and ${\displaystyle (g_j{)}_z=(V_j,g_j)}$).

If ${\displaystyle {\psi }_U(g)=g}$ for every ${\displaystyle g\in ℱ(U)}$, ${\displaystyle {\psi }_U}$ is an injection from ${\displaystyle ℱ(U)}$ to ${\displaystyle 𝒢(U)}$, and it is an isomorphism if ${\displaystyle ℱ}$ is actually a sheaf.
Proof: It is clear that ${\displaystyle 𝒢}$ is a sheaf and that ${\displaystyle {\varphi }_U}$ is injective since we can just take ${\displaystyle V_j=U}$. Next, suppose ${\displaystyle ℱ}$ is a sheaf, let ${\displaystyle f\in 𝒢(U)}$ be given, and let ${\displaystyle V_j}$ and ${\displaystyle g_j}$ correspond to ${\displaystyle f}$ as in the definition. For every ${\displaystyle j,k}$ we have

${\displaystyle (g_j{|}_{V_j\cap V_k}{)}_z=f_z=(g_k{|}_{V_j\cap V_k}{)}_z}$ for all ${\displaystyle z\in V_j\cap V_k}$,

which implies ${\displaystyle g_j{|}_{V_j\cap V_k}=g_k{|}_{V_j\cap V_k}}$. Since ${\displaystyle ℱ}$ is a sheaf, we can thus find ${\displaystyle g\in ℱ(U)}$ with ${\displaystyle g{|}_{V_j}=g_j}$ for every ${\displaystyle j}$. This is to say, we may have supposed that ${\displaystyle V_j=U}$ in the first place. Hence, ${\displaystyle {\psi }_U}$ is surjective. ${\displaystyle ◻}$

Let ${\displaystyle \varphi }$ be a sheaf homomorphism. By the application of the lemma to the pre-sheaf given by ${\displaystyle ℱ(U)=\mathrm{im}({\varphi }_U)}$ we define the image sheaf ${\displaystyle \mathrm{im}(\varphi )}$.

Corollary For any ${\displaystyle U}$, ${\displaystyle \{x;x\in U,f(x)=g(x)\}}$ is open for any ${\displaystyle f,g\in ℱ(U)</mah>{.}^{″}<br/>Asheaf<math>ℱ}$ on ${\displaystyle M}$ is said to be flasque if ${\displaystyle {\rho }_{U,M}:ℱ(M)\to ℱ(U)}$ is surjective.

4 Lemma Every short exact sequence of sheaves:

${\displaystyle 0⟶{ℱ}^0⟶{ℱ}^1⟶{ℱ}^2⟶0}$

induces for every ${\displaystyle U}$ an exact sequence

${\displaystyle 0⟶{ℱ}^0(U)⟶{ℱ}^1(U)⟶{ℱ}^2(U)}$

where the map ${\displaystyle {ℱ}^1(U)\to {ℱ}^2(U)}$ is surjective if ${\displaystyle {ℱ}^0}$ is flasque.
Proof: By ${\displaystyle {\delta }^j}$ we denote the map ${\displaystyle {ℱ}^j\to {ℱ}^{j+1}}$. It is clear that ${\displaystyle \ker ({\delta }^0(U))=0}$ if ${\displaystyle \ker ({\delta }^0)=0}$. Let ${\displaystyle f\in \ker ({{\delta }^1}_U)=\ker ({\delta }^1)(U)=\mathrm{im}({\delta }^0)(U)}$ be given. Since ${\displaystyle \mathrm{im}({\delta }^0)(U)}$ is a sheafification, we can write ${\displaystyle U}$ as the union of open subsets ${\displaystyle V_j\subset U}$ so that: for each ${\displaystyle j}$ there is a ${\displaystyle g_j\in \mathrm{im}({{\delta }^0}_U)}$ such that ${\displaystyle f_z=(g_j{)}_z}$ for all ${\displaystyle z\in V_j}$. That is, there are ${\displaystyle u_j}$ with ${\displaystyle {{\delta }^0}_U(u_j)=g_j}$ and we have:

${\displaystyle {{\delta }^0}_{V_j\cap V_k}(u_j{|}_{V_j\cap V_k})=f{|}_{V_j\cap V_k}={{\delta }^0}_{V_j\cap V_k}(u_k{|}_{V_j\cap V_k})}$,

and ${\displaystyle u_j{|}_{V_j\cap V_k}=u_k{|}_{V_j\cap V_k}}$ since ${\displaystyle {{\delta }^0}_U}$ is injective. Hence, there exists ${\displaystyle u\in {ℱ}^0(U)}$ with ${\displaystyle u{|}_{V_j}=u_j}$. It follows: ${\displaystyle ({{\delta }^0}_{U}u){|}_{V_j}={{\delta }^0}_{V_j}{u}_j=f{|}_{V_j}}$ and so ${\displaystyle {{\delta }^0}_{U}u=f}$. It remains to show that ${\displaystyle {{\delta }^1}_U}$ is surjective when ${\displaystyle F^0}$ is flasque. To this end, let ${\displaystyle f\in \mathrm{im}({\delta }^1)(U)}$ be given, and as before let ${\displaystyle V_j,u_j}$ so that we have:

${\displaystyle {{\delta }^1}_{V_j\cap V_k}((u_j-u_k){|}_{V_j\cap V_k})=0}$.

Then since ${\displaystyle \ker ({{\delta }^1}_{V_j\cap V_k})=\mathrm{im}({{\delta }^0}_{V_j\cap V_k})}$ there are ${\displaystyle s_{jk}}$ such that:

${\displaystyle (u_j-u_k){|}_{V_j\cap V_k}={{\delta }^0}_{V_j\cap V_k}{s}_{jk}}$.

We shall construct ${\displaystyle v_j}$ with

${\displaystyle (v_k-v_j){|}_{V_j\cap V_k}={{\delta }^0}_{V_j\cap V_k}{s}_{jk}}$

${\displaystyle ◻}$

In this chapter, we shall prove (after some works are done) Cauchy's integral formula, first by the Stoke's theorem then again by the notion of the winding number.

6.1 Theorem There exists a partition of unity ${\displaystyle {\varphi }_i}$ subordinate to the cover ${\displaystyle \{G_j\}}$; that is:

• (a) ${\displaystyle {\varphi }_i}$ is infinitely differentiable in every ${\displaystyle G_j}$.
• (b) ${\displaystyle \text{supp }{\varphi }_j}$ is in ${\displaystyle G_j}$.
• (c) If ${\displaystyle x}$ is in ${\displaystyle G_j}$, then ${\displaystyle {\displaystyle \sum _1^N}{\varphi }_j=1}$ for some ${\displaystyle N}$. (locally finite)

Proof: Let ${\displaystyle G}$ = the union of all ${\displaystyle G_j}$. Choose ${\displaystyle g_j}$ in ${\displaystyle C^{\mathrm{\infty }}(G)}$ so that {all ${\displaystyle \text{supp }{g}_j}$} covers ${\displaystyle G}$ and ${\displaystyle 0\le g_j\ge 1}$. (See the lemma for why this is possible.)
Let ${\displaystyle {\varphi }_1=g_1}$, ${\displaystyle {\varphi }_2=(1-g_1)g_2}$, ${\displaystyle {\varphi }_3=(1-g_1)(1-g_2)g_3}$ and so forth. If ${\displaystyle {\displaystyle \sum _1^m}{\varphi }_j=1-{\displaystyle \prod _1^m}{g}_j}$ for some ${\displaystyle m}$, then the computation gives: ${\displaystyle {\displaystyle \sum _1^{m+1}}{\varphi }_j=1-{\displaystyle \prod _1^{m+1}}{g}_j}$. Since ${\displaystyle {\varphi }_1=1-(1-g_1)}$, by induction,

${\displaystyle {\displaystyle \sum _1^{\mathrm{\infty }}}{\varphi }_j=1-{\displaystyle \prod _1^{\mathrm{\infty }}}{g}_j}$, which is locally finite.

For ${\displaystyle x}$ in ${\displaystyle G_j}$, some ${\displaystyle g_j(x)=1}$. Thus, (c) holds and the others (a) and (b) are also true by construction. ${\displaystyle ◻}$

We define the integral of a form ${\displaystyle \theta }$ over ${\displaystyle E}$ by for a partition of unity ${\displaystyle {\varphi }_j}$ subordinate to the locally finite cover ${\displaystyle \{E_j\}}$ of ${\displaystyle E}$,

${\displaystyle \underset{E}{\int }\theta =\sum \underset{E_j}{\int }{\varphi }_j\theta }$.

6.1 Theorem If ${\displaystyle u}$ is analytic in ${\displaystyle \mathrm{\Omega }}$, then:

${\displaystyle f(z)=\frac{1}{2\pi i}\underset{\partial \mathrm{\Omega }}{\int }\frac{f(\zeta )d\zeta }{\zeta -z}\mathrm{\forall }z\in \mathrm{\Omega }}$.

(See also: Calculus:Complex_analysis)

We say a function f satisfies the mean value property when:

${\displaystyle f(z)=\frac{1}{2\pi }\int (z+ϵe^{i\theta })d\theta }$.

An analytic function is an archetypical example, for the property is the immediate consequence of Caucy's integral formula. If f has the mean value property, then, for one, ${\displaystyle f}$ is harmonic, and for another, the maximal principle become applicable to it.

6.1 Theorem
If ${\displaystyle u}$ is analytic in ${\displaystyle \mathrm{\Omega }}$, then the following are equivalent:

• (a) ${\displaystyle u^{(k)}}$ (z) = 0 for all ${\displaystyle k}$.
• (b) ${\displaystyle u{\mid }_{\omega }}$ = 0 for some ${\displaystyle \omega \subset \mathrm{\Omega }}$ open.
• (c) ${\displaystyle u}$ has a non-isolated zero.

and if any of the above is true, then

• (d) ${\displaystyle u{\mid }_{\mathrm{\Omega }}}$ = 0.

Proof: Let ${\displaystyle E=\{f:f{\mid }_{\omega }\}}$. If ${\displaystyle u}$ is in ${\displaystyle E}$, then its derivative:

${\displaystyle \dot{u}=\underset{h\to 0}{\lim }{h}^{-1}(f(x+h)-f(x))}$

is 0 in ${\displaystyle \mathrm{\Omega }}$ since ${\displaystyle \omega }$ consists of interior points, and so we may suppose ${\displaystyle x+h}$ is ${\displaystyle \omega }$. Thus, from (b), (a) follows. That (b) implies (c) is obvious since an interior point is non-isolated. To show (d), let Z be ${\displaystyle \{z\subset \mathrm{\Omega }:f(z)=0\}}$. Then ${\displaystyle Z}$ is closed since the inverse of ${\displaystyle f}$, which is continuous by the inverse theorem, maps a closed set {0} back to ${\displaystyle Z}$ in ${\displaystyle \mathrm{\Omega }}$. ${\displaystyle Z}$ is also open, which we can know by considering a power series expansion. Since ${\displaystyle Z}$ is nonempty by assumption, (d) follows after (a). ${\displaystyle ◻}$ (FIXME: this is still a partial proof)

6 Theorem (Runge) Let ${\displaystyle K\subset ℂ}$ be compact, and ${\displaystyle \omega }$ be an arbitrary open subset of ${\displaystyle ℂ}$ containing ${\displaystyle K}$. Then the following are equivalent:

(a) For any ${\displaystyle f\in 𝒜(K)}$ and an integer ${\displaystyle j}$, we can find a ${\displaystyle u\in 𝒜(\omega )}$ so that:

${\displaystyle \underset{K}{\sup }|f-u|<2^{-j}}$

(b) K is holomorphically convex.

Proof: The theorem is a consequence of the Hahn-Banach theorem.

A compact subset K of a complex plane is said to have the Runge property if ${\displaystyle K}$ satisfies any of the statements in the theorem.

6.2 Theorem (Weierstrass) Let ${\displaystyle \mathrm{\Omega }\subset ℂ}$ be open. Let the sequence ${\displaystyle z_j\subset \mathrm{\Omega }}$ be discrete, and ${\displaystyle n_j}$ be a sequence of arbitrary integers. Then there exists a nonzero ${\displaystyle f\in 𝒜(\mathrm{\Omega }\mathrm{\setminus }\{z_1,z_2,...\})}$ such that for each ${\displaystyle j}$ ${\displaystyle (z-z_j{)}^{(}-n_j)f}$ is nonzero and analytic in some open set containing ${\displaystyle z_j}$.
Proof: Let ${\displaystyle K_j}$ be an exhaustion by compact sets of ${\displaystyle \mathrm{\Omega }}$ with the Runge property. By the Runge property, for each ${\displaystyle j}$, we find a ${\displaystyle u_j\in 𝒜(\mathrm{\Omega })}$ so that:

${\displaystyle \underset{K_j}{\sup }|(z-z_j{)}^{n_j}+u_j|<2^{-j}}$

where since the sequence ${\displaystyle z_j}$ is discrete, we may suppose ${\displaystyle z_k\in ̸K_j}$ for any ${\displaystyle k\le j}$. Let

${\displaystyle g={\displaystyle \sum _1^{\mathrm{\infty }}}(z-z_j{)}^{n_j}+u_j}$, and ${\displaystyle f(z)=e^{{\displaystyle \underset{0}{\overset{z}{\int }}}g(s)ds}}$.

Then ${\displaystyle f}$ is analytic in ${\displaystyle \mathrm{\Omega }}$ except for all ${\displaystyle z_j}$. Also, let ${\displaystyle j}$ be fixed and ${\displaystyle \omega }$ be an open set containing ${\displaystyle z_j}$ and no other terms in the sequence. Then ${\displaystyle \frac{\dot{f}}{f}=g}$ in ${\displaystyle \omega }$. Thus, by Cauchy's integral formula,

${\displaystyle 2\pi i{n}_j=\underset{\omega }{\int }g(s)ds=\underset{\omega }{\int }\frac{\dot{f}(s)}{f(s)}ds}$

It now follows that the argument principle says ${\displaystyle f}$ has a zero of order ${\displaystyle n_j}$ (if the order is negative, then it is actually a pole). ${\displaystyle ◻}$

This formulation is probably more illustrative, if it states more weakly.

6.2 Corollary Every discrete subset of ${\displaystyle \mathrm{\Omega }\subset ℂ}$ is the zero and pole set of some analytic function.
Proof: Every discrete set is countable.

6 Theorem Let ${\displaystyle \mathrm{\Omega }\subset {ℝ}^n}$ be open and connected and ${\displaystyle \eta }$ be one-form. Then the following are equivalent:

(1) ${\displaystyle \eta }$ is exact on ${\displaystyle \mathrm{\Omega }}$.

(2) ${\displaystyle \underset{\gamma }{\int }=0}$ if ${\displaystyle \gamma }$ is a closed path.

(3) ${\displaystyle {\displaystyle \underset{a}{\overset{b}{\int }}}\eta }$ is independent of path.

Proof: On ${\displaystyle \mathrm{\Omega }}$, if ${\displaystyle \eta }$ is exact, then ${\displaystyle \eta =df}$ for some zero-form ${\displaystyle f}$. It thus follow:

${\displaystyle {\displaystyle \underset{a}{\overset{b}{\int }}}\eta =\underset{\gamma }{\int }df=f(\gamma (1))-f(\gamma (0))}$.

If ${\displaystyle \gamma }$ is a closed path, then ${\displaystyle \gamma (1)=\gamma (0)}$ by definition, and hence, (2) is true. Let ${\displaystyle {\gamma }_1}$ and ${\displaystyle {\gamma }_2}$ be arbitrary paths from ${\displaystyle a}$ to ${\displaystyle b}$. Then

${\displaystyle \underset{{\gamma }_1-{\gamma }_2}{\int }\eta =0}$ if (2) is true.

Thus, (2) implies (3). Finally, show (3) implies (1). Let ${\displaystyle f(x)={\displaystyle \underset{0}{\overset{x}{\int }}}\eta }$. Then ${\displaystyle df={\displaystyle \sum _1^n}\frac{\partial f}{\partial x_i}d{x}_i}$. For each ${\displaystyle i}$, if ${\displaystyle {\displaystyle \underset{x}{\overset{x+h_i}{\int }}}\eta =g(x+h_i)-g(x),thensince<math>{\displaystyle \underset{0}{\overset{x+h_i}{\int }}}-{\displaystyle \underset{0}{\overset{x}{\int }}}=}$,

${\displaystyle \frac{\partial f}{\partial x_i}(x)}$	${\displaystyle =li{m}_{h_i\to \mathrm{\infty }}\frac{1}{h_i}({\displaystyle \underset{x}{\overset{x+h_i}{\int }}}\eta }$
	${\displaystyle =li{m}_{h_i\to \mathrm{\infty }}\frac{1}{h_i}(g(x+h_i)-g(x))}$		${\displaystyle =\frac{\partial g}{\partial x_i}(x)}$

Here the derivative of ${\displaystyle f}$ does exist since the integral is independent of path. We conclude that ${\displaystyle df={\displaystyle \sum _1^n}\frac{\partial f}{\partial x_i}d{x}_i=\eta }$.

A continuous linear operator ${\displaystyle U:𝒳\to 𝒴}$ is said to be unitary if ${\displaystyle U}$ is surjective and preserves norms; i.e., ${\displaystyle \Vert x{\Vert }_{𝒳}=\Vert Ux{\Vert }_{𝒴}}$ for all ${\displaystyle x}$.

4 Theorem Suppose ${\displaystyle 𝒳}$ and ${\displaystyle 𝒴}$ are Hilbert spaces. A continuous linear operator ${\displaystyle U}$ is unitary if and only if ${\displaystyle U^{*}U}$ and ${\displaystyle U{U}^{*}}$ are identity on ${\displaystyle 𝒳}$ and ${\displaystyle 𝒴}$, respectively.
Proof: The direct part follows from the identity

${\displaystyle \Vert U^{*}Ux-x{\Vert }_{𝒳}^2\le \Vert U^{*}\Vert \Vert Ux{\Vert }_{𝒳}^2-2\Vert Ux{\Vert }_{𝒴}^2+\Vert x{\Vert }_{𝒳}^2}$

and the converse from the identity

${\displaystyle \Vert Ux{\Vert }_{𝒴}^2=⟨U^{*}Ux,x{⟩}_{𝒳}=\Vert x{\Vert }_{𝒳}^2}$. ${\displaystyle ◻}$

4 Theorem (Stokes) If ${\displaystyle \omega \subset ℂ}$ has boundary which consists of finitely many Jordan curves, then:

${\displaystyle \underset{\partial \omega }{\int }\eta =\underset{\omega }{\int }d\eta }$

Proof: (FIXME: To be written)

4 Corollary (Green) If ${\displaystyle \omega \subset ℂ}$ has boundary which consists of finitely many Jordan curves, then we have:

${\displaystyle \underset{\omega }{\int }(f\mathrm{\Delta }g-g\mathrm{\Delta }f)dx\wedge dy=\underset{\partial \omega }{\int }(f\frac{\partial }{\partial x}g-g\frac{\partial }{\partial x}f)dy-(f\frac{\partial }{\partial y}g-g\frac{\partial }{\partial y}f)dx}$.

Proof: ${\displaystyle d(f\frac{\partial }{\partial x}g-\frac{g}{\partial x}f)\wedge dy=(f\frac{{\partial }^2}{\partial x^2}g-g\frac{{\partial }^2}{\partial x^2}f)dx\wedge dy}$. ${\displaystyle ◻}$

Let ${\displaystyle \mathrm{\Omega }\subset {ℝ}^n}$. A function ${\displaystyle u\in {𝒞}^2(\mathrm{\Omega })}$ is said to be harmonic if

${\displaystyle {\displaystyle \sum _1^n}\frac{{\partial }^{2}u}{\partial x_j^2}=0}$ (the Laplace equation)

We also define the poisson kernel

${\displaystyle P(x/R,y)={C_n}^{-1}(1-|x/R{|}^2)|y-x/R{|}^{-n}}$

where ${\displaystyle C_n}$ is the volume of a unit ball in ${\displaystyle {ℝ}^n}$.

4. Theorem Let ${\displaystyle \mathrm{\Omega }={\text{Ball}}_R}$. Then ${\displaystyle u}$ is harmonic on and continuous on ${\displaystyle \bar{\mathrm{\Omega }}}$ if and only if

${\displaystyle u(x)=\int P(x/R,y)u(Ry)d\omega (y)}$.

Proof: Suppose ${\displaystyle u}$ is harmonic on ${\displaystyle \mathrm{\Omega }}$. Then using the Green's function

${\displaystyle u(x)=\int P(x/r,y)u(ry)d\omega (y)}$ for ${\displaystyle |x|<r<R}$.

Letting ${\displaystyle r\to R}$ gives the direct part. Conversely, if ${\displaystyle x\in \mathrm{\Omega }}$, then the second derivative of ${\displaystyle u}$ = 0 since ${\displaystyle P}$ is harmonic on ${\displaystyle \mathrm{\Omega }}$. ${\displaystyle ◻}$

4. Corollary (mean value property) Let ${\displaystyle \mathrm{\Omega }={\text{Ball}}_R}$ and ${\displaystyle u}$ be harmonic on and continuous on ${\displaystyle \bar{\mathrm{\Omega }}}$. Then

${\displaystyle u(0)=\int u(Ry)\frac{d\omega (y)}{C_n}}$.

Proof: Let ${\displaystyle x=0}$ in the theorem. Then ${\displaystyle P(0,y)={C_n}^{-1}}$.

4. Corollary (maximum principle) If ${\displaystyle \mathrm{\Omega }\subset ℝ}$ and ${\displaystyle u:\mathrm{\Omega }\to ℝ}$ is harmonic on ${\displaystyle \mathrm{\Omega }}$ and continuous on ${\displaystyle \bar{\mathrm{\Omega }}}$, then for ${\displaystyle x\in \mathrm{\Omega }}$,

${\displaystyle \underset{\text{b}\mathrm{\Omega }}{\min }u\le u(x)\le \underset{\text{b}\mathrm{\Omega }}{\max }u}$

where if the equality holds at some ${\displaystyle x\in \mathrm{\Omega }}$, then ${\displaystyle f}$ is constant in the component of ${\displaystyle x}$.
Proof: (i) Suppose ${\displaystyle \mathrm{\Omega }={\text{Ball}}_R}$. Then for ${\displaystyle x\in \mathrm{\Omega }}$

${\displaystyle u(x)}$	${\displaystyle =\underset{|y|=1}{\int }P(x/R,y)u(Ry)d\omega (y)}$
	${\displaystyle \le \underset{\text{b}\mathrm{\Omega }}{\sup }u\underset{|y|=1}{\int }P(x/R,y)d\omega (y)}$
	${\displaystyle =\underset{\text{b}\mathrm{\Omega }}{\sup }u}$

since

${\displaystyle \underset{|y|=1}{\int }P(x/R)d\omega (y)\underset{\text{b}\mathrm{\Omega }}{\sup }=1}$ when ${\displaystyle |x|\le |R|}$.

Likewise, ${\displaystyle -u(x)\le \underset{\text{b}\mathrm{\Omega }}{\sup }-u}$. Thus,

${\displaystyle \underset{\text{b}\mathrm{\Omega }}{\inf }u\le u(x)\le \underset{\text{b}\mathrm{\Omega }}{\sup }u}$

where ${\displaystyle \inf }$ and ${\displaystyle \sup }$ are actually ${\displaystyle \min }$ and ${\displaystyle \max }$, respectively since the continuity of ${\displaystyle u}$ and the compactness of a closed ball. (ii) Suppose ${\displaystyle \mathrm{\Omega }}$ is arbitrary. Let ${\displaystyle x\in \mathrm{\Omega }}$. From (i) it follows that ${\displaystyle u}$ is constant on every open ball containing ${\displaystyle x}$. Since ${\displaystyle \mathrm{\Omega }}$ is open, every component of ${\displaystyle \mathrm{\Omega }}$ is open. Since an open set is the union of non-disjoint open balls, ${\displaystyle u}$ is constant on the component of ${\displaystyle x}$. ${\displaystyle ◻}$

4. Theorem Let ${\displaystyle u}$ be continuous on ${\displaystyle \mathrm{\Omega }\subset {ℝ}^n}$. Then the following are equivalent:

• (i) ${\displaystyle u}$ is harmonic.
• (ii) If ${\displaystyle \delta \le 0}$ is given,

  ${\displaystyle \int u(x+ry)\frac{d\omega (y)}{C_n}\wedge d\mu (r)=u(x)\int d\mu (r)}$

• where ${\displaystyle d(x,\text{b}\mathrm{\Omega })\le \delta }$ and ${\displaystyle \text{supp}(d\mu )\subset [0,\delta ]}$.
• (iii) If ${\displaystyle \delta >0}$ is given, then (ii) holds.

Proof: The mean value property says:

${\displaystyle u(x)=\int u(x+ry)\frac{d\omega (y)}{C_n}}$

By integrating both sides we get:

${\displaystyle u(x)\int d\mu (r)=\int u(x+ry)\frac{d\omega (y)}{C_n}\wedge d\mu (r)}$

Hence, (i) implies (ii). Clearly, (ii) implies (iii). Suppose (iii), and let ${\displaystyle B}$ be an open ball with ${\displaystyle \bar{B}\subset \omega }$. Let ${\displaystyle h}$ be harmonic on ${\displaystyle B}$ and continuous on ${\displaystyle \bar{B}}$ such that ${\displaystyle u=h}$ on ${\displaystyle \text{b}B}$. If ${\displaystyle {\text{Ball}}_{\delta ,x}\subset \mathrm{\Omega }}$, then using (iii)

${\displaystyle \int (h-u)(x+ry)\frac{d\omega (y)}{C_n}\wedge d\mu (r)=(h-u)(x)\int d\mu (r)}$

where ${\displaystyle h-u=0}$ on the boundary of ${\displaystyle B}$. Since ${\displaystyle d\mu (r)}$ has non-zero measure, ${\displaystyle u=h}$ on ${\displaystyle B}$. Thus, (iii) implies (i). ${\displaystyle ◻}$

4 Thorem Let ${\displaystyle G}$ be a bounded open subset of ${\displaystyle ℂ}$ whose boundary is smooth enough that Stokes' formula is applicable. If ${\displaystyle u\in {𝒞}^1(\bar{G})}$, we have:

${\displaystyle u(w)=\frac{1}{2\pi i}\underset{\partial G}{\int }\frac{u(w)}{z-w}dz-\frac{1}{\pi }\underset{G}{\int }\frac{\partial u}{\partial \overline{z}}(z)\frac{1}{z-w}dx\wedge dy}$ for ${\displaystyle w\in G}$

4 Theorem Let ${\displaystyle \mu }$ be a complex-valued measure with compact support in ${\displaystyle ℂ}$ and define

${\displaystyle u(w)=\int \frac{1}{z-w}d\mu }$

4 Lemma (Schwarz) If ${\displaystyle f}$ is analytic and ${\displaystyle |f(z)|\le 1}$ for all ${\displaystyle |z|<1}$ and ${\displaystyle f(0)=0}$, then we have:

${\displaystyle |f(z)|\le |z|}$ for all ${\displaystyle |z|\le 1}$

Moreover, if the equality in the above holds at some point ${\displaystyle w\ne 0}$, then ${\displaystyle f}$ is proportional to ${\displaystyle z}$
Proof: The hypothesis means that we can write ${\displaystyle f(z)=zg(z)}$. Furthermore, if ${\displaystyle 0<r<1}$, the maximum principle says

${\displaystyle \underset{|z|\le r}{\sup }|g(z)|=\underset{|z|=r}{\sup }|g(z)|\le \frac{1}{r}}$.

and ${\displaystyle g}$ is constant if ${\displaystyle g=1}$ at some point on the circle ${\displaystyle |z|=r}$. Letting ${\displaystyle r\to 1}$ completes the proof. ${\displaystyle ◻}$

A Lie algebra is an algebra whose multiplication, denoted by ${\displaystyle [,]}$, satisfies

• (i) ${\displaystyle [x,x]=0}$, and
• (ii) ${\displaystyle [[x,y],z]+[[y,z],x]+[[z,x],y]=0}$

for all ${\displaystyle x,y,z}$. Under the assumption (ii) we see (i) is equivalent to

${\displaystyle 0=[x+y,x+y]=[x,y]+[y,x]}$.

When given an algebra is associative; i.e., ${\displaystyle (xy)z=x(yz)}$ we can turn the algebra into a Lie algebra by defining ${\displaystyle [x,y]=xy-yx}$, called a commutator. Indeed, it is clear that ${\displaystyle [x,y]}$ distributes over scalars and addition and the condition (i) holds. It then follows ${\displaystyle [[x,y],z]=[x,[y,z]]-[y,[x,z]]}$.

Also, ${\displaystyle \int e^x=f(u^n)}$

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