0708-1300/Homework Assignment 6

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Reading

At your leisure, read your class notes over the break, and especially at some point right before classes resume next semester. Here are a few questions you can ask yourself while reading:

• Do you understand pullbacks of differential forms?
• Do you think you could in practice integrate any differential form on any manifold (at least when the formulas involved are not too messy)?
• Do you understand orientations and boundaries and how they interact?
• Why is Stokes' theorem true? Both in terms of the local meaning of ${\displaystyle d}$, and in terms of a formal proof.
• Do you understand the two and three dimensional cases of Stokes' theorem?
• Do you understand the Hodge star operator ${\displaystyle \star }$?
• How did we get ${\displaystyle d\star dA=J}$ from the least action principle?
• Do you understand how Poincare's lemma entered the derivation of Maxewell's equations?
• Do you understand the operator ${\displaystyle P}$? (How was it used, formally derived, and what is the intuitive picture behind it?)
• What was ${\displaystyle H_{dR}}$ and how did it relate to pullbacks and homotopy.

Doing

Solve the following problems and submit your solutions of problems 1, 3 and 4. This is a very challenging collection of problems; I expect most of you to do problem 2 with no difficulty (it is a repeat of an older problem), problem 1 with some effort, and I hope each of you will be able to do at least one further problem. It will be great if some of you will do all problems!

Problem 1. If ${\displaystyle M}$ is a compact orientable ${\displaystyle n}$-manifold with no boundary, show that ${\displaystyle H_{dR}^{n}(M)\neq 0}$.

Problem 2. The standard volume form on ${\displaystyle S^{2}}$ is the form ${\displaystyle \omega }$ given by ${\displaystyle \omega ={\frac {1}{4\pi }}\left(xdy\wedge dz+ydz\wedge dx+zdx\wedge dy\right)}$. Show that ${\displaystyle \int _{S^{2}}\omega =1}$.

Problem 3. Show that if ${\displaystyle \omega \in \Omega ^{2}(S^{2})}$ satisfies ${\displaystyle \int _{S_{2}}\omega =0}$, then ${\displaystyle \omega }$ is exact. Deduce that if ${\displaystyle w_{1}\in \Omega ^{2}(S^{2})}$ and ${\displaystyle w_{2}\in \Omega ^{2}(S^{2})}$ satisfy ${\displaystyle \int _{S_{2}}\omega _{1}=\int _{S_{2}}\omega _{2}}$, then ${\displaystyle [\omega _{1}]=[\omega _{2}]}$ as elements of ${\displaystyle H_{dR}^{2}(S^{2})}$. Deduce further that ${\displaystyle \dim H_{dR}^{2}(S^{2})=1}$.

Problem 4. A "link" in ${\displaystyle {\mathbb {R} }^{3}}$ is an ordered pair ${\displaystyle \gamma =(\gamma _{1},\gamma _{2})}$, in which ${\displaystyle \gamma _{1}}$ and ${\displaystyle \gamma _{2}}$ are smooth embeddings of the circle ${\displaystyle S^{1}}$ into ${\displaystyle {\mathbb {R} }^{3}}$, whose images (called "the components of ${\displaystyle \gamma }$") are disjoint. Two such links are called "isotopic", if one can be deformed to the other via a smooth homotopy along which the components remain embeddings and remain disjoint. Given a link ${\displaystyle \gamma }$, define a map ${\displaystyle \Phi _{\gamma }:S^{1}\times S^{1}\to S^{2}}$ by ${\displaystyle \Phi _{\gamma }(t_{1},t_{2}):={\frac {\gamma _{2}(t_{2})-\gamma _{1}(t_{1})}{||\gamma _{2}(t_{2})-\gamma _{1}(t_{1})||}}}$. Finally, let ${\displaystyle \omega }$ be the standard volume form of ${\displaystyle S^{2}}$, and define "the linking number of ${\displaystyle \gamma =(\gamma _{1},\gamma _{2})}$" to be ${\displaystyle l(\gamma )=l(\gamma _{1},\gamma _{2}):=\int _{S^{1}\times S^{1}}\Phi _{\gamma }^{\star }\omega }$. Show

1. If two links ${\displaystyle \gamma }$ and ${\displaystyle \gamma '}$ are isotopic, then their linking numbers are the same: ${\displaystyle l(\gamma )=l(\gamma ')}$.
2. If ${\displaystyle \omega '}$ is a second 2-form on ${\displaystyle S^{2}}$ for which ${\displaystyle \int _{S^{2}}\omega '=1}$ and if ${\displaystyle l'(\gamma )}$ is defined in the same manner as ${\displaystyle l(\gamma )}$ except replacing ${\displaystyle \omega }$ with ${\displaystyle \omega '}$, then ${\displaystyle l(\gamma )=l'(\gamma )}$. (In particular this is true if ${\displaystyle \omega '}$ is very close to a ${\displaystyle \delta }$-function form at the north pole of ${\displaystyle S^{2}}$).
3. Compute (but just up to an overall sign) the linking number of the link L11a193, displayed below:

The links L11a193, ${\displaystyle \gamma _{3}}$ and ${\displaystyle \gamma '_{3}}$.

Just for Fun

Prove that the two (3-component) links ${\displaystyle \gamma _{3}}$ and ${\displaystyle \gamma '_{3}}$ shown above are not isotopic, yet their complements are diffeomorphic. (See more at Classes: 2004-05: Math 1300Y - Topology: Homework Assignment 5)

Due Date

This assignment is due in class on Thursday January 10, 2007.