0708-1300/Class notes for Tuesday, November 27

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Today's Agenda

  • The planimeter with a picture from http://whistleralley.com/planimeter/planimeter.htm but our very own plane geometry and Stokes' theorem.
  • Completion of the proof of Stokes' theorem.
  • Completion of the discussion of the two- and three-dimensional cases of Stokes' theorem.
  • With luck, a discussion of de-Rham cohomology, homotopy invariance and Poincaré's lemma.


Class Notes

The notes below are by the students and for the students. Hopefully they are useful, but they come with no guarantee of any kind.

First Hour

Planimeter

A planimeter consists of two rods connected with a join where the end of one rod is fixed (but free to rotate) and the opposing end of the second rod traces out the boundary of some surface on the plane. I.e., the planimeter is kind of like a 1 legged roach. At the join of the two rods is a wheel which rotates (and measures the rotation) when the rod tracing the boundary moves in the normal direction and simply slides back an forth when moved in a tangential direction.

Now we recall from plane geometry that we can locate points in the polar form and have the equations and

Hence,

Hence



Now, the planimeter is essentially a 1 form corresponding to the speed of the wheel. We consider a diagram where the angle from the horizontal at the fixed end of the planimeter to the measuring end is and the angle from the horizontal to the first rod (the one connected to the fixed point) is . Hence and

With a little plane geometry we can see that

Computing,


Now applying stokes theorem, the the planimeter integrates over the boundary of our surface and hence this is just the integral of over the surface. But this is just the integral of the area form.

Hence the planimeter measure the area of a surface.


Back to Stokes Theorem


Firstly recall that is oriented so that if you prepend the outward normal to its orientation you get the orientation of M

Alternatively we recall that neighborhoods of points on the boundary look like the half space. Hence we can choose to restrict our attention to atlas's where all charts look like

We can see that these orientations are the same, i.e., just prepend the outward normal to the half space.


Proof of Stokes


We have now defined all the terms. WLOG is supported in one chart (by linearity)

For a compactly supported n-1 form on H need to show that


We let (where the hat means it is omitted)


So,

via fundamental theorem of calculus and that the f_i's are compactly supported we get


Hence with the standard inclusion of we get



Thus these are the same and the theorem is proved Q.E.D.


Real Plane

Consider


Forms in look like and map under d to

Hence applying Stokes' Theorem:

This is known as Greens Theorem


In complex analysis we also have a similar result Cauchy's Theorem where the integral of an analytic function around a closed path is zero. This is because analytic functions obey the Cauchy-Riemann equations and hence is identically zero.


Second Hour

Example 2


Recall previous we had consider the spaces and showed that and corresponded with functions and that and corresponded with triples of functions (i.e. vector fields). We also showed that the d function between these spaces was the gradient, curl and divergence functions from vector calculus.

We are now interested in integrating, using Stokes Theorem, forms in these spaces.


First, note that to a 0 manifold, assigning an orientation to the manifold is just assigning a plus or minus sign to the manifold as a result of it having a trivial basis.

This is consistent with 0 manifolds being the boundary of 1 manifolds. Indeed,


Now consider a path


Now lets compute

First,

Likewise for each component of we thus get

where is the vector of coefficients of

Now we know that is a vector perpendicular to v and w with magnitude equal to the area of the defined parallelogram. So,

where denotes the normal vector and is the area form and is a surface


Now for ,



now,

and


This is Gauss' Divergence Theorem.

We can think about this as saying that the flow from each point in a domain, when summed up, will be just the flow out of the boundary of the domain.


We also get Stokes' Theorem:



End of Example


We recall that since , if then . But is the converse true? The following Lemma says 'yes', if the domain is


Poincare's Lemma

On iff such that


This is NOT true for general M, as our homework assignment showed since we had a form that had but was not d of a form.


Likewise, on we have


Claim:

For appropriate but no such that

This is in our next homework assignment.


Now, if there was such a ,

If (such as any sphere)

But,


Definition


Clearly so the following definition makes sense:


Definition (de-Rham Cohomology)


Claim

yet .

Also,