User:Michael Hardy/Gauss link invariant
From a posting to the usenet newsgroup sci.math.research on November 17th, 1994 by Paulo Ney de Souza, approved by moderator Greg Kuperberg:
I am looking for a good reference (preferably a textbook) for the Gaussian integral invariance under isotopy. That is the fact that the integral
is an integer and invariant unnder isotopy of the components of a link and of metric choices.
One would hope that this would be all over textbooks in Diff. Topology and some text in Knot Theory, but apparently it is NOT! The only one where I could find it stated [DFN] they wave hands to early and makes it difficult for an undergraduate to unnderstand.
If anyone knows a good referencec I would like to hear about it.
- [BG] Berger, M. & Gostiaux, B., Differential geometry: manifolds, curves, and surfaces. Springer-Verlag, 1988
- [DFN] Dubrovin, B. A., Fomenko, A. T., & Novikov S. P. Modern geometry--methods and applications, vol 2, Springer-Verlag, 1992
Paulo Ney de Souza
desouza[at]math.berkeley.edu
[mod note: The proof that I know that is it invariant unnder isotopy is that, if you let F(v1) be the result of integrating over v2 in κ2, then F(v1) is curl-free except that it is singular on κ2. The line integral of F(v1) is therefore the same by Stokes' theorem on κ1 and κ1′ as long as there is an annulus connecting κ1 and κ1′ that does not cross κ2. The annulus can even cross itself; the linking number between κ1 and κ2 does not change if you make κ1 cross itself. Switching κ1 and κ2, it's also constant as you vary κ2.
The proof that you get an integer is similarly asymmetric. Imagine an annulus that connects κ1 and κ1′ that does cross κ2. The surface integral on this annulus, which is the difference between line integrals on κ1 and κ1′, is the integral of a bunch of delta functions at the places where it crosses κ2. The surface integral does not depend on the surface, of course; putting it in favorable position, namely perpendicular to κ2, it is easy to see that these delta functions have integral integrals.
However, this is not a reference. Maybe the best place to look is an E&M physics book, since the theorem is just the same as Ampere's law - Greg.