0708-1300/Class notes for Tuesday, January 22: Difference between revisions

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Pictures for a Van-Kampen Computation

Loading KnotTheory` version of January 13, 2008, 20:30:12.1353.
Read more at http://katlas.org/wiki/KnotTheory.

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In[5]:=	GraphicsArray[{{InflatedTorus[3,8,1], InflatedTorus[3,8,-1]}}]
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Typed Notes

First Hour

Today's Agenda:

1) More Examples of Van-Kampen Theorem

2) More Diagrams

3) Proof of Van-Kampen (was not done)

We began by recalling the examples from last class. I will not repeat that here, merely making a few additional comments that came out:

Notation:

Technically, ${\displaystyle A*_{H}B}$ is poor notion as it implies that knowledge of A, B and H is sufficient to construct ${\displaystyle A*_{H}B}$. In fact, we ALSO need to know the maps from H into A and B respectively in order for ${\displaystyle A*_{H}B}$ to be defined.

Aside

Last class we simply wrote down the schematic for the two holed torus as an octagon with the identifications on the edges given last class. We now consider how one arrives at this schematic.

To create the two holed torus one begins with two tori. One then cuts out a small open disk from each torus and then glues the two boundaries together. Let us consider what this looks like when considering a torus as the normal schematic with a square in the plane with the normal identification of the sides. Removing an open disk is equivalent to removing the inside of a loop starting at one of the corners and finishing at that same corner. This is equivalent to making a pentagon with sides ${\displaystyle aba^{-1}b^{-1}c}$ where c is the added edge.

Consider two such pentagons, gluing along the edge c forms precisely the octagon we had for the two holed torus last class.

Proposition

Letting ${\displaystyle \Sigma _{g}}$ denote the g holed torus, then ${\displaystyle \Sigma _{g}\neq \Sigma _{g'}}$

(Note, I used the symbol ${\displaystyle \neq }$ to as the normal \ncong command doesn't seem to work. Take its meaning in context.)

Aside: Consider a functor from the category of groups to the category of Abelian groups via

${\displaystyle G\mapsto G^{ab}=G/(ab=ba)}$

If we have a (homo)morphism from ${\displaystyle G\rightarrow H}$ then the functor takes ${\displaystyle H\rightarrow H^{ab}}$ and yields a map ${\displaystyle G^{ab}\rightarrow H^{ab}}$ such that everything commutes.

Hence we know that ${\displaystyle \pi _{1}^{ab}(\Sigma _{g})\cong \mathbb {Z} ^{2g}\neq \mathbb {Z} ^{2g'}\cong \pi _{1}^{ab}(\Sigma _{g'})}$

Of course, we need to know that in fact ${\displaystyle \mathbb {Z} ^{m}\neq \mathbb {Z} ^{n}}$ if ${\displaystyle m\neq n}$

As such, since the abelianizations are not isomorphic,neither are the original groups and the spaces themselves are not homeomorphic.

Example

${\displaystyle \pi _{1}(\mathbb {R} P^{2})}$ is ${\displaystyle \pi _{1}}$ of the space which can be written as a disk with two antipodal points on the boundary circle on it with the identification that the top path a (going clockwise along the boundary) is glued to the bottom path (also going clock wise). But ${\displaystyle \pi _{1}}$ of this is just ${\displaystyle <a>/(a^{2}=e)\cong \mathbb {Z} /2}$

Claim:

Puncturing an n-manifold, ${\displaystyle n\geq 3}$, does not change ${\displaystyle \pi _{1}(M)}$. I.e., if ${\displaystyle p\in M^{n}}$ then ${\displaystyle \pi _{1}(M)\cong \pi _{1}(M-\{p\})}$

Proof:

Let ${\displaystyle U_{1}=M-\{p\}}$

${\displaystyle U_{2}}$ = a coordinate patch about p.

Then ${\displaystyle U_{1}\cap U_{2}=B^{n}-\{p\}\cong S^{n-1}}$

If n=3, ${\displaystyle \pi _{1}(S^{2})=\{e\}}$ as we have computed before.

Hence, ${\displaystyle \pi _{1}(M)=\pi _{1}(U_{1})*_{\{\}}\{\}=\pi _{1}(U_{1})}$

Now, ${\displaystyle \pi _{1}(S^{3})\cong \pi _{1}(S^{3}-\{p\})=\pi _{1}(B^{3})=\{e\}}$

Continuing inductively the theorem holds for all n.

Aside:

If X is connected and ${\displaystyle b_{1},\ b_{2}\in X}$ then ${\displaystyle \pi _{1}(X,b_{1})=\pi _{1}(X,b_{2})}$. I.e., it does not matter which base point we choose in a connected space, the fundamental group is invariant of this.

Proof

Consider a path ${\displaystyle \eta }$ from ${\displaystyle b_{1}}$ to ${\displaystyle b_{2}}$. The returning path is denoted ${\displaystyle {\bar {\eta }}}$

Consider a loop from ${\displaystyle b_{2}}$ called ${\displaystyle \gamma }$.

Then get a loop from ${\displaystyle b_{1}}$ via ${\displaystyle \gamma \mapsto {\bar {\eta }}\gamma \eta }$

Similarly about ${\displaystyle b_{2},\gamma \mapsto \eta \gamma {\bar {\eta }}}$

Considering the composition we get ${\displaystyle \eta {\bar {\eta }}\gamma \eta {\bar {\eta }}\sim \gamma }$.

Second Hour

Claim

${\displaystyle S^{3}}$ is the union (with common boundary) of two solid tori ${\displaystyle S^{1}\times D^{1}}$

The natural way to add two tori with common boundary would be two glue the boundaries of two disks (making ${\displaystyle S^{2}}$) together for each angle going around the torus thus yielding ${\displaystyle S^{1}\times S^{2}}$. Clearly this is not the same as ${\displaystyle S^{3}}$ as the fundamental groups differ.

Instead consider the following description. Look at a torus in the zx plane, this looks like two disks with the z axis in between them such that rotating these two disks about the z axis will yield the torus.

Lets now add in the second torus into this picture. We first draw a horizontal line between the two disks. We then "blow" up from beneath so the horizontal line is slightly curved. We imagine continuing to blow yielding larger and larger loops between the two disks until it "pops" forming the pure horizontal line consisting of the loop at infinity. Do the same for the bottom. Hence, the boundaries of the two tori drawn this way clearly are the same, and between the two cover the entire zx plane (and "point at infinity). Rotating this picture about the z axis yields all of S^1 as the union of these two sets.

Claim:

${\displaystyle \pi _{1}(S^{3})=\{e\}}$

${\displaystyle U_{1}}$ = the normal solid torus thickened a bit and under ${\displaystyle \pi _{1}}$ yields ${\displaystyle <\alpha >}$

${\displaystyle U_{2}}$ = the other solid torus, also thickened a bit, under ${\displaystyle \pi _{1}}$ yields ${\displaystyle <\beta >}$ ${\displaystyle U_{1}\cap U_{2}}$ is a normal torus only with slightly thick walls opposed to infinitely thin ones (homotopically the same)

So, ${\displaystyle \pi _{1}(U_{1}\cap U_{2})\cong \mathbb {Z} ^{2}\cong <a,b>/ab=ba}$

So, ${\displaystyle \pi _{1}(S^{3})\cong \mathbb {Z} *_{\mathbb {Z} \times \mathbb {Z} }\mathbb {Z} }$

However, we still need to describe ${\displaystyle i_{1*}}$ and ${\displaystyle i_{2*}}$

Do do this let me describe a,b,${\displaystyle \alpha }$ and ${\displaystyle \beta }$ explicitly.

Considering the description of the two tori given above, we let a go around the outside of one of the two disks in the plane and b go from a point on the boundary of the same disk, following the rotation about the z axis, to a point on the boundary of the other dis. ${\displaystyle \alpha }$ is similar to b, but thought of as being on the boundary of the OTHER torus. ${\displaystyle \beta }$ consists of the path along the z axis.

Hence,

${\displaystyle i_{1*}:}$

${\displaystyle a\rightarrow e}$

${\displaystyle b\rightarrow \alpha }$

${\displaystyle i_{2*}:}$

${\displaystyle a\rightarrow \beta }$

${\displaystyle b\rightarrow e}$ (as it is contractible)

Hence, ${\displaystyle \pi _{1}(S^{3})=F(\alpha ,\beta )/(e=\beta ,\alpha =e)}$

Hence, ${\displaystyle \pi _{1}(S^{3})=\{e\}}$

Example

Define the "Torus knot ${\displaystyle T_{p,q}}$" where p and q are relatively prime integers. The knot ${\displaystyle T_{8,3}}$ is given above. We can think of this in the following ways:

1) ${\displaystyle T_{p,q}}$ is the knot that wraps around the torus p times one way and q times the other way.

2) Formally, let ${\displaystyle \sigma :S^{1}\times S^{1}\mathbb {R} ^{3}}$ be standard embedding of a torus. Let ${\displaystyle \gamma :[0,1]\rightarrow S^{1}\times S^{1}}$ be ${\displaystyle t\rightarrow (e^{2\pi ipt},e^{i2\pi qt})}$

Then ${\displaystyle T_{p,q}}$ is ${\displaystyle \sigma \circ \gamma }$

3) Recall that the torus can be thought of as the image of the mapping ${\displaystyle \mathbb {R} ^{2}\rightarrow \mathbb {R} ^{2}/\mathbb {Z} ^{2}}$

Consider the rectangle in the real plane: ([0,p],[0,q]) and consider the path which is the diagonal line from the corner (0,0) to the corner (p,q)

No two points on this line are the same under the mapping down to the torus. If they were, then ${\displaystyle \Delta y}$ and ${\displaystyle \Delta x}$ would be integers and hence ${\displaystyle \Delta y/\Delta x}$ would be the slope of the line. But the slope of the line is q/p which is already in lowest common terms by assumption.

Lets compute the fundamental group of the compliment of the torus knot.

${\displaystyle \pi _{1}(\mathbb {R} ^{3}-T_{p,q})\cong \pi _{1}(S^{3}-T_{p,q})}$

${\displaystyle U_{1}}$: inflated bagel, constrained by ${\displaystyle T_{p,q}}$

${\displaystyle U_{2}}$: inflated bubble constrained by ${\displaystyle T_{p,q}}$

(See top of page for pictures)

The intersection ${\displaystyle U_{1}\cap U_{2}}$ looks somewhat like a belt. It has some thickness to it and is wrapped around the torus, eventually forming a loop. Hence it looks like a squashed disk cross a circle. Hence, under ${\displaystyle \pi _{1}}$ this is just ${\displaystyle \mathbb {Z} \cong <\gamma >}$ where ${\displaystyle \gamma }$ is the path parallel to ${\displaystyle T_{p,q}}$

We thus get the maps,

${\displaystyle i_{1*}:\gamma \mapsto \alpha ^{p}}$

${\displaystyle i_{2*}:\gamma \mapsto \beta ^{q}}$

Hence, ${\displaystyle \pi _{1}(T_{p,q}^{c})=<\alpha ,\beta >/\alpha ^{p}=\beta ^{q}}$

Thus, ${\displaystyle T_{p,q}\neq T_{p',q'}}$

Diagrams:

Recall our diagram from last class:

${\displaystyle {\begin{matrix}&\ \ \ \ U_{1}&&\\&\nearrow ^{i_{1}}&\searrow ^{j_{1}}&\\U_{1}\cap U_{2}&&&U_{1}\cup U_{2}\\&\searrow _{i_{2}}&\nearrow ^{j_{2}}&\\&\ \ \ \ U_{2}&&\\\end{matrix}}}$

${\displaystyle U_{1}\cup U_{2}}$ can be defined as the object such that the above diagram commutes and should the following commute:

${\displaystyle {\begin{matrix}&\ \ \ \ U_{1}&&\\&\nearrow ^{i_{1}}&\searrow ^{j_{1}}&\\U_{1}\cap U_{2}&&&Y\\&\searrow _{i_{2}}&\nearrow ^{j_{2}}&\\&\ \ \ \ U_{2}&&\\\end{matrix}}}$

Then there is a unique map between ${\displaystyle U_{1}\cup U_{2}}$ and Y such that the composed diagram commutes.

Indeed, the same is true for general categories.

For

${\displaystyle {\begin{matrix}&\ \ \ \ G_{1}&&\\&\nearrow ^{i_{1}}&\searrow ^{j_{1}}&\\H&&&P\\&\searrow _{i_{2}}&\nearrow ^{j_{2}}&\\&\ \ \ \ G_{2}&&\\\end{matrix}}}$

commuting, P is defined as an object such that if also

${\displaystyle {\begin{matrix}&\ \ \ \ G_{1}&&\\&\nearrow ^{i_{1}}&\searrow ^{j_{1}}&\\H&&&Q\\&\searrow _{i_{2}}&\nearrow ^{j_{2}}&\\&\ \ \ \ G_{2}&&\\\end{matrix}}}$

were to commute then there is a unique morphism from P to Q such that the composed diagram computes.

In the category of groups, this "pushforward" P is unique and is isomorphic to ${\displaystyle G_{1}*_{H}G_{2}}$