"Rubberband" Brunnian Links: Difference between revisions

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{{Manual TOC Sidebar}}
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A "Rubberband" Brunnian link is obtained by connecting unknots in a closed chain as illustrated in the diagram of the 10-component link, where the last knot gets connected to the first one.
A "Rubberband" [[Brunnian link]] is obtained by connecting unknots in a closed chain as illustrated in the diagram of the 10-component link, where the last knot gets connected to the first one.


{|
{|
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n = 4 |
n = 4 |
in = <nowiki>DrawMorseLink[RBB3=RubberBandBrunnian[3]]</nowiki> |
in = <nowiki>DrawMorseLink[RBB3=RubberBandBrunnian[3]]</nowiki> |
img= Rubberband Brunnian Links_Out_3.gif |
img= Rubberband_Brunnian_Links_Out_3.gif |
out= <nowiki>-Graphics-</nowiki>}}
out= <nowiki>-Graphics-</nowiki>}}
<!--END-->

<!--$$Jones[RBB3][q]$$-->
<!--Robot Land, no human edits to "END"-->
{{InOut|
n = 5 |
in = <nowiki>Jones[RBB3][q]</nowiki> |
out= <nowiki> 2 3 4 5 7 8 9 10
-q + 5 q - 11 q + 14 q - 10 q + 11 q - 18 q + 24 q - 18 q +
11 13 14 15 16 17
11 q - 10 q + 14 q - 11 q + 5 q - q</nowiki>}}
<!--END-->
<!--END-->


Line 51: Line 63:
<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{Graphics|
{{Graphics|
n = 6 |
n = 7 |
in = <nowiki>DrawMorseLink[RBB4=RubberBandBrunnian[4]]</nowiki> |
in = <nowiki>DrawMorseLink[RBB4=RubberBandBrunnian[4]]</nowiki> |
img= Rubberband Brunnian Links_Out_5.gif |
img= Rubberband_Brunnian_Links_Out_6.gif |
out= <nowiki>-Graphics-</nowiki>}}
out= <nowiki>-Graphics-</nowiki>}}
<!--END-->

<!--$$Jones[RBB4][q]$$-->
<!--Robot Land, no human edits to "END"-->
{{InOut|
n = 8 |
in = <nowiki>Jones[RBB4][q]</nowiki> |
out= <nowiki> 3/2 5/2 7/2 9/2 11/2 13/2 15/2
-q + 7 q - 24 q + 49 q - 56 q + 18 q + 51 q -
17/2 19/2 21/2 23/2 25/2 27/2
111 q + 131 q - 100 q + 32 q + 32 q - 100 q +
29/2 31/2 33/2 35/2 37/2 39/2
131 q - 111 q + 51 q + 18 q - 56 q + 49 q -
41/2 43/2 45/2
24 q + 7 q - q</nowiki>}}
<!--END-->
<!--END-->


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<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{Graphics|
{{Graphics|
n = 8 |
n = 10 |
in = <nowiki>DrawMorseLink[RBB5=RubberBandBrunnian[5]]</nowiki> |
in = <nowiki>DrawMorseLink[RBB5=RubberBandBrunnian[5]]</nowiki> |
img= Rubberband Brunnian Links_Out_7.gif |
img= Rubberband_Brunnian_Links_Out_9.gif |
out= <nowiki>-Graphics-</nowiki>}}
out= <nowiki>-Graphics-</nowiki>}}
<!--END-->
<!--END-->


<!--$$RBJones= Jones[#][q] & /@ {RBB3, RBB4, RBB5}$$-->
<!--$$Jones[RBB5][q]$$-->
<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{InOut|
{{InOut|
n = 9 |
n = 11 |
in = <nowiki>RBJones= Jones[#][q] & /@ {RBB3, RBB4, RBB5}</nowiki> |
in = <nowiki>Jones[RBB5][q]</nowiki> |
out= <nowiki> 2 3 4 5 7 8 9 10
out= <nowiki> 2 3 4 5 6 7 8 9
{-q + 5 q - 11 q + 14 q - 10 q + 11 q - 18 q + 24 q - 18 q +
-q + 9 q - 40 q + 110 q - 189 q + 167 q + 57 q - 414 q +
11 13 14 15 16 17
11 q - 10 q + 14 q - 11 q + 5 q - q ,
3/2 5/2 7/2 9/2 11/2 13/2 15/2
-q + 7 q - 24 q + 49 q - 56 q + 18 q + 51 q -
17/2 19/2 21/2 23/2 25/2
111 q + 131 q - 100 q + 32 q + 32 q -
27/2 29/2 31/2 33/2 35/2 37/2
100 q + 131 q - 111 q + 51 q + 18 q - 56 q +
39/2 41/2 43/2 45/2
49 q - 24 q + 7 q - q ,
2 3 4 5 6 7 8 9
-q + 9 q - 40 q + 110 q - 189 q + 167 q + 57 q - 414 q +
10 11 12 13 14 15
10 11 12 13 14 15 16
660 q - 581 q + 189 q + 305 q - 672 q + 816 q -
660 q - 581 q + 189 q + 305 q - 672 q + 816 q - 672 q +
16 17 18 19 20 21 22
17 18 19 20 21 22 23
672 q + 305 q + 189 q - 581 q + 660 q - 414 q + 57 q +
305 q + 189 q - 581 q + 660 q - 414 q + 57 q + 167 q -
23 24 25 26 27 28
24 25 26 27 28
167 q - 189 q + 110 q - 40 q + 9 q - q }</nowiki>}}
189 q + 110 q - 40 q + 9 q - q</nowiki>}}
<!--END-->
<!--END-->


We can also check that when one component is removed the remaining link is trivial:
We can also check that when one component is removed the remaining link is trivial:


<!--$$Import["http://katlas.org/w/index.php?title=SubLink.m&action=raw"];$$-->
<!--$$SubLink[pd_PD, js_List] := Module[
{k, t0, t, t1, t2, S, P},
t0 = Flatten[List @@@ Skeleton[pd][[js]]];
t = pd /. x_X :> Select[x, MemberQ[t0, #] &];
t = DeleteCases[t, X[]];
k = 1;
While[
k <= Length[t],
If[ Length[t[[k]]] < 4,
t = Delete[t, k] /. (Rule @@ t[[k]]), ++k];
];
t1 = List @@ Union @@ t;
t2 = Thread[(t1) -> Range[Length[t1]]];
S = t /. t2;
P = If[S != PD[] && Length[S] >= 3, S, PD[Knot[0, 1]], S]
];
SubLink[pd_PD, j_] := SubLink[pd, {j}];
SubLink[L_, js_] := SubLink[PD[L], js];$$-->
<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{In|
{{In|
n = 10 |
n = 12 |
in = <nowiki>Import["http://katlas.org/w/index.php?title=SubLink.m&action=raw"];</nowiki>}}
in = <nowiki>SubLink[pd_PD, js_List] := Module[
{k, t0, t, t1, t2, S, P},
t0 = Flatten[List @@@ Skeleton[pd][[js]]];
t = pd /. x_X :> Select[x, MemberQ[t0, #] &];
t = DeleteCases[t, X[]];
k = 1;
While[
k <= Length[t],
If[ Length[t[[k]]] < 4,
t = Delete[t, k] /. (Rule @@ t[[k]]), ++k];
];
t1 = List @@ Union @@ t;
t2 = Thread[(t1) -> Range[Length[t1]]];
S = t /. t2;
P = If[S != PD[] && Length[S] >= 3, S, PD[Knot[0, 1]], S]
];
SubLink[pd_PD, j_] := SubLink[pd, {j}];
SubLink[L_, js_] := SubLink[PD[L], js];</nowiki>}}
<!--END-->
<!--END-->


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<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{In|
{{In|
n = 11 |
n = 13 |
in = <nowiki>S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];</nowiki>}}
in = <nowiki>S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];</nowiki>}}
<!--END-->
<!--END-->
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<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{InOut|
{{InOut|
n = 12 |
n = 14 |
in = <nowiki>J=Factor[Jones[S][q]]</nowiki> |
in = <nowiki>J=Factor[Jones[S][q]]</nowiki> |
out= <nowiki> 6 3
out= <nowiki> 6 3
Line 161: Line 139:
<!--END-->
<!--END-->



==Brunnian Braids==
Similarly, in the case of Brunnian braids, removing one strand gives us a trivial braid. We can verify that using the following two programs. The first one constructs a Brunnian braid while the second one removes a selected strand:
Similarly, in the case of Brunnian braids, removing one strand gives us a trivial braid. We can verify that using the following two programs. The first one constructs a Brunnian braid while the second one removes a selected strand:


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<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{In|
{{In|
n = 13 |
n = 15 |
in = <nowiki>BR /: Inverse[BR[n_, l_List]] := BR[n, -Reverse[l]];
in = <nowiki>BR /: Inverse[BR[n_, l_List]] := BR[n, -Reverse[l]];
BR /: BR[n1_, l1_] ** BR[n2_, l2_] := BR[Max[n1, n2], Join[l1, l2]];
BR /: BR[n1_, l1_] ** BR[n2_, l2_] := BR[Max[n1, n2], Join[l1, l2]];
Line 197: Line 175:
<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{In|
{{In|
n = 14 |
n = 16 |
in = <nowiki>DeleteStrand[k_, BR[n_, l_List]] := BR[n - 1, DeleteStrand[k, l]];
in = <nowiki>DeleteStrand[k_, BR[n_, l_List]] := BR[n - 1, DeleteStrand[k, l]];
DeleteStrand[k_, {}] = {};
DeleteStrand[k_, {}] = {};
Line 213: Line 191:
<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{Graphics|
{{Graphics|
n = 16 |
n = 18 |
in = <nowiki>(b = BrunnianBraid[4]) // BraidPlot </nowiki> |
in = <nowiki>(b = BrunnianBraid[4]) // BraidPlot </nowiki> |
img= Rubberband Brunnian Links_Out_15.gif |
img= Rubberband_Brunnian_Links_Out_17.gif |
out= <nowiki>-Graphics-</nowiki>}}
out= <nowiki>-Graphics-</nowiki>}}
<!--END-->
<!--END-->
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<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{InOut|
{{InOut|
n = 17 |
n = 19 |
in = <nowiki>Jones[b][q]</nowiki> |
in = <nowiki>Jones[b][q]</nowiki> |
out= <nowiki> -(11/2) 4 6 5 5 1 3/2
out= <nowiki> -(11/2) 4 6 5 5 1 3/2
Line 236: Line 214:
<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{Graphics|
{{Graphics|
n = 19 |
n = 21 |
in = <nowiki>(bb = DeleteStrand[4, b]) // BraidPlot</nowiki> |
in = <nowiki>(bb = DeleteStrand[4, b]) // BraidPlot</nowiki> |
img= Rubberband Brunnian Links_Out_18.gif |
img= Rubberband_Brunnian_Links_Out_20.gif |
out= <nowiki>-Graphics-</nowiki>}}
out= <nowiki>-Graphics-</nowiki>}}
<!--END-->
<!--END-->
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<!--Robot Land, no human edits to "END"-->
<!--Robot Land, no human edits to "END"-->
{{InOut|
{{InOut|
n = 20 |
n = 22 |
in = <nowiki>Jones[#][q] & /@ {bb, BR[3, {}]}</nowiki> |
in = <nowiki>Jones[#][q] & /@ {bb, BR[3, {}]}</nowiki> |
out= <nowiki> 1 1
out= <nowiki> 1 1

Latest revision as of 14:03, 20 October 2013


A "Rubberband" Brunnian link is obtained by connecting unknots in a closed chain as illustrated in the diagram of the 10-component link, where the last knot gets connected to the first one.

The Rubberband link with 10 components Brunnian Link Example.PNG

If we number the strands in one section of the link as shown and proceed with numbering each following section in the same manner, we can get its PD form. The PD of any "Rubberband" link can be generated in this way by varying the desired number of components:

(For In[1] see Setup)

In[1]:= K0 = PD[X[1, 10, 5, 12], X[2, 12, 6, 14], X[5, 11, 8, 13], X[6, 13, 9, 15], X[10, 0, 16, 4], X[11, 4, 17, 8], X[14, 7, 19, 3], X[15, 9, 18, 7]];
In[2]:= RubberBandBrunnian[n_] := Join @@ Table[K0 /. j_Integer :> j + 16 k, {k, 0, n - 1}] /. {16 n -> 0, 16 n + 1 -> 1, 16 n + 2 -> 2, 16 n + 3 -> 3}

For instance, let us draw the links with three, four, and five components and compute their Jones polynomials:

In[4]:= DrawMorseLink[RBB3=RubberBandBrunnian[3]]
Rubberband Brunnian Links Out 3.gif
Out[4]= -Graphics-
In[5]:= Jones[RBB3][q]
Out[5]= 2 3 4 5 7 8 9 10 -q + 5 q - 11 q + 14 q - 10 q + 11 q - 18 q + 24 q - 18 q + 11 13 14 15 16 17 11 q - 10 q + 14 q - 11 q + 5 q - q
In[7]:= DrawMorseLink[RBB4=RubberBandBrunnian[4]]
Rubberband Brunnian Links Out 6.gif
Out[7]= -Graphics-
In[8]:= Jones[RBB4][q]
Out[8]= 3/2 5/2 7/2 9/2 11/2 13/2 15/2 -q + 7 q - 24 q + 49 q - 56 q + 18 q + 51 q - 17/2 19/2 21/2 23/2 25/2 27/2 111 q + 131 q - 100 q + 32 q + 32 q - 100 q + 29/2 31/2 33/2 35/2 37/2 39/2 131 q - 111 q + 51 q + 18 q - 56 q + 49 q - 41/2 43/2 45/2 24 q + 7 q - q
In[10]:= DrawMorseLink[RBB5=RubberBandBrunnian[5]]
Rubberband Brunnian Links Out 9.gif
Out[10]= -Graphics-
In[11]:= Jones[RBB5][q]
Out[11]= 2 3 4 5 6 7 8 9 -q + 9 q - 40 q + 110 q - 189 q + 167 q + 57 q - 414 q + 10 11 12 13 14 15 16 660 q - 581 q + 189 q + 305 q - 672 q + 816 q - 672 q + 17 18 19 20 21 22 23 305 q + 189 q - 581 q + 660 q - 414 q + 57 q + 167 q - 24 25 26 27 28 189 q + 110 q - 40 q + 9 q - q

We can also check that when one component is removed the remaining link is trivial:

In[12]:= Import["http://katlas.org/w/index.php?title=SubLink.m&action=raw"];
In[13]:= S = SubLink[RubberBandBrunnian[5], {1, 2, 3, 4}];
In[14]:= J=Factor[Jones[S][q]]
Out[14]= 6 3 -(q (1 + q) )


Similarly, in the case of Brunnian braids, removing one strand gives us a trivial braid. We can verify that using the following two programs. The first one constructs a Brunnian braid while the second one removes a selected strand:

In[15]:= BR /: Inverse[BR[n_, l_List]] := BR[n, -Reverse[l]]; BR /: BR[n1_, l1_] ** BR[n2_, l2_] := BR[Max[n1, n2], Join[l1, l2]]; BrunnianBraid[2] = BR[2, {1, 1}]; BrunnianBraid[n_] /; n > 2 := Module[ {b0}, b0 = BrunnianBraid[n - 1]; ((b0 ** BR[n, {n - 1, n - 1}]) ** Inverse[b0]) ** BR[n, {1 - n, 1 - n}] ]
In[16]:= DeleteStrand[k_, BR[n_, l_List]] := BR[n - 1, DeleteStrand[k, l]]; DeleteStrand[k_, {}] = {}; DeleteStrand[k_, {j1_, js___}] := Which[ k < Abs[j1], {j1 - Sign[j1]}~Join~DeleteStrand[k, {js}], k == Abs[j1], DeleteStrand[k + 1, {js}], k == Abs[j1] + 1, DeleteStrand[k - 1, {js}], k > Abs[j1] + 1, {j1}~Join~DeleteStrand[k, {js}] ]

Testing for the Brunnian braid with four strands, we get:

In[18]:= (b = BrunnianBraid[4]) // BraidPlot
Rubberband Brunnian Links Out 17.gif
Out[18]= -Graphics-
In[19]:= Jones[b][q]
Out[19]= -(11/2) 4 6 5 5 1 3/2 -q + ---- - ---- + ---- - ---- - ------- - Sqrt[q] - 5 q + 9/2 7/2 5/2 3/2 Sqrt[q] q q q q 5/2 7/2 9/2 11/2 5 q - 6 q + 4 q - q
In[21]:= (bb = DeleteStrand[4, b]) // BraidPlot
Rubberband Brunnian Links Out 20.gif
Out[21]= -Graphics-
In[22]:= Jones[#][q] & /@ {bb, BR[3, {}]}
Out[22]= 1 1 {2 + - + q, 2 + - + q} q q