Post on 15-Dec-2015
The Kauffman Bracket as an Evaluation of the Tutte
Polynomial
Whitney ShermanSaint Michael’s College
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What is a knot?
• A piece of string with a knot tied in it• Glue the ends together
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Movement
• If you deform the knot it doesn’t change.
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The Unknot
• The simplest knot.• An unknotted circle, or the trivial knot.• You can move from the one view of a
knot to another view using Reidemeister moves.
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Reidemeister Moves
• First: Allows us to put in/take out a twist.
• Second: Allows us to either add two crossings or remove two crossings.
• Third: Allows us to slide a strand of the knot from one side of a crossing to the other.
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Links
• A set of knots, all tangled.
• The classic Hopf Links with two components and 10 components.
• The Borremean Rings with three components.
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Labeling Technique
Begin with the shaded knot projection.
• If the top strand ‘spins’ left to sweep out black then it’s a + crossing.
• If the top strand ‘spins’ right then it’s a – crossing.
-+
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Kauffman Bracket in Terms of Pictures
• Three Rules – 1. – 2. a
b
– 3.
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The Connection
• Find the Kauffman Bracket values of and in the Tutte polynomial.0x 0y
=A< > + A < >
-1
=A(-A -A ) + A (1) = -A-22 3-1
=A< > + A < >-1
=A(1) + A (-A –A ) = -A-1 -22 -3
0x
0y
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Kauffman Bracket In Polynomial Terms
• if is an edge corresponding to:
• negative crossing:– There exists a graph such that
where and denote deletion and contraction of the edge from
1 /G A G e A G e
G e /G e
e
Ge
• positive crossing:– There exists a graph G such that 1/G A G e A G e
G
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Recall Universality Property
• Some function on graphs such that and (where is either the disjoint union of and or where and share at most one vertex)
• is given by value takes on bridges
value takes on loops Tutte polynomial
• The Universality of the Tutte Polynomial says that any invariant which satisfies those two properties is an evaluation of the Tutte polynomial
• If is an alternating positive link diagram then the Bracket polynomial of the unsigned graph is
f0x
0y
2 ( ) ( ) 2 4 4( ; , )V G E GL A T G A A
LG
( ) ( ) ( / )f G af G e bf G e ( ) ( ) ( )f GH f G f H
( ) ( ) 0 0( ) ( ; , )E r E r E x yf G a b T G
b a
GH G H G H
f
f
f
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The Connection Cont
• We know from the Kauffman Bracket that , and from that
• By replacing with , with , and with … we get one polynomial from
the other.
• With those replacements the function becomes
f
( )f G G Aa
b 1A
1 /G A G e A G e
( ) ( ) ( / )f G af G e bf G e
( ) 1( ( )) 0 01
( ; , )E r E r E x yG A A T G
A A
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The Connection Cont
• Recall: Rank by definition is the vertex set minus the number of components of the graph (which in our case is 1)
• With those replacements
( ) ( ) ( )r A V G k A
( ) 1 1( ( ) 1 ) 0 01
( ; , )E V G V G x yG A A T G
A A
=2 ( ) 2 0 0
1( ; , )E V G x y
G A T GA A
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Final Touches
• With the values and
• Showing that the Kauffman bracket is an invariant of the Tutte polynomial.
2 ( ) 2 4 4( ; , )E V GG A T G A A
30x A 3
0y A
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Applications of the Kauffman Bracket
• It is hard to tell unknot from a messy projection of it, or for that matter, any knot from a messy projection of it.
• If does not equal , then can’t be the same knot as .
• However, the converse is not necessarily true.
1L 2L 1L
2L
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Resources
• Pictures taken from– http://www.cs.ubc.ca/nest/imager/
contributions/scharein/KnotPlot.html
• Other information from – The Knot Book, Colin Adams– Complexity: Knots, Colourings and Counting,
D. J. A. Welsh– Jo Ellis-Monaghan