(For In[1] see Setup)
| In[1]:=
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?SymmetryType
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| SymmetryType[K] returns the symmetry type of the knot K, if known to KnotTheory`. The possible types are: Reversible, FullyAmphicheiral, NegativeAmphicheiral and Chiral.
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| In[2]:=
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SymmetryType::about
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| The symmetry type data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
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The unknotting number of a knot 
is the minimal number of crossing changes needed in order to unknot .
| In[3]:=
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?UnknottingNumber
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| UnknottingNumber[K] returns the unknotting number of the knot K, if known to KnotTheory`. If only a range of possible values is known, a list of the form {min, max} is returned.
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| In[4]:=
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UnknottingNumber::about
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| The unknotting numbers of torus knots are due to ???. All other unknotting numbers known to KnotTheory` are taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
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Of the 512 knots whose unknotting number is known to KnotTheory`, 197 have unknotting number 1, 247 have unknotting number 2, 54 have unknotting number 3, 12 have unknotting number 4 and 1 has unknotting number 5:
In[5]:=
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Plus @@ u /@ Cases[UnknottingNumber /@ AllKnots[], _Integer]
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Out[5]=
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u[0] + 197 u[1] + 247 u[2] + 54 u[3] + 12 u[4] + u[5]
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There are 4 knots with up to 9 crossings whose unknotting number is unknown:
In[6]:=
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Select[AllKnots[],
Crossings[#] <= 9 && Head[UnknottingNumber[#]] === List &
]
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Out[6]=
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{Knot[9, 10], Knot[9, 13], Knot[9, 35], Knot[9, 38]}
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| In[7]:=
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?ThreeGenus
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| ThreeGenus[K] returns the 3-genus of the knot K, if known to KnotTheory`.
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| In[8]:=
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ThreeGenus::about
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| The 3-genus data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
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The bridge index' of a knot is the minimal number of local maxima (or local minima) in a generic smooth embedding of in 
.
| In[9]:=
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?BridgeIndex
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| BridgeIndex[K] returns the bridge index of the knot K, if known to KnotTheory`.
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| In[10]:=
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BridgeIndex::about
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| The bridge index data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
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An often studied class of knots is the class of 2-bridge knots, knots whose bridge index is 2. Of the 49 9-crossings knots, 24 are 2-bridge:
In[11]:=
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Select[AllKnots[], Crossings[#] == 9 && BridgeIndex[#] == 2 &]
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Out[11]=
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{Knot[9, 1], Knot[9, 2], Knot[9, 3], Knot[9, 4], Knot[9, 5],
Knot[9, 6], Knot[9, 7], Knot[9, 8], Knot[9, 9], Knot[9, 10],
Knot[9, 11], Knot[9, 12], Knot[9, 13], Knot[9, 14], Knot[9, 15],
Knot[9, 17], Knot[9, 18], Knot[9, 19], Knot[9, 20], Knot[9, 21],
Knot[9, 23], Knot[9, 26], Knot[9, 27], Knot[9, 31]}
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The super bridge index of a knot is the minimal number, in a generic smooth embedding of in , of the maximal number of local maxima (or local minima) in a rigid rotation of that projection.
| In[12]:=
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?SuperBridgeIndex
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| SuperBridgeIndex[K] returns the super bridge index of the knot K, if known to KnotTheory`. If only a range of possible values is known, a list of the form {min, max} is returned.
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| In[13]:=
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SuperBridgeIndex::about
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| The super bridge index data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
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| In[14]:=
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?NakanishiIndex
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| NakanishiIndex[K] returns the Nakanishi index of the knot K, if known to KnotTheory`.
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| In[15]:=
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NakanishiIndex::about
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| The Nakanishi index data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
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In[16]:=
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Profile[K_] := Profile[
SymmetryType[K], UnknottingNumber[K], ThreeGenus[K],
BridgeIndex[K], SuperBridgeIndex[K], NakanishiIndex[K]]
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In[17]:=
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Profile[Knot[9,24]]
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Out[17]=
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Profile[Reversible, 1, 3, 3, {4, 6}, 1]
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In[18]:=
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Ks = Select[AllKnots[], (Crossings[#] == 9 && Profile[#]==Profile[Knot[9,24]])&]
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Out[18]=
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{Knot[9, 24], Knot[9, 28], Knot[9, 30], Knot[9, 34]}
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In[19]:=
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Alexander[#][t]& /@ Ks
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Out[19]=
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-3 5 10 2 3
{13 - t + -- - -- - 10 t + 5 t - t ,
2 t
t
-3 5 12 2 3
-15 + t - -- + -- + 12 t - 5 t + t ,
2 t
t
-3 5 12 2 3
17 - t + -- - -- - 12 t + 5 t - t ,
2 t
t
-3 6 16 2 3
23 - t + -- - -- - 16 t + 6 t - t }
2 t
t
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