Three Dimensional Invariants

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(For In[1] see Setup)

In[2]:= ?SymmetryType
SymmetryType[K] returns the symmetry type of the knot K, if known to KnotTheory`. The possible types are: Reversible, FullyAmphicheiral, NegativeAmphicheiral and Chiral.
In[3]:= SymmetryType::about
The symmetry type data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.

The inverse of a knot is the knot obtained from it by reversing its parametrization. The mirror of A knot is obtained from by reversing the orientation of the ambient space, or, alternatively, by flipping all the crossings of .

A knot is called "fully amphicheiral" if it is equal to its inverse and also to its mirror. The first knot with this property is

In[4]:= Select[AllKnots[], (SymmetryType[#] == FullyAmphicheiral) &, 1]
Out[4]= {Knot[4, 1]}

A knot is called "reversible" if it is equal to its inverse yet it different from its mirror (and hence also from the inverse of its mirror). Many knots have this property; indeed, the first one is:

In[5]:= Select[AllKnots[], (SymmetryType[#] == Reversible) &, 1]
Out[5]= {Knot[3, 1]}

A knot is called "positive amphicheiral" if it is different from its inverse but equal to its mirror. There are no such knots with up to 11 crossings.

A knot is called "negative amphicheiral" if it is different from its inverse and its mirror, yet it is equal to the inverse of its mirror. The first knot with this property is

In[6]:= Select[AllKnots[], (SymmetryType[#] == NegativeAmphicheiral) &, 1]
Out[6]= {Knot[8, 17]}

Finally, if a knot is different from its inverse, its mirror and from the inverse of its mirror, it is "chiral". The first such knot is

In[7]:= Select[AllKnots[], (SymmetryType[#] == Chiral) &, 1]
Out[7]= {Knot[9, 32]}

It is a amusing to take "symmetry type" statistics on all the prime knots with up to 11 crossings:

In[8]:= Plus @@ (SymmetryType /@ Rest[AllKnots[]])
Out[8]= 216 Chiral + 13 FullyAmphicheiral + 7 NegativeAmphicheiral + 565 Reversible
4 1.gif
4_1
3 1.gif
3_1
8 17.gif
8_17
9 32.gif
9_32

The unknotting number of a knot is the minimal number of crossing changes needed in order to unknot .

In[9]:= ?UnknottingNumber
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.
In[10]:= UnknottingNumber::about
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/.


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[11]:= Plus @@ u /@ Cases[UnknottingNumber /@ AllKnots[], _Integer]
Out[11]= u[0] + 197 u[1] + 247 u[2] + 54 u[3] + 12 u[4] + u[5]

There are 4 knots with up to 9 crossings whose unknotting number is unknown:

In[12]:= Select[AllKnots[], Crossings[#] <= 9 && Head[UnknottingNumber[#]] === List & ]
Out[12]= {Knot[9, 10], Knot[9, 13], Knot[9, 35], Knot[9, 38]}
9 10.gif
9_10
9 13.gif
9_13
9 35.gif
9_35
9 38.gif
9_38
In[13]:= ?ThreeGenus
ThreeGenus[K] returns the 3-genus of the knot K, if known to KnotTheory`.
In[14]:= ThreeGenus::about
The 3-genus data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.

The bridge index' of a knot is the minimal number of local maxima (or local minima) in a generic smooth embedding of in .

In[15]:= ?BridgeIndex
BridgeIndex[K] returns the bridge index of the knot K, if known to KnotTheory`.
In[16]:= BridgeIndex::about
The bridge index data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.

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[17]:= Select[AllKnots[], Crossings[#] == 9 && BridgeIndex[#] == 2 &]
Out[17]= {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]}

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[18]:= ?SuperBridgeIndex
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.
In[19]:= SuperBridgeIndex::about
The super bridge index data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
In[20]:= ?NakanishiIndex
NakanishiIndex[K] returns the Nakanishi index of the knot K, if known to KnotTheory`.
In[21]:= NakanishiIndex::about
The Nakanishi index data known to KnotTheory` is taken from Charles Livingston's "Table of Knot Invariants", http://www.indiana.edu/~knotinfo/.
In[22]:= Profile[K_] := Profile[ SymmetryType[K], UnknottingNumber[K], ThreeGenus[K], BridgeIndex[K], SuperBridgeIndex[K], NakanishiIndex[K] ]
In[23]:= Profile[Knot[9,24]]
Out[23]= Profile[Reversible, 1, 3, 3, {4, 6}, 1]
In[24]:= Ks = Select[AllKnots[], (Crossings[#] == 9 && Profile[#]==Profile[Knot[9,24]])&]
Out[24]= {Knot[9, 24], Knot[9, 28], Knot[9, 30], Knot[9, 34]}


9 24.gif
9_24
9 28.gif
9_28
9 30.gif
9_30
9 34.gif
9_34
In[25]:= Alexander[#][t]& /@ Ks
Out[25]= -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