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Flat knot 6.752

Min(phi) over symmetries of the knot is: [-2,-2,0,1,1,2,-1,1,1,2,3,1,0,2,2,1,0,1,-1,-1,2]
Flat knots (up to 7 crossings) with same phi are :['6.752']
Arrow polynomial of the knot is: -6K12 + 3K2 + 4
Flat knots (up to 7 crossings) with same arrow polynomial are :['6.689', '6.691', '6.752', '6.754', '6.1106', '6.1116', '6.1126', '6.1335', '6.1379', '6.1386', '6.1409', '6.1415', '6.1417', '6.1418', '6.1421', '6.1422', '6.1428', '6.1431', '6.1432', '6.1435', '6.1443', '6.1445', '6.1446', '6.1447', '6.1454', '6.1455', '6.1460', '6.1462', '6.1464', '6.1466', '6.1472', '6.1474', '6.1475', '6.1501', '6.1516', '6.1518', '6.1566', '6.1570', '6.1590', '6.1599', '6.1602', '6.1603', '6.1604', '6.1605', '6.1614', '6.1615', '6.1625', '6.1628', '6.1730', '6.1780', '6.1883', '6.1885', '6.1888', '6.1890', '6.1941', '6.1943', '6.1945', '6.1948', '6.1961', '6.1963', '6.1966', '6.1967', '6.1971']
Outer characteristic polynomial of the knot is: t^7+47t^5+33t^3+3t
Flat knots (up to 7 crossings) with same outer characteristic polynomial are :['6.752']
2-strand cable arrow polynomial of the knot is: 96K14K2 - 1008K14 + 32K1*3K2K3 - 608K1*3K3 - 960K12K2*2 - 96K1*2K2K4 + 3408K1*2K2 - 368K12K3*2 - 2640K1*2 - 32K1K22K3 + 2752K1K2K3 + 384K1K3K4 - 56K24 + 144K2*2K4 - 1888K22 - 960K3*2 - 130K4**2 + 1928
Flat knots (up to 6 crossings) with same 2-strand cable arrow polynomial are :['6.752']
Virtual knots (up to 6 crossings) projecting to this knot are :'vk6.16491', 'vk6.16584', 'vk6.18092', 'vk6.18430', 'vk6.22922', 'vk6.23019', 'vk6.23480', 'vk6.23819', 'vk6.24543', 'vk6.24962', 'vk6.35008', 'vk6.35629', 'vk6.36682', 'vk6.37106', 'vk6.39459', 'vk6.41660', 'vk6.42468', 'vk6.42581', 'vk6.43962', 'vk6.44279', 'vk6.46047', 'vk6.47715', 'vk6.54734', 'vk6.54831', 'vk6.56210', 'vk6.57465', 'vk6.59198', 'vk6.59263', 'vk6.59646', 'vk6.59994', 'vk6.60809', 'vk6.62140', 'vk6.64813', 'vk6.65046', 'vk6.65566', 'vk6.65878', 'vk6.68050', 'vk6.68115', 'vk6.68648', 'vk6.68863']
The R3 orbit of minmal crossing diagrams contains:
The diagrammatic symmetry type of this knot is c.
The reverse -K is
The mirror image K* is
The reversed mirror image -K* is
The fillings (up to the first 10) associated to the algebraic genus:
Or click here to check the fillings

Min(phi) over symmetries of the knot is: [-2,-2,0,1,1,2,-1,1,1,2,3,1,0,2,2,1,0,1,-1,-1,2]

Flat knots (up to 7 crossings) with same phi are :['6.752']

Arrow polynomial of the knot is: -6*K1**2 + 3*K2 + 4

Flat knots (up to 7 crossings) with same arrow polynomial are :['6.689', '6.691', '6.752', '6.754', '6.1106', '6.1116', '6.1126', '6.1335', '6.1379', '6.1386', '6.1409', '6.1415', '6.1417', '6.1418', '6.1421', '6.1422', '6.1428', '6.1431', '6.1432', '6.1435', '6.1443', '6.1445', '6.1446', '6.1447', '6.1454', '6.1455', '6.1460', '6.1462', '6.1464', '6.1466', '6.1472', '6.1474', '6.1475', '6.1501', '6.1516', '6.1518', '6.1566', '6.1570', '6.1590', '6.1599', '6.1602', '6.1603', '6.1604', '6.1605', '6.1614', '6.1615', '6.1625', '6.1628', '6.1730', '6.1780', '6.1883', '6.1885', '6.1888', '6.1890', '6.1941', '6.1943', '6.1945', '6.1948', '6.1961', '6.1963', '6.1966', '6.1967', '6.1971']

Outer characteristic polynomial of the knot is: t^7+47t^5+33t^3+3t

Flat knots (up to 7 crossings) with same outer characteristic polynomial are :['6.752']

2-strand cable arrow polynomial of the knot is: 96*K1**4*K2 - 1008*K1**4 + 32*K1**3*K2*K3 - 608*K1**3*K3 - 960*K1**2*K2**2 - 96*K1**2*K2*K4 + 3408*K1**2*K2 - 368*K1**2*K3**2 - 2640*K1**2 - 32*K1*K2**2*K3 + 2752*K1*K2*K3 + 384*K1*K3*K4 - 56*K2**4 + 144*K2**2*K4 - 1888*K2**2 - 960*K3**2 - 130*K4**2 + 1928

Flat knots (up to 6 crossings) with same 2-strand cable arrow polynomial are :['6.752']

Virtual knots (up to 6 crossings) projecting to this knot are :'vk6.16491', 'vk6.16584', 'vk6.18092', 'vk6.18430', 'vk6.22922', 'vk6.23019', 'vk6.23480', 'vk6.23819', 'vk6.24543', 'vk6.24962', 'vk6.35008', 'vk6.35629', 'vk6.36682', 'vk6.37106', 'vk6.39459', 'vk6.41660', 'vk6.42468', 'vk6.42581', 'vk6.43962', 'vk6.44279', 'vk6.46047', 'vk6.47715', 'vk6.54734', 'vk6.54831', 'vk6.56210', 'vk6.57465', 'vk6.59198', 'vk6.59263', 'vk6.59646', 'vk6.59994', 'vk6.60809', 'vk6.62140', 'vk6.64813', 'vk6.65046', 'vk6.65566', 'vk6.65878', 'vk6.68050', 'vk6.68115', 'vk6.68648', 'vk6.68863']

The R3 orbit of minmal crossing diagrams contains:

The diagrammatic symmetry type of this knot is c.

The reverse -K is

The mirror image K* is

The reversed mirror image -K* is

The fillings (up to the first 10) associated to the algebraic genus:

Or click here to check the fillings

invariant	value
Gauss code	O1O2O3O4U2O5U4U1U3O6U5U6
R3 orbit	{'O1O2O3U1O4O5U2U4U3O6U5U6', 'O1O2O3O4U2O5U4U1U3O6U5U6'}
R3 orbit length	2
Gauss code of -K	O1O2O3O4U5U6O5U2U4U1O6U3
Gauss code of K*	O1O2O3U4O5O4U2U6U3U1O6U5
Gauss code of -K*	O1O2O3U4O5U3U1U5U2O6O4U6
Diagrammatic symmetry type	c
Flat genus of the diagram	3
If K is checkerboard colorable	False
If K is almost classical	False
Based matrix from Gauss code	[[ 0 -2 -2 1 0 2 1],[ 2 0 -1 2 1 3 1],[ 2 1 0 2 1 2 0],[-1 -2 -2 0 0 2 1],[ 0 -1 -1 0 0 1 1],[-2 -3 -2 -2 -1 0 1],[-1 -1 0 -1 -1 -1 0]]
Primitive based matrix	[[ 0 2 1 1 0 -2 -2],[-2 0 1 -2 -1 -2 -3],[-1 -1 0 -1 -1 0 -1],[-1 2 1 0 0 -2 -2],[ 0 1 1 0 0 -1 -1],[ 2 2 0 2 1 0 1],[ 2 3 1 2 1 -1 0]]
If based matrix primitive	True
Phi of primitive based matrix	[-2,-1,-1,0,2,2,-1,2,1,2,3,1,1,0,1,0,2,2,1,1,-1]
Phi over symmetry	[-2,-2,0,1,1,2,-1,1,1,2,3,1,0,2,2,1,0,1,-1,-1,2]
Phi of -K	[-2,-2,0,1,1,2,-1,1,1,3,2,1,1,2,1,1,0,1,-1,-1,2]
Phi of K*	[-2,-1,-1,0,2,2,-1,2,1,1,2,1,1,1,1,0,2,3,1,1,-1]
Phi of -K*	[-2,-2,0,1,1,2,-1,1,1,2,3,1,0,2,2,1,0,1,-1,-1,2]
Symmetry type of based matrix	c
u-polynomial	t^2-2t
Normalized Jones-Krushkal polynomial	13z+27
Enhanced Jones-Krushkal polynomial	13w^2z+27w
Inner characteristic polynomial	t^6+33t^4+8t^2
Outer characteristic polynomial	t^7+47t^5+33t^3+3t
Flat arrow polynomial	-6K12 + 3K2 + 4
2-strand cable arrow polynomial	96K14K2 - 1008K14 + 32K1*3K2K3 - 608K1*3K3 - 960K12K2*2 - 96K1*2K2K4 + 3408K1*2K2 - 368K12K3*2 - 2640K1*2 - 32K1K22K3 + 2752K1K2K3 + 384K1K3K4 - 56K24 + 144K2*2K4 - 1888K22 - 960K3*2 - 130K4**2 + 1928
Genus of based matrix	2
Fillings of based matrix	[[{1, 6}, {2, 5}, {3, 4}], [{1, 6}, {2, 5}, {4}, {3}], [{1, 6}, {3, 5}, {2, 4}], [{1, 6}, {3, 5}, {4}, {2}], [{1, 6}, {4, 5}, {2, 3}], [{1, 6}, {4, 5}, {3}, {2}], [{1, 6}, {5}, {2, 4}, {3}], [{1, 6}, {5}, {3, 4}, {2}], [{1, 6}, {5}, {4}, {2, 3}], [{2, 6}, {1, 5}, {3, 4}], [{2, 6}, {1, 5}, {4}, {3}], [{2, 6}, {3, 5}, {1, 4}], [{2, 6}, {3, 5}, {4}, {1}], [{2, 6}, {4, 5}, {1, 3}], [{2, 6}, {4, 5}, {3}, {1}], [{2, 6}, {5}, {1, 4}, {3}], [{2, 6}, {5}, {3, 4}, {1}], [{2, 6}, {5}, {4}, {1, 3}], [{3, 6}, {1, 5}, {2, 4}], [{3, 6}, {1, 5}, {4}, {2}], [{3, 6}, {2, 5}, {1, 4}], [{3, 6}, {2, 5}, {4}, {1}], [{3, 6}, {4, 5}, {1, 2}], [{3, 6}, {4, 5}, {2}, {1}], [{3, 6}, {5}, {1, 4}, {2}], [{3, 6}, {5}, {2, 4}, {1}], [{3, 6}, {5}, {4}, {1, 2}], [{3, 6}, {5}, {4}, {2}, {1}], [{4, 6}, {1, 5}, {2, 3}], [{4, 6}, {1, 5}, {3}, {2}], [{4, 6}, {2, 5}, {1, 3}], [{4, 6}, {2, 5}, {3}, {1}], [{4, 6}, {3, 5}, {1, 2}], [{4, 6}, {3, 5}, {2}, {1}], [{4, 6}, {5}, {1, 3}, {2}], [{4, 6}, {5}, {2, 3}, {1}], [{4, 6}, {5}, {3}, {1, 2}], [{5, 6}, {1, 4}, {2, 3}], [{5, 6}, {1, 4}, {3}, {2}], [{5, 6}, {2, 4}, {1, 3}], [{5, 6}, {2, 4}, {3}, {1}], [{5, 6}, {3, 4}, {1, 2}], [{5, 6}, {3, 4}, {2}, {1}], [{5, 6}, {4}, {1, 3}, {2}], [{5, 6}, {4}, {2, 3}, {1}], [{5, 6}, {4}, {3}, {1, 2}], [{5, 6}, {4}, {3}, {2}, {1}], [{6}, {1, 5}, {2, 4}, {3}], [{6}, {1, 5}, {3, 4}, {2}], [{6}, {1, 5}, {4}, {2, 3}], [{6}, {2, 5}, {1, 4}, {3}], [{6}, {2, 5}, {3, 4}, {1}], [{6}, {2, 5}, {4}, {1, 3}], [{6}, {3, 5}, {1, 4}, {2}], [{6}, {3, 5}, {2, 4}, {1}], [{6}, {3, 5}, {4}, {1, 2}], [{6}, {3, 5}, {4}, {2}, {1}], [{6}, {4, 5}, {1, 3}, {2}], [{6}, {4, 5}, {2, 3}, {1}], [{6}, {4, 5}, {3}, {1, 2}], [{6}, {5}, {1, 4}, {2, 3}], [{6}, {5}, {2, 4}, {1, 3}], [{6}, {5}, {2, 4}, {3}, {1}], [{6}, {5}, {3, 4}, {1, 2}]]
If K is slice	False

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