Gukov-Manolescu series (F_K) for most nice Links of 10 crossings
This table contains the first few terms (degree 10 for 2 component, degree 6 for most 3 components) of the Gukov-Manolescu series for links under the column fk_polynomial. The braid and sign diagram used to compute the invariant are listed under braid and sign_diagram.
|
knotinfo_id
?
string
KnotInfo identifier
|
braid_length
?
int
Length of the braid used for the computation
|
braid
?
short_code · Mathematica
Braid word used for the computation
|
sign_diagram
?
string
Sign diagram used for the computation (list of sign sequences per component)
|
overall_x_powers
?
short_code · Mathematica
Overall x powers per component
|
fk_polynomial
?
short_code · Mathematica
First terms of the F_K series (Mathematica format)
|
|---|---|---|---|---|---|
| L10a162{1;0} | 11 | {-2,3,-2,-2,3,-2,3,3,-1,2,-1} | [[1, -1, -1, -1, -1, -1, -1, 1, -1, -1], [-1, -1, 1, -1, -1, 1], [1, -1, -1, -1, 1, -1]] | x1^(1/2) | q*x1^-1*x2^2*x3+q*x1^-1*x2^2*x3^2-x2*x3-x2*x3^2+q*x2^2*x3-x2^2*x3-q^2*x2^2*x3^2+q*x2^2*x3^2-2*x2^2*x3^2-x1*x2*x3+q*x1*x2*x3^2-x1*x2*x3^2+q^-1*x1*x2*x3^2+q*x1*x2^2*x3-x1*x2^2*x3-q^3*x1*x2^2*x3^2-2*q^2*x1*x2^2*x3^2+2*q*x1*x2^2*x3^2-2*x1*x2^2*x3^2+q^-1*x1*x2^2*x3^2+q^-2*x1*x2^2*x3^2-x1^2*x2*x3+q^2*x1^2*x2*x3^2+q*x1^2*x2*x3^2-x1^2*x2*x3^2+q^-1*x1^2*x2*x3^2+q*x1^2*x2^2*x3-x1^2*x2^2*x3-q^4*x1^2*x2^2*x3^2-2*q^3*x1^2*x2^2*x3^2-q^2*x1^2*x2^2*x3^2+3*q*x1^2*x2^2*x3^2-2*x1^2*x2^2*x3^2+q^-1*x1^2*x2^2*x3^2+q^-2*x1^2*x2^2*x3^2 |
| L10a162{1;0} | 11 | {-2,3,-2,-2,3,-2,3,3,-1,2,-1} | [[1, -1, 1, 1, -1, 1, 1, 1, 1, -1], [-1, -1, 1, -1, -1, 1], [1, -1, 1, -1, 1, 1]] | x1^(1/2) | -x1*x3-x1*x3^2-x1*x2*x3-x1*x2*x3^2-x1*x2^2*x3-x1*x2^2*x3^2+q*x1^2*x2^-1*x3+q*x1^2*x2^-1*x3^2+q*x1^2*x3-x1^2*x3+2*q*x1^2*x3^2-x1^2*x3^2+q^-1*x1^2*x3^2+q*x1^2*x2*x3-x1^2*x2*x3+2*q*x1^2*x2*x3^2-x1^2*x2*x3^2+q^-1*x1^2*x2*x3^2+q*x1^2*x2^2*x3-x1^2*x2^2*x3+2*q*x1^2*x2^2*x3^2-x1^2*x2^2*x3^2+q^-1*x1^2*x2^2*x3^2 |
| L10a162{1;1} | 11 | {2,-3,2,1,1,2,2,2,-3,2,-1} | [[-1, 1, -1, -1, 1, -1, 1, -1], [1, -1, -1, -1, 1, -1], [-1, 1, 1, -1, 1, 1, -1, 1]] | x3^(1/2) | -q^2*x1*x2-q^2*x1*x2*x3-q^2*x1*x2*x3^2-q^2*x1*x2^2+q^3*x1*x2^2*x3-q^2*x1*x2^2*x3+q^3*x1*x2^2*x3^2-q^2*x1*x2^2*x3^2+q*x1^2*x2*x3^-1-2*q^2*x1^2*x2+q*x1^2*x2-2*q^2*x1^2*x2*x3-2*q^2*x1^2*x2*x3^2-x1^2*x2*x3^2-q^2*x1^2*x2^2*x3^-1+q*x1^2*x2^2*x3^-1+x1^2*x2^2*x3^-1+q^3*x1^2*x2^2-4*q^2*x1^2*x2^2+x1^2*x2^2+3*q^3*x1^2*x2^2*x3-3*q^2*x1^2*x2^2*x3-q*x1^2*x2^2*x3+3*q^3*x1^2*x2^2*x3^2-2*q^2*x1^2*x2^2*x3^2-x1^2*x2^2*x3^2-q^-1*x1^2*x2^2*x3^2 |
| L10a162{1;1} | 11 | {2,-3,2,1,1,2,2,2,-3,2,-1} | [[-1, 1, 1, 1, 1, -1, 1, -1], [1, 1, 1, -1, 1, -1], [-1, 1, 1, -1, -1, 1, -1, 1]] | x3^(1/2) | q*x1^-1*x2*x3^2-q^2*x1^-1*x2^2*x3^2+q*x1^-1*x2^2*x3^2+x1^-1*x2^2*x3^2-q^2*x2*x3-2*q^2*x2*x3^2+q*x2*x3^2-q^2*x2^2*x3+q^3*x2^2*x3^2-3*q^2*x2^2*x3^2+q*x2^2*x3^2+x2^2*x3^2-q^2*x1*x2*x3-2*q^2*x1*x2*x3^2-q^2*x1*x2^2*x3+q^3*x1*x2^2*x3^2-2*q^2*x1*x2^2*x3^2-q^2*x1^2*x2*x3-2*q^2*x1^2*x2*x3^2-x1^2*x2*x3^2-q^2*x1^2*x2^2*x3+2*q^3*x1^2*x2^2*x3^2-2*q^2*x1^2*x2^2*x3^2-x1^2*x2^2*x3^2-q^-1*x1^2*x2^2*x3^2 |
| L10a162{1;1} | 11 | {2,-3,2,1,1,2,2,2,-3,2,-1} | [[1, 1, 1, -1, 1, -1, 1, -1], [1, -1, -1, -1, 1, -1], [-1, 1, 1, 1, 1, 1, -1, 1]] | x3^(1/2) | -q^2*x1*x2-q^2*x1*x2*x3-q^2*x1*x2*x3^2-q^2*x1*x2^2+q^3*x1*x2^2*x3-q^2*x1*x2^2*x3+q^3*x1*x2^2*x3^2-q^2*x1*x2^2*x3^2+q*x1^2*x2*x3^-1-2*q^2*x1^2*x2+q*x1^2*x2-2*q^2*x1^2*x2*x3-2*q^2*x1^2*x2*x3^2-x1^2*x2*x3^2-q^2*x1^2*x2^2*x3^-1+q*x1^2*x2^2*x3^-1+x1^2*x2^2*x3^-1+q^3*x1^2*x2^2-4*q^2*x1^2*x2^2+x1^2*x2^2+3*q^3*x1^2*x2^2*x3-3*q^2*x1^2*x2^2*x3-q*x1^2*x2^2*x3+3*q^3*x1^2*x2^2*x3^2-2*q^2*x1^2*x2^2*x3^2-x1^2*x2^2*x3^2-q^-1*x1^2*x2^2*x3^2 |
| L10a163{0;0} | 10 | {1,-2,1,-2,-2,1,-2,1,-2,-2} | [[-1, 1, -1, 1, -1, 1], [1, -1, 1, -1, 1, -1, 1, -1], [-1, 1, -1, 1, -1, 1]] | 1 | -q^-1*x1*x2*x3-q^-1*x1*x2*x3^2-2*q^-1*x1*x2^2*x3-2*q^-1*x1*x2^2*x3^2+q^-2*x1*x2^2*x3^2-q^-1*x1^2*x2*x3-q^-1*x1^2*x2*x3^2-2*q^-1*x1^2*x2^2*x3+q^-2*x1^2*x2^2*x3-3*q^-1*x1^2*x2^2*x3^2+2*q^-2*x1^2*x2^2*x3^2 |
| L10a163{0;0} | 10 | {1,-2,1,-2,-2,1,-2,1,-2,-2} | [[1, 1, -1, 1, -1, 1], [1, 1, 1, -1, 1, 1, 1, -1], [-1, 1, 1, 1, -1, 1]] | 1 | -q^-1*x1*x2*x3-q^-1*x1*x2*x3^2-2*q^-1*x1*x2^2*x3-2*q^-1*x1*x2^2*x3^2+q^-2*x1*x2^2*x3^2-q^-1*x1^2*x2*x3-q^-1*x1^2*x2*x3^2-2*q^-1*x1^2*x2^2*x3+q^-2*x1^2*x2^2*x3-3*q^-1*x1^2*x2^2*x3^2+2*q^-2*x1^2*x2^2*x3^2 |
| L10a163{0;1} | 14 | {1,-2,3,-2,-4,3,-2,-1,-2,3,-2,4,3,-2} | [[-1, 1, -1, 1, 1, 1, -1, 1, -1, -1, -1, -1, -1, -1, -1, -1], [-1, 1, 1, 1, 1, 1], [1, -1, -1, -1, -1, -1]] | x1^(1/2) | -q^-1*x1-q^-1*x1*x3-q^-1*x1*x3^2-q^-1*x1*x2-q^-1*x1*x2*x3-q^-1*x1*x2*x3^2-q^-1*x1*x2^2-q^-1*x1*x2^2*x3-q^-1*x1*x2^2*x3^2-q^-1*x1^2*x2^-1*x3^-1-q^-1*x1^2*x2^-1+q^-2*x1^2*x2^-1-q^-1*x1^2*x2^-1*x3+q^-2*x1^2*x2^-1*x3-q^-1*x1^2*x2^-1*x3^2+q^-2*x1^2*x2^-1*x3^2-q^-1*x1^2*x3^-1+q^-2*x1^2*x3^-1-3*q^-1*x1^2+2*q^-2*x1^2-3*q^-1*x1^2*x3+2*q^-2*x1^2*x3-3*q^-1*x1^2*x3^2+2*q^-2*x1^2*x3^2-q^-1*x1^2*x2*x3^-1+q^-2*x1^2*x2*x3^-1-3*q^-1*x1^2*x2+2*q^-2*x1^2*x2-3*q^-1*x1^2*x2*x3+2*q^-2*x1^2*x2*x3-3*q^-1*x1^2*x2*x3^2+2*q^-2*x1^2*x2*x3^2-q^-1*x1^2*x2^2*x3^-1+q^-2*x1^2*x2^2*x3^-1-3*q^-1*x1^2*x2^2+2*q^-2*x1^2*x2^2-3*q^-1*x1^2*x2^2*x3+2*q^-2*x1^2*x2^2*x3-3*q^-1*x1^2*x2^2*x3^2+2*q^-2*x1^2*x2^2*x3^2 |
| L10a163{0;1} | 14 | {1,-2,3,-2,-4,3,-2,-1,-2,3,-2,4,3,-2} | [[1, 1, -1, 1, 1, 1, -1, 1, 1, -1, -1, -1, -1, -1, -1, -1], [-1, 1, 1, 1, 1, 1], [1, -1, -1, -1, -1, -1]] | x1^(1/2) | -q^-1*x1-q^-1*x1*x3-q^-1*x1*x3^2-q^-1*x1*x2-q^-1*x1*x2*x3-q^-1*x1*x2*x3^2-q^-1*x1*x2^2-q^-1*x1*x2^2*x3-q^-1*x1*x2^2*x3^2-q^-1*x1^2*x2^-1*x3^-1-q^-1*x1^2*x2^-1+q^-2*x1^2*x2^-1-q^-1*x1^2*x2^-1*x3+q^-2*x1^2*x2^-1*x3-q^-1*x1^2*x2^-1*x3^2+q^-2*x1^2*x2^-1*x3^2-q^-1*x1^2*x3^-1+q^-2*x1^2*x3^-1-3*q^-1*x1^2+2*q^-2*x1^2-3*q^-1*x1^2*x3+2*q^-2*x1^2*x3-3*q^-1*x1^2*x3^2+2*q^-2*x1^2*x3^2-q^-1*x1^2*x2*x3^-1+q^-2*x1^2*x2*x3^-1-3*q^-1*x1^2*x2+2*q^-2*x1^2*x2-3*q^-1*x1^2*x2*x3+2*q^-2*x1^2*x2*x3-3*q^-1*x1^2*x2*x3^2+2*q^-2*x1^2*x2*x3^2-q^-1*x1^2*x2^2*x3^-1+q^-2*x1^2*x2^2*x3^-1-3*q^-1*x1^2*x2^2+2*q^-2*x1^2*x2^2-3*q^-1*x1^2*x2^2*x3+2*q^-2*x1^2*x2^2*x3-3*q^-1*x1^2*x2^2*x3^2+2*q^-2*x1^2*x2^2*x3^2 |
| L10a163{1;0} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[-1, -1, -1, -1, 1, -1, -1, -1, 1, -1], [-1, 1, 1, 1, -1, -1], [1, -1, -1, -1, 1, -1]] | x1^(1/2) | -x1*x3-x1*x3^2-x1*x2*x3-x1*x2*x3^2-x1*x2^2*x3-x1*x2^2*x3^2+q^-1*x1^2*x2^-1*x3-x1^2*x2^-1*x3^2+q^-1*x1^2*x2^-1*x3^2-2*x1^2*x3+q^-1*x1^2*x3-3*x1^2*x3^2+2*q^-1*x1^2*x3^2-2*x1^2*x2*x3+q^-1*x1^2*x2*x3-3*x1^2*x2*x3^2+2*q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-3*x1^2*x2^2*x3^2+2*q^-1*x1^2*x2^2*x3^2 |
| L10a163{1;0} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[-1, -1, -1, -1, 1, 1, 1, 1, 1, -1], [-1, 1, 1, 1, -1, -1], [1, -1, -1, -1, 1, -1]] | x1^(1/2) | q^-1*x1^-1*x2^2*x3+2*q^-1*x1^-1*x2^2*x3^2+q^-2*x1^-1*x2^2*x3^2-x2*x3-2*x2*x3^2-2*x2^2*x3+q^-1*x2^2*x3-2*q*x2^2*x3^2-4*x2^2*x3^2+3*q^-1*x2^2*x3^2-x1*x2*x3-2*x1*x2*x3^2+q^-1*x1*x2*x3^2-2*x1*x2^2*x3+q^-1*x1*x2^2*x3-2*q*x1*x2^2*x3^2-3*x1*x2^2*x3^2+5*q^-1*x1*x2^2*x3^2-x1^2*x2*x3-2*x1^2*x2*x3^2+q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-q*x1^2*x2^2*x3^2-3*x1^2*x2^2*x3^2+5*q^-1*x1^2*x2^2*x3^2-q^-3*x1^2*x2^2*x3^2 |
| L10a163{1;0} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[1, -1, 1, -1, 1, -1, -1, -1, 1, -1], [-1, 1, 1, 1, -1, 1], [1, -1, 1, -1, 1, -1]] | x1^(1/2) | -x1*x3-x1*x3^2-x1*x2*x3-x1*x2*x3^2-x1*x2^2*x3-x1*x2^2*x3^2+q^-1*x1^2*x2^-1*x3-x1^2*x2^-1*x3^2+q^-1*x1^2*x2^-1*x3^2-2*x1^2*x3+q^-1*x1^2*x3-3*x1^2*x3^2+2*q^-1*x1^2*x3^2-2*x1^2*x2*x3+q^-1*x1^2*x2*x3-3*x1^2*x2*x3^2+2*q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-3*x1^2*x2^2*x3^2+2*q^-1*x1^2*x2^2*x3^2 |
| L10a163{1;0} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[1, -1, 1, -1, 1, 1, 1, 1, 1, -1], [-1, 1, 1, 1, -1, 1], [1, -1, 1, -1, 1, -1]] | 1 | q^-1*x1^-1*x2^2*x3+2*q^-1*x1^-1*x2^2*x3^2+q^-2*x1^-1*x2^2*x3^2-x2*x3-2*x2*x3^2-2*x2^2*x3+q^-1*x2^2*x3-2*q*x2^2*x3^2-4*x2^2*x3^2+3*q^-1*x2^2*x3^2-x1*x2*x3-2*x1*x2*x3^2+q^-1*x1*x2*x3^2-2*x1*x2^2*x3+q^-1*x1*x2^2*x3-2*q*x1*x2^2*x3^2-3*x1*x2^2*x3^2+5*q^-1*x1*x2^2*x3^2-x1^2*x2*x3-2*x1^2*x2*x3^2+q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-q*x1^2*x2^2*x3^2-3*x1^2*x2^2*x3^2+5*q^-1*x1^2*x2^2*x3^2-q^-3*x1^2*x2^2*x3^2 |
| L10a163{1;1} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[-1, -1, -1, -1, 1, -1, -1, -1, 1, -1], [-1, 1, 1, 1, -1, -1], [1, -1, -1, -1, 1, -1]] | 1 | -x1*x3-x1*x3^2-x1*x2*x3-x1*x2*x3^2-x1*x2^2*x3-x1*x2^2*x3^2+q^-1*x1^2*x2^-1*x3-x1^2*x2^-1*x3^2+q^-1*x1^2*x2^-1*x3^2-2*x1^2*x3+q^-1*x1^2*x3-3*x1^2*x3^2+2*q^-1*x1^2*x3^2-2*x1^2*x2*x3+q^-1*x1^2*x2*x3-3*x1^2*x2*x3^2+2*q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-3*x1^2*x2^2*x3^2+2*q^-1*x1^2*x2^2*x3^2 |
| L10a163{1;1} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[-1, -1, -1, -1, 1, 1, 1, 1, 1, -1], [-1, 1, 1, 1, -1, -1], [1, -1, -1, -1, 1, -1]] | x1^(1/2) | q^-1*x1^-1*x2^2*x3+2*q^-1*x1^-1*x2^2*x3^2+q^-2*x1^-1*x2^2*x3^2-x2*x3-2*x2*x3^2-2*x2^2*x3+q^-1*x2^2*x3-2*q*x2^2*x3^2-4*x2^2*x3^2+3*q^-1*x2^2*x3^2-x1*x2*x3-2*x1*x2*x3^2+q^-1*x1*x2*x3^2-2*x1*x2^2*x3+q^-1*x1*x2^2*x3-2*q*x1*x2^2*x3^2-3*x1*x2^2*x3^2+5*q^-1*x1*x2^2*x3^2-x1^2*x2*x3-2*x1^2*x2*x3^2+q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-q*x1^2*x2^2*x3^2-3*x1^2*x2^2*x3^2+5*q^-1*x1^2*x2^2*x3^2-q^-3*x1^2*x2^2*x3^2 |
| L10a163{1;1} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[1, -1, 1, -1, 1, -1, -1, -1, 1, -1], [-1, 1, 1, 1, -1, 1], [1, -1, 1, -1, 1, -1]] | x1^(1/2) | -x1*x3-x1*x3^2-x1*x2*x3-x1*x2*x3^2-x1*x2^2*x3-x1*x2^2*x3^2+q^-1*x1^2*x2^-1*x3-x1^2*x2^-1*x3^2+q^-1*x1^2*x2^-1*x3^2-2*x1^2*x3+q^-1*x1^2*x3-3*x1^2*x3^2+2*q^-1*x1^2*x3^2-2*x1^2*x2*x3+q^-1*x1^2*x2*x3-3*x1^2*x2*x3^2+2*q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-3*x1^2*x2^2*x3^2+2*q^-1*x1^2*x2^2*x3^2 |
| L10a163{1;1} | 11 | {2,3,3,-1,-1,2,-1,2,-3,2,-1} | [[1, -1, 1, -1, 1, 1, 1, 1, 1, -1], [-1, 1, 1, 1, -1, 1], [1, -1, 1, -1, 1, -1]] | x1^(1/2) | q^-1*x1^-1*x2^2*x3+2*q^-1*x1^-1*x2^2*x3^2+q^-2*x1^-1*x2^2*x3^2-x2*x3-2*x2*x3^2-2*x2^2*x3+q^-1*x2^2*x3-2*q*x2^2*x3^2-4*x2^2*x3^2+3*q^-1*x2^2*x3^2-x1*x2*x3-2*x1*x2*x3^2+q^-1*x1*x2*x3^2-2*x1*x2^2*x3+q^-1*x1*x2^2*x3-2*q*x1*x2^2*x3^2-3*x1*x2^2*x3^2+5*q^-1*x1*x2^2*x3^2-x1^2*x2*x3-2*x1^2*x2*x3^2+q^-1*x1^2*x2*x3^2-2*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3-q*x1^2*x2^2*x3^2-3*x1^2*x2^2*x3^2+5*q^-1*x1^2*x2^2*x3^2-q^-3*x1^2*x2^2*x3^2 |
| L10a164{0;1} | 13 | {1,-2,3,1,-2,-3,1,1,2,-3,2,1,1} | [[-1, 1, -1, -1, -1, -1, -1, 1, -1, 1, -1, 1], [1, -1, 1, -1, -1, 1, 1, -1], [-1, -1, 1, -1, 1, 1]] | x1^(1/2) | -q^2*x1*x2-q^2*x1*x2*x3-q^2*x1*x2*x3^2-q^2*x1*x2^2-q^2*x1*x2^2*x3-q*x1*x2^2*x3-q^2*x1*x2^2*x3^2-q*x1*x2^2*x3^2-x1*x2^2*x3^2+q*x1^2*x2*x3^-1-2*q^2*x1^2*x2+q*x1^2*x2-2*q^2*x1^2*x2*x3+q*x1^2*x2*x3-2*q^2*x1^2*x2*x3^2+q*x1^2*x2*x3^2-q^2*x1^2*x2^2*x3^-1+q*x1^2*x2^2*x3^-1+2*q^3*x1^2*x2^2-3*q^2*x1^2*x2^2+x1^2*x2^2+2*q^3*x1^2*x2^2*x3-3*q^2*x1^2*x2^2*x3-2*q*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3+2*q^3*x1^2*x2^2*x3^2-3*q^2*x1^2*x2^2*x3^2-2*q*x1^2*x2^2*x3^2-2*x1^2*x2^2*x3^2+q^-2*x1^2*x2^2*x3^2 |
| L10a164{0;1} | 13 | {1,-2,3,1,-2,-3,1,1,2,-3,2,1,1} | [[-1, 1, 1, 1, 1, 1, 1, 1, -1, 1, -1, 1], [1, -1, 1, -1, -1, 1, 1, -1], [-1, -1, 1, -1, 1, 1]] | x1^(1/2) | q*x1^-1*x2*x3^2+2*q*x1^-1*x2^2*x3^2+x1^-1*x2^2*x3^2-q^2*x2*x3-3*q^2*x2*x3^2-2*q^2*x2^2*x3-8*q^2*x2^2*x3^2-4*q*x2^2*x3^2+2*q^3*x1*x2*x3^2+2*q^3*x1*x2^2*x3+2*q^4*x1*x2^2*x3^2+10*q^3*x1*x2^2*x3^2+4*q^2*x1*x2^2*x3^2-2*q^5*x1^2*x2^2*x3^2-4*q^4*x1^2*x2^2*x3^2-q^3*x1^2*x2^2*x3^2 |
| L10a164{0;1} | 13 | {1,-2,3,1,-2,-3,1,1,2,-3,2,1,1} | [[1, 1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1], [1, 1, 1, -1, -1, 1, 1, 1], [-1, -1, 1, 1, 1, 1]] | x1^(1/2) | -q^2*x1*x2-q^2*x1*x2*x3-q^2*x1*x2*x3^2-q^2*x1*x2^2-q^2*x1*x2^2*x3-q*x1*x2^2*x3-q^2*x1*x2^2*x3^2-q*x1*x2^2*x3^2-x1*x2^2*x3^2+q*x1^2*x2*x3^-1-2*q^2*x1^2*x2+q*x1^2*x2-2*q^2*x1^2*x2*x3+q*x1^2*x2*x3-2*q^2*x1^2*x2*x3^2+q*x1^2*x2*x3^2-q^2*x1^2*x2^2*x3^-1+q*x1^2*x2^2*x3^-1+2*q^3*x1^2*x2^2-3*q^2*x1^2*x2^2+x1^2*x2^2+2*q^3*x1^2*x2^2*x3-3*q^2*x1^2*x2^2*x3-2*q*x1^2*x2^2*x3+q^-1*x1^2*x2^2*x3+2*q^3*x1^2*x2^2*x3^2-3*q^2*x1^2*x2^2*x3^2-2*q*x1^2*x2^2*x3^2-2*x1^2*x2^2*x3^2+q^-2*x1^2*x2^2*x3^2 |
| L10a164{0;1} | 13 | {1,-2,3,1,-2,-3,1,1,2,-3,2,1,1} | [[1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1], [1, 1, 1, -1, -1, 1, 1, 1], [-1, -1, 1, 1, 1, 1]] | x1^(1/2) | q*x1^-1*x2*x3^2+2*q*x1^-1*x2^2*x3^2+x1^-1*x2^2*x3^2-q^2*x2*x3-3*q^2*x2*x3^2-2*q^2*x2^2*x3-8*q^2*x2^2*x3^2-4*q*x2^2*x3^2+2*q^3*x1*x2*x3^2+2*q^3*x1*x2^2*x3+2*q^4*x1*x2^2*x3^2+10*q^3*x1*x2^2*x3^2+4*q^2*x1*x2^2*x3^2-2*q^5*x1^2*x2^2*x3^2-4*q^4*x1^2*x2^2*x3^2-q^3*x1^2*x2^2*x3^2 |
| L10a164{1;0} | 14 | {1,2,-3,-4,-3,2,-1,2,-3,2,2,4,-3,2} | [[-1, 1, 1, 1, 1, 1, 1, 1, -1, -1, 1, -1, -1, -1, -1, -1], [1, 1, 1, -1, 1, 1], [-1, -1, -1, 1, -1, -1]] | x1^(1/2) | -q*x1-q*x1*x3-q*x1*x3^2+q^2*x1*x2*x3+q^3*x1*x2*x3^2+q^2*x1*x2*x3^2-q^4*x1*x2^2*x3^2-q*x1^2*x2^-1*x3^-1-q*x1^2*x2^-1+x1^2*x2^-1-q*x1^2*x2^-1*x3+x1^2*x2^-1*x3-q*x1^2*x2^-1*x3^2+x1^2*x2^-1*x3^2+2*q^2*x1^2*x3^-1+3*q^2*x1^2-q*x1^2+q^3*x1^2*x3+4*q^2*x1^2*x3-2*q*x1^2*x3+q^4*x1^2*x3^2+2*q^3*x1^2*x3^2+3*q^2*x1^2*x3^2-2*q*x1^2*x3^2-2*q^3*x1^2*x2-3*q^4*x1^2*x2*x3-3*q^3*x1^2*x2*x3+q^2*x1^2*x2*x3-q^6*x1^2*x2*x3^2-4*q^5*x1^2*x2*x3^2-5*q^4*x1^2*x2*x3^2-q^3*x1^2*x2*x3^2+q^2*x1^2*x2*x3^2+2*q^5*x1^2*x2^2*x3+3*q^7*x1^2*x2^2*x3^2+3*q^6*x1^2*x2^2*x3^2+3*q^5*x1^2*x2^2*x3^2-q^4*x1^2*x2^2*x3^2 |
| L10a164{1;0} | 14 | {1,2,-3,-4,-3,2,-1,2,-3,2,2,4,-3,2} | [[1, 1, 1, 1, 1, 1, 1, 1, 1, -1, 1, -1, -1, -1, -1, -1], [1, 1, 1, -1, 1, 1], [-1, -1, -1, 1, -1, -1]] | x1^(1/2) | -q*x1-q*x1*x3-q*x1*x3^2+q^2*x1*x2*x3+q^3*x1*x2*x3^2+q^2*x1*x2*x3^2-q^4*x1*x2^2*x3^2-q*x1^2*x2^-1*x3^-1-q*x1^2*x2^-1+x1^2*x2^-1-q*x1^2*x2^-1*x3+x1^2*x2^-1*x3-q*x1^2*x2^-1*x3^2+x1^2*x2^-1*x3^2+2*q^2*x1^2*x3^-1+3*q^2*x1^2-q*x1^2+q^3*x1^2*x3+4*q^2*x1^2*x3-2*q*x1^2*x3+q^4*x1^2*x3^2+2*q^3*x1^2*x3^2+3*q^2*x1^2*x3^2-2*q*x1^2*x3^2-2*q^3*x1^2*x2-3*q^4*x1^2*x2*x3-3*q^3*x1^2*x2*x3+q^2*x1^2*x2*x3-q^6*x1^2*x2*x3^2-4*q^5*x1^2*x2*x3^2-5*q^4*x1^2*x2*x3^2-q^3*x1^2*x2*x3^2+q^2*x1^2*x2*x3^2+2*q^5*x1^2*x2^2*x3+3*q^7*x1^2*x2^2*x3^2+3*q^6*x1^2*x2^2*x3^2+3*q^5*x1^2*x2^2*x3^2-q^4*x1^2*x2^2*x3^2 |
| L10a164{1;1} | 10 | {-1,-1,2,2,-1,2,2,-1,2,2} | [[-1, -1, -1, -1, 1, -1], [-1, -1, -1, 1, -1, -1, -1, 1], [1, -1, 1, -1, 1, -1]] | x2^(1/2) | -q*x1*x2*x3-2*q*x1*x2^2*x3+2*q^2*x1*x2^2*x3^2-q*x1^2*x2*x3+q^2*x1^2*x2*x3^2-2*q*x1^2*x2^2*x3+x1^2*x2^2*x3+4*q^2*x1^2*x2^2*x3^2 |
| L10a164{1;1} | 10 | {-1,-1,2,2,-1,2,2,-1,2,2} | [[1, -1, 1, -1, 1, -1], [-1, 1, -1, 1, -1, 1, -1, 1], [1, -1, 1, -1, 1, -1]] | x2^(1/2) | -q*x1*x2*x3-2*q*x1*x2^2*x3+2*q^2*x1*x2^2*x3^2-q*x1^2*x2*x3+q^2*x1^2*x2*x3^2-2*q*x1^2*x2^2*x3+x1^2*x2^2*x3+4*q^2*x1^2*x2^2*x3^2 |