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	Frobenius Algebra, Vector Spaces and Polynomial Ideals
SandBox Grassmann Algebra Is Frobenius In Many Ways ←	↑	→ SandBox Sedenion Algebra is Frobenius In Just One Way

SandBox Quaternion Algebra is Frobenius in Many Ways

last edited 11 years ago by Bill Page

Edit detail for SandBox Quaternion Algebra is Frobenius in Many Ways revision 13 of 32

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Editor: Bill Page Time: 2011/04/27 18:41:19 GMT-7
Note: three-point function

changed:
-)library MONAL PROP LIN CALEY
-\end{axiom}
)library CARTEN MONAL PROP LIN CALEY
\end{axiom}

changed:
-This expression is expensive to compute::
-
-    λ:𝐋 :=
-         o    Ω Ω  I    /
-         o   I Y I I    /
-         o   I  X  I    /
-         o   I I  Ų     o
-
-\begin{axiom}
-
-λ:𝐋 :=
Compute the "three-point" function and use it to define co-multiplication.
\begin{axiom}
W:=(Y,I)/Ų
λ:=(Ω,I,Ω)/(I,W,I)
\end{axiom}

\begin{axiom}

test

changed:
-     (     Y I    )
     (     Y I    )  =  λ

changed:
-     o    λ    o /
-     o    Y    o
-
-\end{axiom}
         λ     /
         X     /
         Y

\end{axiom}

changed:
-ex1:=[q[1]=1,p[1]=0,p[2]=0,p[3]=0,p[4]=1]
ex1:=[q[1]=1,p[1]=1,p[2]=1,p[3]=1,p[4]=1]

Quaternion Algebra Is Frobenius In Many Ways

Linear operators over a 4-dimensional vector space representing quaternion algebra

Ref:

http://arxiv.org/abs/1103.5113
-permuted Frobenius Algebras

Zbigniew Oziewicz (UNAM), Gregory Peter Wene (UTSA)
http://mat.uab.es/~kock/TQFT.html
Frobenius algebras and 2D topological quantum field theories

Joachim Kock
http://en.wikipedia.org/wiki/Frobenius_algebra

We need the Axiom LinearOperator? library.

axiom

)library CARTEN MONAL PROP LIN CALEY

   CartesianTensor is now explicitly exposed in frame initial 
   CartesianTensor will be automatically loaded when needed from 
      /var/zope2/var/LatexWiki/CARTEN.NRLIB/CARTEN
   Monoidal is now explicitly exposed in frame initial 
   Monoidal will be automatically loaded when needed from 
      /var/zope2/var/LatexWiki/MONAL.NRLIB/MONAL
   Prop is now explicitly exposed in frame initial 
   Prop will be automatically loaded when needed from 
      /var/zope2/var/LatexWiki/PROP.NRLIB/PROP
   LinearOperator is now explicitly exposed in frame initial 
   LinearOperator will be automatically loaded when needed from 
      /var/zope2/var/LatexWiki/LIN.NRLIB/LIN
   CaleyDickson is now explicitly exposed in frame initial 
   CaleyDickson will be automatically loaded when needed from 
      /var/zope2/var/LatexWiki/CALEY.NRLIB/CALEY

Use the following macros for convenient notation

axiom

-- summation
macro Σ(x,i,n)==reduce(+,[x for i in n])

Type: Void

axiom

-- list
macro Ξ(f,i,n)==[f for i in n]

Type: Void

axiom

-- subscript
macro sb == subscript

Type: Void

𝐋 is the domain of 4-dimensional linear operators over the rational functions ℚ (Expression Integer), i.e. ratio of polynomials with integer coefficients.

axiom

dim:=4

$\label{eq1}4$

(1)

Type: PositiveInteger?

axiom

macro ℒ == List

Type: Void

axiom

macro ℂ == CaleyDickson

Type: Void

axiom

macro ℚ == Expression Integer

Type: Void

axiom

𝐋 := LinearOperator(dim, OVAR [], ℚ)

$\label{eq2}\hbox{\axiomType{LinearOperator}\ } (4, \hbox{\axiomType{OrderedVariableList}\ } ([ ]) , \hbox{\axiomType{Expression}\ } (\hbox{\axiomType{Integer}\ }))$

(2)

Type: Type

axiom

𝐞:ℒ 𝐋      := basisVectors()

$\label{eq3}\left[{|_{1}}, \:{|_{2}}, \:{|_{3}}, \:{|_{4}}\right]$

(3)

Type: List(LinearOperator?(4,OrderedVariableList?([]),Expression(Integer)))

axiom

𝐝:ℒ 𝐋      := basisForms()

$\label{eq4}\left[{|_{\ }^{1}}, \:{|_{\ }^{2}}, \:{|_{\ }^{3}}, \:{|_{\ }^{4}}\right]$

(4)

Type: List(LinearOperator?(4,OrderedVariableList?([]),Expression(Integer)))

axiom

o:𝐋:=1     -- identity for product

$\label{eq5}1$

(5)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

I:𝐋:=[1]   -- identity for composition

$\label{eq6}{|_{1}^{1}}+{|_{2}^{2}}+{|_{3}^{3}}+{|_{4}^{4}}$

(6)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

X:𝐋:=[2,1] -- twist

$\label{eq7}\begin{array}{@{}l} \displaystyle {|_{1 \ 1}^{1 \ 1}}+{|_{2 \ 1}^{1 \ 2}}+{|_{3 \ 1}^{1 \ 3}}+{|_{4 \ 1}^{1 \ 4}}+{|_{1 \ 2}^{2 \ 1}}+{|_{2 \ 2}^{2 \ 2}}+ \ \ \displaystyle {|_{3 \ 2}^{2 \ 3}}+{|_{4 \ 2}^{2 \ 4}}+{|_{1 \ 3}^{3 \ 1}}+{|_{2 \ 3}^{3 \ 2}}+{|_{3 \ 3}^{3 \ 3}}+{|_{4 \ 3}^{3 \ 4}}+ \ \ \displaystyle {|_{1 \ 4}^{4 \ 1}}+{|_{2 \ 4}^{4 \ 2}}+{|_{3 \ 4}^{4 \ 3}}+{|_{4 \ 4}^{4 \ 4}}$

(7)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

Now generate structure constants for Quaternion Algebra

The basis consists of the real and imaginary units. We use quaternion multiplication to form the "multiplication table" as a matrix. Then the structure constants can be obtained by dividing each matrix entry by the list of basis vectors.

Split-complex and co-quaternions can be specified by Caley-Dickson parameters (q0 = -1, q1 = -1)

axiom

--q0:=sb('q,[0])
q0:=1  -- not split-complex

$\label{eq8}1$

(8)

Type: PositiveInteger?

axiom

q1:=sb('q,[1])

$\label{eq9}q_{1}$

(9)

Type: Symbol

axiom

--q1:=1  -- co-quaternion
QQ := ℂ(ℂ(ℚ,'i,q0),'j,q1);

Type: Type

Basis: Each B.i is a quaternion number

axiom

B:ℒ QQ := map(x +-> hyper x,1$SQMATRIX(dim,ℚ)::ℒ ℒ ℚ)

$\label{eq10}\left[ 1, \: i , \: j , \:{ij}\right]$

(10)

Type: List(CaleyDickson?(CaleyDickson?(Expression(Integer),i,1),j,*01q(1)))

axiom

-- Multiplication table:
M:Matrix QQ := matrix Ξ(Ξ(B.i*B.j, i,1..dim), j,1..dim)

$\label{eq11}\left[ \begin{array}{cccc} 1 & i & j &{ij} \ i & - 1 & -{ij}& j \ j &{ij}& -{q_{1}}&{-{q_{1}}i} \ {ij}& - j &{{q_{1}}i}& -{q_{1}}$

(11)

Type: Matrix(CaleyDickson?(CaleyDickson?(Expression(Integer),i,1),j,*01q(1)))

axiom

-- Function to divide the matrix entries by a basis element
S(y) == map(x +-> real real(x/y),M)

Type: Void

axiom

-- The result is a nested list
ѕ :=map(S,B)::ℒ ℒ ℒ ℚ

axiom

Compiling function S with type CaleyDickson(CaleyDickson(Expression(
      Integer),i,1),j,*01q(1)) -> Matrix(Expression(Integer))

$\label{eq12}\begin{array}{@{}l} \displaystyle \left[{\left[{\left[ 1, \: 0, \: 0, \: 0 \right]}, \:{\left[ 0, \: - 1, \: 0, \: 0 \right]}, \:{\left[ 0, \: 0, \: -{q_{1}}, \: 0 \right]}, \:{\left[ 0, \: 0, \: 0, \: -{q_{1}}\right]}\right]}, \: \right. \ \ \displaystyle \left.{\left[{\left[ 0, \: 1, \: 0, \: 0 \right]}, \:{\left[ 1, \: 0, \: 0, \: 0 \right]}, \:{\left[ 0, \: 0, \: 0, \: -{q_{1}}\right]}, \:{\left[ 0, \: 0, \:{q_{1}}, \: 0 \right]}\right]}, \: \right. \ \ \displaystyle \left.{\left[{\left[ 0, \: 0, \: 1, \: 0 \right]}, \:{\left[ 0, \: 0, \: 0, \: 1 \right]}, \:{\left[ 1, \: 0, \: 0, \: 0 \right]}, \:{\left[ 0, \: - 1, \: 0, \: 0 \right]}\right]}, \: \right. \ \ \displaystyle \left.{\left[{\left[ 0, \: 0, \: 0, \: 1 \right]}, \:{\left[ 0, \: 0, \: - 1, \: 0 \right]}, \:{\left[ 0, \: 1, \: 0, \: 0 \right]}, \:{\left[ 1, \: 0, \: 0, \: 0 \right]}\right]}\right]$

(12)

Type: List(List(List(Expression(Integer))))

axiom

-- structure constants form a tensor operator
Y := Σ(Σ(Σ(ѕ(i)(k)(j)*𝐞.i*𝐝.j*𝐝.k, i,1..dim), j,1..dim), k,1..dim)

$\label{eq13}\begin{array}{@{}l} \displaystyle {|_{1}^{1 \ 1}}+{|_{2}^{1 \ 2}}+{|_{3}^{1 \ 3}}+{|_{4}^{1 \ 4}}+{|_{2}^{2 \ 1}}-{|_{1}^{2 \ 2}}+{|_{4}^{2 \ 3}}-{|_{3}^{2 \ 4}}+ \ \ \displaystyle {|_{3}^{3 \ 1}}-{|_{4}^{3 \ 2}}-{{q_{1}}\ {|_{1}^{3 \ 3}}}+{{q_{1}}\ {|_{2}^{3 \ 4}}}+{|_{4}^{4 \ 1}}+{|_{3}^{4 \ 2}}-{{q_{1}}\ {|_{2}^{4 \ 3}}}- \ \ \displaystyle {{q_{1}}\ {|_{1}^{4 \ 4}}}$

(13)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

arity Y

$\label{eq14}2 \over 1$

(14)

Type: Prop(LinearOperator?(4,OrderedVariableList?([]),Expression(Integer)))

axiom

matrix Ξ(Ξ((𝐞.i*𝐞.j)/Y, i,1..dim), j,1..dim)

$\label{eq15}\left[ \begin{array}{cccc} {|_{1}}&{|_{2}}&{|_{3}}&{|_{4}} \ {|_{2}}& -{|_{1}}& -{|_{4}}&{|_{3}} \ {|_{3}}&{|_{4}}& -{{q_{1}}\ {|_{1}}}& -{{q_{1}}\ {|_{2}}} \ {|_{4}}& -{|_{3}}&{{q_{1}}\ {|_{2}}}& -{{q_{1}}\ {|_{1}}}$

(15)

Type: Matrix(LinearOperator?(4,OrderedVariableList?([]),Expression(Integer)))

Multiplication of arbitrary quaternions and

axiom

a:=Σ(sb('a,[i])*𝐞.i, i,1..dim)

$\label{eq16}{{a_{1}}\ {|_{1}}}+{{a_{2}}\ {|_{2}}}+{{a_{3}}\ {|_{3}}}+{{a_{4}}\ {|_{4}}}$

(16)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

b:=Σ(sb('b,[i])*𝐞.i, i,1..dim)

$\label{eq17}{{b_{1}}\ {|_{1}}}+{{b_{2}}\ {|_{2}}}+{{b_{3}}\ {|_{3}}}+{{b_{4}}\ {|_{4}}}$

(17)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

(a*b)/Y

$\label{eq18}\begin{array}{@{}l} \displaystyle {{\left({{\left(-{{a_{4}}\ {b_{4}}}-{{a_{3}}\ {b_{3}}}\right)}\ {q_{1}}}-{{a_{2}}\ {b_{2}}}+{{a_{1}}\ {b_{1}}}\right)}\ {|_{1}}}+ \ \ \displaystyle {{\left({{\left({{a_{3}}\ {b_{4}}}-{{a_{4}}\ {b_{3}}}\right)}\ {q_{1}}}+{{a_{1}}\ {b_{2}}}+{{a_{2}}\ {b_{1}}}\right)}\ {|_{2}}}+ \ \ \displaystyle {{\left(-{{a_{2}}\ {b_{4}}}+{{a_{1}}\ {b_{3}}}+{{a_{4}}\ {b_{2}}}+{{a_{3}}\ {b_{1}}}\right)}\ {|_{3}}}+ \ \ \displaystyle {{\left({{a_{1}}\ {b_{4}}}+{{a_{2}}\ {b_{3}}}-{{a_{3}}\ {b_{2}}}+{{a_{4}}\ {b_{1}}}\right)}\ {|_{4}}}$

(18)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

A scalar product is denoted by the (2,0)-tensor $U = \{ u_{ij} \}$

axiom

U:=Σ(Σ(script('u,[[],[i,j]])*𝐝.i*𝐝.j, i,1..dim), j,1..dim)

$\label{eq19}\begin{array}{@{}l} \displaystyle {{u^{1, \: 1}}\ {|_{\ }^{1 \ 1}}}+{{u^{1, \: 2}}\ {|_{\ }^{1 \ 2}}}+{{u^{1, \: 3}}\ {|_{\ }^{1 \ 3}}}+{{u^{1, \: 4}}\ {|_{\ }^{1 \ 4}}}+ \ \ \displaystyle {{u^{2, \: 1}}\ {|_{\ }^{2 \ 1}}}+{{u^{2, \: 2}}\ {|_{\ }^{2 \ 2}}}+{{u^{2, \: 3}}\ {|_{\ }^{2 \ 3}}}+{{u^{2, \: 4}}\ {|_{\ }^{2 \ 4}}}+ \ \ \displaystyle {{u^{3, \: 1}}\ {|_{\ }^{3 \ 1}}}+{{u^{3, \: 2}}\ {|_{\ }^{3 \ 2}}}+{{u^{3, \: 3}}\ {|_{\ }^{3 \ 3}}}+{{u^{3, \: 4}}\ {|_{\ }^{3 \ 4}}}+ \ \ \displaystyle {{u^{4, \: 1}}\ {|_{\ }^{4 \ 1}}}+{{u^{4, \: 2}}\ {|_{\ }^{4 \ 2}}}+{{u^{4, \: 3}}\ {|_{\ }^{4 \ 3}}}+{{u^{4, \: 4}}\ {|_{\ }^{4 \ 4}}}$

(19)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

Definition 1

We say that the scalar product is associative if the tensor equation holds:

    Y   =   Y
     U     U

In other words, if the (3,0)-tensor:

$\scalebox{1} % Change this value to rescale the drawing. { \begin{pspicture}(0,-0.92)(4.82,0.92) \psbezier[linewidth=0.04](2.2,0.9)(2.2,0.1)(2.6,0.1)(2.6,0.9) \psline[linewidth=0.04cm](2.4,0.3)(2.4,-0.1) \psbezier[linewidth=0.04](2.4,-0.1)(2.4,-0.9)(3.0,-0.9)(3.0,-0.1) \psline[linewidth=0.04cm](3.0,-0.1)(3.0,0.9) \psbezier[linewidth=0.04](4.8,0.9)(4.8,0.1)(4.4,0.1)(4.4,0.9) \psline[linewidth=0.04cm](4.6,0.3)(4.6,-0.1) \psbezier[linewidth=0.04](4.6,-0.1)(4.6,-0.9)(4.0,-0.9)(4.0,-0.1) \psline[linewidth=0.04cm](4.0,-0.1)(4.0,0.9) \usefont{T1}{ptm}{m}{n} \rput(3.4948437,0.205){-} \psline[linewidth=0.04cm](0.6,-0.7)(0.6,0.9) \psbezier[linewidth=0.04](0.0,-0.1)(0.0,-0.9)(1.2,-0.9)(1.2,-0.1) \psline[linewidth=0.04cm](0.0,-0.1)(0.0,0.9) \psline[linewidth=0.04cm](1.2,-0.1)(1.2,0.9) \usefont{T1}{ptm}{m}{n} \rput(1.6948438,0.205){=} \end{pspicture} }$

$\label{eq20} \Phi = \{ \phi^{ijk} = {y^e}_{ij} u_{ek} - u_{ie} {y_e}^{jk} \}$

(20)

(three-point function) is zero.

Using the LinearOperator? domain in Axiom and some carefully chosen symbols we can easily enter expressions that are both readable and interpreted by Axiom as "graphical calculus" diagrams describing complex products and compositions of linear operators.

axiom

ω:𝐋 :=
     o    Y I      /
     o     U       -
     o    I Y      /
     o     U       o

$\label{eq21}\begin{array}{@{}l} \displaystyle {{\left({u^{2, \: 1}}-{u^{1, \: 2}}\right)}\ {|_{\ }^{1 \ 2 \ 1}}}+{{\left({u^{2, \: 2}}+{u^{1, \: 1}}\right)}\ {|_{\ }^{1 \ 2 \ 2}}}+ \ \ \displaystyle {{\left({u^{2, \: 3}}-{u^{1, \: 4}}\right)}\ {|_{\ }^{1 \ 2 \ 3}}}+{{\left({u^{2, \: 4}}+{u^{1, \: 3}}\right)}\ {|_{\ }^{1 \ 2 \ 4}}}+ \ \ \displaystyle {{\left({u^{3, \: 1}}-{u^{1, \: 3}}\right)}\ {|_{\ }^{1 \ 3 \ 1}}}+{{\left({u^{3, \: 2}}+{u^{1, \: 4}}\right)}\ {|_{\ }^{1 \ 3 \ 2}}}+ \ \ \displaystyle {{\left({{u^{1, \: 1}}\ {q_{1}}}+{u^{3, \: 3}}\right)}\ {|_{\ }^{1 \ 3 \ 3}}}+{{\left(-{{u^{1, \: 2}}\ {q_{1}}}+{u^{3, \: 4}}\right)}\ {|_{\ }^{1 \ 3 \ 4}}}+ \ \ \displaystyle {{\left({u^{4, \: 1}}-{u^{1, \: 4}}\right)}\ {|_{\ }^{1 \ 4 \ 1}}}+{{\left({u^{4, \: 2}}-{u^{1, \: 3}}\right)}\ {|_{\ }^{1 \ 4 \ 2}}}+ \ \ \displaystyle {{\left({{u^{1, \: 2}}\ {q_{1}}}+{u^{4, \: 3}}\right)}\ {|_{\ }^{1 \ 4 \ 3}}}+{{\left({{u^{1, \: 1}}\ {q_{1}}}+{u^{4, \: 4}}\right)}\ {|_{\ }^{1 \ 4 \ 4}}}+ \ \ \displaystyle {{\left(-{u^{2, \: 2}}-{u^{1, \: 1}}\right)}\ {|_{\ }^{2 \ 2 \ 1}}}+{{\left({u^{2, \: 1}}-{u^{1, \: 2}}\right)}\ {|_{\ }^{2 \ 2 \ 2}}}+ \ \ \displaystyle {{\left(-{u^{2, \: 4}}-{u^{1, \: 3}}\right)}\ {|_{\ }^{2 \ 2 \ 3}}}+{{\left({u^{2, \: 3}}-{u^{1, \: 4}}\right)}\ {|_{\ }^{2 \ 2 \ 4}}}+ \ \ \displaystyle {{\left({u^{4, \: 1}}-{u^{2, \: 3}}\right)}\ {|_{\ }^{2 \ 3 \ 1}}}+{{\left({u^{4, \: 2}}+{u^{2, \: 4}}\right)}\ {|_{\ }^{2 \ 3 \ 2}}}+ \ \ \displaystyle {{\left({{u^{2, \: 1}}\ {q_{1}}}+{u^{4, \: 3}}\right)}\ {|_{\ }^{2 \ 3 \ 3}}}+{{\left(-{{u^{2, \: 2}}\ {q_{1}}}+{u^{4, \: 4}}\right)}\ {|_{\ }^{2 \ 3 \ 4}}}+ \ \ \displaystyle {{\left(-{u^{3, \: 1}}-{u^{2, \: 4}}\right)}\ {|_{\ }^{2 \ 4 \ 1}}}+{{\left(-{u^{3, \: 2}}-{u^{2, \: 3}}\right)}\ {|_{\ }^{2 \ 4 \ 2}}}+ \ \ \displaystyle {{\left({{u^{2, \: 2}}\ {q_{1}}}-{u^{3, \: 3}}\right)}\ {|_{\ }^{2 \ 4 \ 3}}}+{{\left({{u^{2, \: 1}}\ {q_{1}}}-{u^{3, \: 4}}\right)}\ {|_{\ }^{2 \ 4 \ 4}}}+ \ \ \displaystyle {{\left(-{u^{4, \: 1}}-{u^{3, \: 2}}\right)}\ {|_{\ }^{3 \ 2 \ 1}}}+{{\left(-{u^{4, \: 2}}+{u^{3, \: 1}}\right)}\ {|_{\ }^{3 \ 2 \ 2}}}+ \ \ \displaystyle {{\left(-{u^{4, \: 3}}-{u^{3, \: 4}}\right)}\ {|_{\ }^{3 \ 2 \ 3}}}+{{\left(-{u^{4, \: 4}}+{u^{3, \: 3}}\right)}\ {|_{\ }^{3 \ 2 \ 4}}}+ \ \ \displaystyle {{\left(-{{u^{1, \: 1}}\ {q_{1}}}-{u^{3, \: 3}}\right)}\ {|_{\ }^{3 \ 3 \ 1}}}+{{\left(-{{u^{1, \: 2}}\ {q_{1}}}+{u^{3, \: 4}}\right)}\ {|_{\ }^{3 \ 3 \ 2}}}+ \ \ \displaystyle {{\left({u^{3, \: 1}}-{u^{1, \: 3}}\right)}\ {q_{1}}\ {|_{\ }^{3 \ 3 \ 3}}}+{{\left(-{u^{3, \: 2}}-{u^{1, \: 4}}\right)}\ {q_{1}}\ {|_{\ }^{3 \ 3 \ 4}}}+ \ \ \displaystyle {{\left({{u^{2, \: 1}}\ {q_{1}}}-{u^{3, \: 4}}\right)}\ {|_{\ }^{3 \ 4 \ 1}}}+{{\left({{u^{2, \: 2}}\ {q_{1}}}-{u^{3, \: 3}}\right)}\ {|_{\ }^{3 \ 4 \ 2}}}+ \ \ \displaystyle {{\left({u^{3, \: 2}}+{u^{2, \: 3}}\right)}\ {q_{1}}\ {|_{\ }^{3 \ 4 \ 3}}}+{{\left({u^{3, \: 1}}+{u^{2, \: 4}}\right)}\ {q_{1}}\ {|_{\ }^{3 \ 4 \ 4}}}+ \ \ \displaystyle {{\left(-{u^{4, \: 2}}+{u^{3, \: 1}}\right)}\ {|_{\ }^{4 \ 2 \ 1}}}+{{\left({u^{4, \: 1}}+{u^{3, \: 2}}\right)}\ {|_{\ }^{4 \ 2 \ 2}}}+ \ \ \displaystyle {{\left(-{u^{4, \: 4}}+{u^{3, \: 3}}\right)}\ {|_{\ }^{4 \ 2 \ 3}}}+{{\left({u^{4, \: 3}}+{u^{3, \: 4}}\right)}\ {|_{\ }^{4 \ 2 \ 4}}}+ \ \ \displaystyle {{\left(-{{u^{2, \: 1}}\ {q_{1}}}-{u^{4, \: 3}}\right)}\ {|_{\ }^{4 \ 3 \ 1}}}+{{\left(-{{u^{2, \: 2}}\ {q_{1}}}+{u^{4, \: 4}}\right)}\ {|_{\ }^{4 \ 3 \ 2}}}+ \ \ \displaystyle {{\left({u^{4, \: 1}}-{u^{2, \: 3}}\right)}\ {q_{1}}\ {|_{\ }^{4 \ 3 \ 3}}}+{{\left(-{u^{4, \: 2}}-{u^{2, \: 4}}\right)}\ {q_{1}}\ {|_{\ }^{4 \ 3 \ 4}}}+ \ \ \displaystyle {{\left(-{{u^{1, \: 1}}\ {q_{1}}}-{u^{4, \: 4}}\right)}\ {|_{\ }^{4 \ 4 \ 1}}}+{{\left(-{{u^{1, \: 2}}\ {q_{1}}}-{u^{4, \: 3}}\right)}\ {|_{\ }^{4 \ 4 \ 2}}}+ \ \ \displaystyle {{\left({u^{4, \: 2}}-{u^{1, \: 3}}\right)}\ {q_{1}}\ {|_{\ }^{4 \ 4 \ 3}}}+{{\left({u^{4, \: 1}}-{u^{1, \: 4}}\right)}\ {q_{1}}\ {|_{\ }^{4 \ 4 \ 4}}}$

(21)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

Note: The only purpose of the o symbols on the left above is to serve as a constant left-side margin as required by Axiom. The symbols on the right describe the relation between row.

Definition 2

An algebra with a non-degenerate associative scalar product is called a [Frobenius Algebra]?.

We may consider the problem where multiplication Y is given, and look for all associative scalar products

This problem can be solved using linear algebra.

axiom

)expose MCALCFN

   MultiVariableCalculusFunctions is now explicitly exposed in frame 
      initial 
J := jacobian(ravel ω,concat map(variables,ravel U)::ℒ Symbol);

Type: Matrix(Expression(Integer))

axiom

u := transpose matrix [concat map(variables,ravel U)::ℒ Symbol];

Type: Matrix(Polynomial(Integer))

axiom

J::OutputForm * u::OutputForm = 0

$\label{eq22}\begin{array}{@{}l} \displaystyle {{\left[ \begin{array}{cccccccccccccccc} 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & - 1 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 1 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & - 1 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 1 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 \ {q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 \ 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 \ 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 \ 0 &{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 \ {q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ - 1 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & - 1 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & - 1 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & - 1 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 \ 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 \ 0 & 0 & 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & - 1 & - 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & - 1 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & - 1 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & - 1 \ -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 \ 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 \ 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0 & 0 & - 1 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 &{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 &{q_{1}}&{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & - 1 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 1 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 & - 1 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 & 1 & 0 \ 0 & 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 \ 0 & 0 & 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 1 \ 0 & 0 & 0 & 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & -{q_{1}}& 0 & 0 \ -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & - 1 \ 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & - 1 & 0 \ 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 \ 0 & 0 & 0 & -{q_{1}}& 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 &{q_{1}}& 0 & 0 & 0$

(22)

Type: Equation(OutputForm?)

axiom

nrows(J),ncols(J)

$\label{eq23}\left[{64}, \:{16}\right]$

(23)

Type: Tuple(PositiveInteger?)

The matrix J transforms the coefficients of the tensor into coefficients of the tensor $\Phi$ . We are looking for the general linear family of tensors such that J transforms into $\Phi=0$ for any such .

If the null space of the J matrix is not empty we can use the basis to find all non-trivial solutions for U:

axiom

Ñ:=nullSpace(J)

$\label{eq24}\begin{array}{@{}l} \displaystyle \left[{\left[ 0, \: 0, \: 0, \: 1, \: 0, \: 0, \: 1, \: 0, \: 0, \: - 1, \: 0, \: 0, \: 1, \: 0, \: 0, \: 0 \right]}, \: \right. \ \ \displaystyle \left.{\left[ 0, \: 0, \: 1, \: 0, \: 0, \: 0, \: 0, \: - 1, \: 1, \: 0, \: 0, \: 0, \: 0, \: 1, \: 0, \: 0 \right]}, \: \right. \ \ \displaystyle \left.{\left[ 0, \: -{1 \over{q_{1}}}, \: 0, \: 0, \: -{1 \over{q_{1}}}, \: 0, \: 0, \: 0, \: 0, \: 0, \: 0, \: - 1, \: 0, \: 0, \: 1, \: 0 \right]}, \: \right. \ \ \displaystyle \left.{\left[ -{1 \over{q_{1}}}, \: 0, \: 0, \: 0, \: 0, \:{1 \over{q_{1}}}, \: 0, \: 0, \: 0, \: 0, \: 1, \: 0, \: 0, \: 0, \: 0, \: 1 \right]}\right]$

(24)

Type: List(Vector(Expression(Integer)))

axiom

ℰ:=map((x,y)+->x=y, concat
       map(variables,ravel U), entries Σ(sb('p,[i])*Ñ.i, i,1..#Ñ) )

$\label{eq25}\begin{array}{@{}l} \displaystyle \left[{{u^{1, \: 1}}= -{{p_{4}}\over{q_{1}}}}, \:{{u^{1, \: 2}}= -{{p_{3}}\over{q_{1}}}}, \:{{u^{1, \: 3}}={p_{2}}}, \:{{u^{1, \: 4}}={p_{1}}}, \: \right. \ \ \displaystyle \left.{{u^{2, \: 1}}= -{{p_{3}}\over{q_{1}}}}, \:{{u^{2, \: 2}}={{p_{4}}\over{q_{1}}}}, \:{{u^{2, \: 3}}={p_{1}}}, \:{{u^{2, \: 4}}= -{p_{2}}}, \: \right. \ \ \displaystyle \left.{{u^{3, \: 1}}={p_{2}}}, \:{{u^{3, \: 2}}= -{p_{1}}}, \:{{u^{3, \: 3}}={p_{4}}}, \:{{u^{3, \: 4}}= -{p_{3}}}, \: \right. \ \ \displaystyle \left.{{u^{4, \: 1}}={p_{1}}}, \:{{u^{4, \: 2}}={p_{2}}}, \:{{u^{4, \: 3}}={p_{3}}}, \:{{u^{4, \: 4}}={p_{4}}}\right]$

(25)

Type: List(Equation(Expression(Integer)))

This defines a family of pre-Frobenius algebras:

axiom

zero? eval(ω,ℰ)

$\label{eq26} \mbox{\rm true}$

(26)

Type: Boolean

In general the pairing is not symmetric!

axiom

Ų:𝐋 := eval(U,ℰ)

$\label{eq27}\begin{array}{@{}l} \displaystyle -{{{p_{4}}\over{q_{1}}}\ {|_{\ }^{1 \ 1}}}-{{{p_{3}}\over{q_{1}}}\ {|_{\ }^{1 \ 2}}}+{{p_{2}}\ {|_{\ }^{1 \ 3}}}+{{p_{1}}\ {|_{\ }^{1 \ 4}}}-{{{p_{3}}\over{q_{1}}}\ {|_{\ }^{2 \ 1}}}+ \ \ \displaystyle {{{p_{4}}\over{q_{1}}}\ {|_{\ }^{2 \ 2}}}+{{p_{1}}\ {|_{\ }^{2 \ 3}}}-{{p_{2}}\ {|_{\ }^{2 \ 4}}}+{{p_{2}}\ {|_{\ }^{3 \ 1}}}-{{p_{1}}\ {|_{\ }^{3 \ 2}}}+{{p_{4}}\ {|_{\ }^{3 \ 3}}}- \ \ \displaystyle {{p_{3}}\ {|_{\ }^{3 \ 4}}}+{{p_{1}}\ {|_{\ }^{4 \ 1}}}+{{p_{2}}\ {|_{\ }^{4 \ 2}}}+{{p_{3}}\ {|_{\ }^{4 \ 3}}}+{{p_{4}}\ {|_{\ }^{4 \ 4}}}$

(27)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

matrix Ξ(Ξ((𝐞.i 𝐞.j)/Ų, i,1..dim), j,1..dim)

$\label{eq28}\left[ \begin{array}{cccc} -{{p_{4}}\over{q_{1}}}& -{{p_{3}}\over{q_{1}}}&{p_{2}}&{p_{1}} \ -{{p_{3}}\over{q_{1}}}&{{p_{4}}\over{q_{1}}}& -{p_{1}}&{p_{2}} \ {p_{2}}&{p_{1}}&{p_{4}}&{p_{3}} \ {p_{1}}& -{p_{2}}& -{p_{3}}&{p_{4}}$

(28)

Type: Matrix(LinearOperator?(4,OrderedVariableList?([]),Expression(Integer)))

This is the most general form of the "dot product" of two quaternions

axiom

(a*b)/Ų

$\label{eq29}{\left( \begin{array}{@{}l} \displaystyle {{\left({ \begin{array}{@{}l} \displaystyle {{\left({{a_{4}}\ {b_{4}}}+{{a_{3}}\ {b_{3}}}\right)}\ {p_{4}}}+{{\left(-{{a_{3}}\ {b_{4}}}+{{a_{4}}\ {b_{3}}}\right)}\ {p_{3}}}+ \ \ \displaystyle {{\left(-{{a_{2}}\ {b_{4}}}+{{a_{1}}\ {b_{3}}}+{{a_{4}}\ {b_{2}}}+{{a_{3}}\ {b_{1}}}\right)}\ {p_{2}}}+ \ \ \displaystyle {{\left({{a_{1}}\ {b_{4}}}+{{a_{2}}\ {b_{3}}}-{{a_{3}}\ {b_{2}}}+{{a_{4}}\ {b_{1}}}\right)}\ {p_{1}}}$

(29)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

(a*a)/Ų

$\label{eq30}{\left( \begin{array}{@{}l} \displaystyle {{\left({{\left({{a_{4}}^2}+{{a_{3}}^2}\right)}\ {p_{4}}}+{2 \ {a_{1}}\ {a_{3}}\ {p_{2}}}+{2 \ {a_{1}}\ {a_{4}}\ {p_{1}}}\right)}\ {q_{1}}}+ \ \ \displaystyle {{\left({{a_{2}}^2}-{{a_{1}}^2}\right)}\ {p_{4}}}-{2 \ {a_{1}}\ {a_{2}}\ {p_{3}}}$

(30)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

The scalar product must be non-degenerate:

axiom

Ů:=determinant Ξ(Ξ(retract((𝐞.i * 𝐞.j)/Ų), j,1..dim), i,1..dim)

$\label{eq31}{\left( \begin{array}{@{}l} \displaystyle {{\left(-{{p_{2}}^4}-{2 \ {{p_{1}}^2}\ {{p_{2}}^2}}-{{p_{1}}^4}\right)}\ {{q_{1}}^2}}+ \ \ \displaystyle {{\left({{\left(-{2 \ {{p_{2}}^2}}-{2 \ {{p_{1}}^2}}\right)}\ {{p_{4}}^2}}+{{\left(-{2 \ {{p_{2}}^2}}-{2 \ {{p_{1}}^2}}\right)}\ {{p_{3}}^2}}\right)}\ {q_{1}}}- \ \ \displaystyle {{p_{4}}^4}-{2 \ {{p_{3}}^2}\ {{p_{4}}^2}}-{{p_{3}}^4}$

(31)

Type: Expression(Integer)

axiom

factor Ů

$\label{eq32}{\left( \begin{array}{@{}l} \displaystyle {{\left(-{{p_{2}}^4}-{2 \ {{p_{1}}^2}\ {{p_{2}}^2}}-{{p_{1}}^4}\right)}\ {{q_{1}}^2}}+ \ \ \displaystyle {{\left({{\left(-{2 \ {{p_{2}}^2}}-{2 \ {{p_{1}}^2}}\right)}\ {{p_{4}}^2}}+{{\left(-{2 \ {{p_{2}}^2}}-{2 \ {{p_{1}}^2}}\right)}\ {{p_{3}}^2}}\right)}\ {q_{1}}}- \ \ \displaystyle {{p_{4}}^4}-{2 \ {{p_{3}}^2}\ {{p_{4}}^2}}-{{p_{3}}^4}$

(32)

Type: Factored(Expression(Integer))

Definition 3

Co-pairing

Solve the [Snake Relation]? as a system of linear equations.

axiom

Ω:𝐋:=Σ(Σ(script('u,[[i,j]])*𝐞.i*𝐞.j, i,1..dim), j,1..dim)

$\label{eq33}\begin{array}{@{}l} \displaystyle {{u_{1, \: 1}}\ {|_{1 \ 1}}}+{{u_{1, \: 2}}\ {|_{1 \ 2}}}+{{u_{1, \: 3}}\ {|_{1 \ 3}}}+{{u_{1, \: 4}}\ {|_{1 \ 4}}}+{{u_{2, \: 1}}\ {|_{2 \ 1}}}+ \ \ \displaystyle {{u_{2, \: 2}}\ {|_{2 \ 2}}}+{{u_{2, \: 3}}\ {|_{2 \ 3}}}+{{u_{2, \: 4}}\ {|_{2 \ 4}}}+{{u_{3, \: 1}}\ {|_{3 \ 1}}}+{{u_{3, \: 2}}\ {|_{3 \ 2}}}+ \ \ \displaystyle {{u_{3, \: 3}}\ {|_{3 \ 3}}}+{{u_{3, \: 4}}\ {|_{3 \ 4}}}+{{u_{4, \: 1}}\ {|_{4 \ 1}}}+{{u_{4, \: 2}}\ {|_{4 \ 2}}}+{{u_{4, \: 3}}\ {|_{4 \ 3}}}+ \ \ \displaystyle {{u_{4, \: 4}}\ {|_{4 \ 4}}}$

(33)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

d1:=(I*Ω)/(Ų*I);

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

d2:=(Ω*I)/(I*Ų);

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

equate(f,g)==map((x,y)+->(x=y),ravel f, ravel g);

Type: Void

axiom

eq1:=equate(d1,I);

axiom

Compiling function equate with type (LinearOperator(4,
      OrderedVariableList([]),Expression(Integer)),LinearOperator(4,
      OrderedVariableList([]),Expression(Integer))) -> List(Equation(
      Expression(Integer)))

Type: List(Equation(Expression(Integer)))

axiom

eq2:=equate(d2,I);

Type: List(Equation(Expression(Integer)))

axiom

snake:=solve(concat(eq1,eq2),concat Ξ(Ξ(script('u,[[i,j]]), i,1..dim), j,1..dim));

Type: List(List(Equation(Expression(Integer))))

axiom

if #snake ~= 1 then error "no solution"

Type: Void

axiom

Ω:=eval(Ω,snake(1))

$\label{eq34}\begin{array}{@{}l} \displaystyle -{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}}}+ \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}}}- \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}}}+ \ \ \displaystyle {{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}}}+ \ \ \displaystyle {{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}}}- \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}}}- \ \ \displaystyle {{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}}}+ \ \ \displaystyle {{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}}}$

(34)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

matrix Ξ(Ξ(Ω/(𝐝.i*𝐝.j), i,1..dim), j,1..dim)

$\label{eq35}\left[ \begin{array}{cccc} -{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}& -{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}} \ -{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}& -{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}} \ {{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}& -{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}& -{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}} \ {{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}&{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}$

(35)

Type: Matrix(LinearOperator?(4,OrderedVariableList?([]),Expression(Integer)))

Check "dimension" and the snake relations.

axiom

d:𝐋:=
    o   Ω    /
    o   X    /
    o   Ų    o

$\label{eq36}4$

(36)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

test
    (    I Ω     )  /
    (     Ų I    )  =  I

$\label{eq37} \mbox{\rm true}$

(37)

Type: Boolean

axiom

test
    (     Ω I    )  /
    (    I Ų     )  =  I

$\label{eq38} \mbox{\rm true}$

(38)

Type: Boolean

Definition 4

Co-algebra

Compute the "three-point" function and use it to define co-multiplication.

axiom

W:=(Y,I)/Ų

$\label{eq39}\begin{array}{@{}l} \displaystyle -{{{p_{4}}\over{q_{1}}}\ {|_{\ }^{1 \ 1 \ 1}}}-{{{p_{3}}\over{q_{1}}}\ {|_{\ }^{1 \ 1 \ 2}}}+{{p_{2}}\ {|_{\ }^{1 \ 1 \ 3}}}+{{p_{1}}\ {|_{\ }^{1 \ 1 \ 4}}}- \ \ \displaystyle {{{p_{3}}\over{q_{1}}}\ {|_{\ }^{1 \ 2 \ 1}}}+{{{p_{4}}\over{q_{1}}}\ {|_{\ }^{1 \ 2 \ 2}}}+{{p_{1}}\ {|_{\ }^{1 \ 2 \ 3}}}-{{p_{2}}\ {|_{\ }^{1 \ 2 \ 4}}}+{{p_{2}}\ {|_{\ }^{1 \ 3 \ 1}}}- \ \ \displaystyle {{p_{1}}\ {|_{\ }^{1 \ 3 \ 2}}}+{{p_{4}}\ {|_{\ }^{1 \ 3 \ 3}}}-{{p_{3}}\ {|_{\ }^{1 \ 3 \ 4}}}+{{p_{1}}\ {|_{\ }^{1 \ 4 \ 1}}}+{{p_{2}}\ {|_{\ }^{1 \ 4 \ 2}}}+ \ \ \displaystyle {{p_{3}}\ {|_{\ }^{1 \ 4 \ 3}}}+{{p_{4}}\ {|_{\ }^{1 \ 4 \ 4}}}-{{{p_{3}}\over{q_{1}}}\ {|_{\ }^{2 \ 1 \ 1}}}+{{{p_{4}}\over{q_{1}}}\ {|_{\ }^{2 \ 1 \ 2}}}+{{p_{1}}\ {|_{\ }^{2 \ 1 \ 3}}}- \ \ \displaystyle {{p_{2}}\ {|_{\ }^{2 \ 1 \ 4}}}+{{{p_{4}}\over{q_{1}}}\ {|_{\ }^{2 \ 2 \ 1}}}+{{{p_{3}}\over{q_{1}}}\ {|_{\ }^{2 \ 2 \ 2}}}-{{p_{2}}\ {|_{\ }^{2 \ 2 \ 3}}}-{{p_{1}}\ {|_{\ }^{2 \ 2 \ 4}}}+ \ \ \displaystyle {{p_{1}}\ {|_{\ }^{2 \ 3 \ 1}}}+{{p_{2}}\ {|_{\ }^{2 \ 3 \ 2}}}+{{p_{3}}\ {|_{\ }^{2 \ 3 \ 3}}}+{{p_{4}}\ {|_{\ }^{2 \ 3 \ 4}}}-{{p_{2}}\ {|_{\ }^{2 \ 4 \ 1}}}+ \ \ \displaystyle {{p_{1}}\ {|_{\ }^{2 \ 4 \ 2}}}-{{p_{4}}\ {|_{\ }^{2 \ 4 \ 3}}}+{{p_{3}}\ {|_{\ }^{2 \ 4 \ 4}}}+{{p_{2}}\ {|_{\ }^{3 \ 1 \ 1}}}-{{p_{1}}\ {|_{\ }^{3 \ 1 \ 2}}}+ \ \ \displaystyle {{p_{4}}\ {|_{\ }^{3 \ 1 \ 3}}}-{{p_{3}}\ {|_{\ }^{3 \ 1 \ 4}}}-{{p_{1}}\ {|_{\ }^{3 \ 2 \ 1}}}-{{p_{2}}\ {|_{\ }^{3 \ 2 \ 2}}}-{{p_{3}}\ {|_{\ }^{3 \ 2 \ 3}}}- \ \ \displaystyle {{p_{4}}\ {|_{\ }^{3 \ 2 \ 4}}}+{{p_{4}}\ {|_{\ }^{3 \ 3 \ 1}}}+{{p_{3}}\ {|_{\ }^{3 \ 3 \ 2}}}-{{p_{2}}\ {q_{1}}\ {|_{\ }^{3 \ 3 \ 3}}}- \ \ \displaystyle {{p_{1}}\ {q_{1}}\ {|_{\ }^{3 \ 3 \ 4}}}-{{p_{3}}\ {|_{\ }^{3 \ 4 \ 1}}}+{{p_{4}}\ {|_{\ }^{3 \ 4 \ 2}}}+{{p_{1}}\ {q_{1}}\ {|_{\ }^{3 \ 4 \ 3}}}- \ \ \displaystyle {{p_{2}}\ {q_{1}}\ {|_{\ }^{3 \ 4 \ 4}}}+{{p_{1}}\ {|_{\ }^{4 \ 1 \ 1}}}+{{p_{2}}\ {|_{\ }^{4 \ 1 \ 2}}}+{{p_{3}}\ {|_{\ }^{4 \ 1 \ 3}}}+ \ \ \displaystyle {{p_{4}}\ {|_{\ }^{4 \ 1 \ 4}}}+{{p_{2}}\ {|_{\ }^{4 \ 2 \ 1}}}-{{p_{1}}\ {|_{\ }^{4 \ 2 \ 2}}}+{{p_{4}}\ {|_{\ }^{4 \ 2 \ 3}}}-{{p_{3}}\ {|_{\ }^{4 \ 2 \ 4}}}+ \ \ \displaystyle {{p_{3}}\ {|_{\ }^{4 \ 3 \ 1}}}-{{p_{4}}\ {|_{\ }^{4 \ 3 \ 2}}}-{{p_{1}}\ {q_{1}}\ {|_{\ }^{4 \ 3 \ 3}}}+{{p_{2}}\ {q_{1}}\ {|_{\ }^{4 \ 3 \ 4}}}+ \ \ \displaystyle {{p_{4}}\ {|_{\ }^{4 \ 4 \ 1}}}+{{p_{3}}\ {|_{\ }^{4 \ 4 \ 2}}}-{{p_{2}}\ {q_{1}}\ {|_{\ }^{4 \ 4 \ 3}}}-{{p_{1}}\ {q_{1}}\ {|_{\ }^{4 \ 4 \ 4}}}$

(39)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

λ:=(Ω,I,Ω)/(I,W,I)

$\label{eq40}\begin{array}{@{}l} \displaystyle -{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{1}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{1}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{1}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{1}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{1}}}+ \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{1}}}- \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{1}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{1}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{1}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{1}}}+ \ \ \displaystyle {{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{1}}}+ \ \ \displaystyle {{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{1}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{1}}}- \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{1}}}- \ \ \displaystyle {{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{1}}}+ \ \ \displaystyle {{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{1}}}+ \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{2}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{2}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{2}}}- \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{2}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{2}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{2}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{2}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{2}}}- \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{2}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{2}}}+ \ \ \displaystyle {{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{2}}}- \ \ \displaystyle {{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{2}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{2}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{2}}}+ \ \ \displaystyle {{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{2}}}+ \ \ \displaystyle {{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{2}}}- \ \ \displaystyle {{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{3}}}- \ \ \displaystyle {{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{3}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{3}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{3}}}+ \ \ \displaystyle {{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{3}}}- \ \ \displaystyle {{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{3}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{3}}}+ \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{3}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{3}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{3}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{3}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{3}}}+ \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{3}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{3}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{3}}}- \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{3}}}- \ \ \displaystyle {{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{4}}}+ \ \ \displaystyle {{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{4}}}+ \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{4}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{4}}}- \ \ \displaystyle {{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{4}}}- \ \ \displaystyle {{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{4}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{4}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{4}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{4}}}+ \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{4}}}- \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{4}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{4}}}- \ \ \displaystyle {{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{4}}}- \ \ \displaystyle {{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{4}}}+ \ \ \displaystyle {{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{4}}}+ \ \ \displaystyle {{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{4}}}$

(40)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

test
     (    I Ω     )  /
     (     Y I    )  =  λ

$\label{eq41} \mbox{\rm true}$

(41)

Type: Boolean

axiom

test
     (     Ω I    )  /
     (    I Y     )  =  λ

$\label{eq42} \mbox{\rm true}$

(42)

Type: Boolean

Frobenius Condition

axiom

Χ :=
         Y    /
         λ

\label{eq43}\begin{array}{@{}l}
\displaystyle
-{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{1 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{1 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{1 \ 1}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{1 \ 1}}}+
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{1 \ 1}}}+
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{1 \ 1}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{1 \ 1}}}-
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{1 \ 1}}}+
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{1 \ 1}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{1 \ 2}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{1 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{1 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{1 \ 2}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{1 \ 2}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{1 \ 2}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{1 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{1 \ 2}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{1 \ 2}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{1 \ 2}}}+
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{1 \ 2}}}-
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{1 \ 2}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{1 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{1 \ 2}}}+
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{1 \ 2}}}+
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{1 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{1 \ 3}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{1 \ 3}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{1 \ 3}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{1 \ 3}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{1 \ 3}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{1 \ 3}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{1 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{1 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{1 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{1 \ 4}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{1 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{1 \ 4}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{1 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{1 \ 4}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{1 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{2 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{2 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{2 \ 1}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{2 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{2 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{2 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{2 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{2 \ 1}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{2 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{2 \ 1}}}+
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{2 \ 1}}}-
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{2 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{2 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{2 \ 1}}}+
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{2 \ 1}}}+
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{2 \ 1}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{2 \ 2}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{2 \ 2}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{2 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{2 \ 2}}}-
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{2 \ 2}}}-
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{2 \ 2}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{2 \ 2}}}+
\
\
\displaystyle
{{{p_{3}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{2 \ 2}}}-
\
\
\displaystyle
{{{p_{4}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{2 \ 2}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{2 \ 3}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{2 \ 3}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{2 \ 3}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{2 \ 3}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{2 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{2 \ 3}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{2 \ 3}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{2 \ 3}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{2 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{2 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{2 \ 4}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{2 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{2 \ 4}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{2 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{2 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{2 \ 4}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{3 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{3 \ 1}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{3 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{3 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{3 \ 1}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{3 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{3 \ 1}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{3 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{3 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{3 \ 2}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{3 \ 2}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{3 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{3 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{3 \ 2}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{3 \ 2}}}+
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{3 \ 3}}}+
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{3 \ 3}}}+
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{3 \ 3}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{3 \ 3}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{3 \ 3}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{3 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{3 \ 3}}}+
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{3 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{3 \ 4}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{3 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{3 \ 4}}}-
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{3 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{3 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{3 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{3 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{4 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{4 \ 1}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{4 \ 1}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{4 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{4 \ 1}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{4 \ 1}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{4 \ 1}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{4 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{4 \ 2}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{4 \ 2}}}+
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{4 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{4 \ 2}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{4 \ 2}}}+
\
\
\displaystyle
{{{{p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{4 \ 2}}}-
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{4 \ 3}}}+
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{4 \ 3}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{4 \ 3}}}+
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{4 \ 3}}}+
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{4 \ 3}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{4 \ 3}}}+
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{4 \ 3}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{4 \ 3}}}+
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 1}^{4 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 2}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 3}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1 \ 4}^{4 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 1}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 2}^{4 \ 4}}}+
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 3}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2 \ 4}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 1}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 2}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 3}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3 \ 4}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{1}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 1}^{4 \ 4}}}+
\
\
\displaystyle
{{{{p_{2}}\ {{q_{1}}^2}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 2}^{4 \ 4}}}+
\
\
\displaystyle
{{{{p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 3}^{4 \ 4}}}-
\
\
\displaystyle
{{{{p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4 \ 4}^{4 \ 4}}}

(43)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

test
     (   λ I   )  /
     (  I Y    )  =  Χ

$\label{eq44} \mbox{\rm true}$

(44)

Type: Boolean

axiom

test
     (   I λ   )  /
     (    Y I  )  =  Χ

$\label{eq45} \mbox{\rm true}$

(45)

Type: Boolean

i = Unit of the algebra

axiom

i:=𝐞.1

$\label{eq46}|_{1}$

(46)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

test
     o    i     /
     o    λ     =    Ω

$\label{eq47} \mbox{\rm true}$

(47)

Type: Boolean

Handle

axiom

$\label{eq48}\begin{array}{@{}l} \displaystyle -{{{4 \ {p_{4}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{1}^{1}}}- \ \ \displaystyle {{{4 \ {p_{3}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{2}^{1}}}+ \ \ \displaystyle {{{4 \ {p_{2}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{3}^{1}}}+ \ \ \displaystyle {{{4 \ {p_{1}}\ {q_{1}}}\over{{{\left({{p_{2}}^2}+{{p_{1}}^2}\right)}\ {q_{1}}}+{{p_{4}}^2}+{{p_{3}}^2}}}\ {|_{4}^{1}}}$

(48)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

Definition 5

Co-unit

  i 
  U

axiom

ι:𝐋:=
    o    i I    /
    o     Ų    o

$\label{eq49}-{{{p_{4}}\over{q_{1}}}\ {|_{\ }^{1}}}-{{{p_{3}}\over{q_{1}}}\ {|_{\ }^{2}}}+{{p_{2}}\ {|_{\ }^{3}}}+{{p_{1}}\ {|_{\ }^{4}}}$

(49)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

Y=U
ι

axiom

test
   o     Y     /
   o     ι     o  = Ų

$\label{eq50} \mbox{\rm true}$

(50)

Type: Boolean

For example:

axiom

ex1:=[q[1]=1,p[1]=1,p[2]=1,p[3]=1,p[4]=1]

$\label{eq51}\left[{{q_{1}}= 1}, \:{{p_{1}}= 1}, \:{{p_{2}}= 1}, \:{{p_{3}}= 1}, \:{{p_{4}}= 1}\right]$

(51)

Type: List(Equation(Polynomial(Integer)))

axiom

Ų0:𝐋  :=eval(Ų,ex1)

$\label{eq52}\begin{array}{@{}l} \displaystyle -{|_{\ }^{1 \ 1}}-{|_{\ }^{1 \ 2}}+{|_{\ }^{1 \ 3}}+{|_{\ }^{1 \ 4}}-{|_{\ }^{2 \ 1}}+{|_{\ }^{2 \ 2}}+{|_{\ }^{2 \ 3}}-{|_{\ }^{2 \ 4}}+ \ \ \displaystyle {|_{\ }^{3 \ 1}}-{|_{\ }^{3 \ 2}}+{|_{\ }^{3 \ 3}}-{|_{\ }^{3 \ 4}}+{|_{\ }^{4 \ 1}}+{|_{\ }^{4 \ 2}}+{|_{\ }^{4 \ 3}}+{|_{\ }^{4 \ 4}}$

(52)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

Ω0:𝐋  :=eval(Ω,ex1)$𝐋

$\label{eq53}\begin{array}{@{}l} \displaystyle -{{1 \over 4}\ {|_{1 \ 1}}}-{{1 \over 4}\ {|_{1 \ 2}}}+{{1 \over 4}\ {|_{1 \ 3}}}+{{1 \over 4}\ {|_{1 \ 4}}}-{{1 \over 4}\ {|_{2 \ 1}}}+{{1 \over 4}\ {|_{2 \ 2}}}- \ \ \displaystyle {{1 \over 4}\ {|_{2 \ 3}}}+{{1 \over 4}\ {|_{2 \ 4}}}+{{1 \over 4}\ {|_{3 \ 1}}}+{{1 \over 4}\ {|_{3 \ 2}}}+{{1 \over 4}\ {|_{3 \ 3}}}+{{1 \over 4}\ {|_{3 \ 4}}}+{{1 \over 4}\ {|_{4 \ 1}}}- \ \ \displaystyle {{1 \over 4}\ {|_{4 \ 2}}}-{{1 \over 4}\ {|_{4 \ 3}}}+{{1 \over 4}\ {|_{4 \ 4}}}$

(53)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

λ0:𝐋  :=eval(λ,ex1)$𝐋

$\label{eq54}\begin{array}{@{}l} \displaystyle -{{1 \over 4}\ {|_{1 \ 1}^{1}}}-{{1 \over 4}\ {|_{1 \ 2}^{1}}}+{{1 \over 4}\ {|_{1 \ 3}^{1}}}+{{1 \over 4}\ {|_{1 \ 4}^{1}}}-{{1 \over 4}\ {|_{2 \ 1}^{1}}}+{{1 \over 4}\ {|_{2 \ 2}^{1}}}- \ \ \displaystyle {{1 \over 4}\ {|_{2 \ 3}^{1}}}+{{1 \over 4}\ {|_{2 \ 4}^{1}}}+{{1 \over 4}\ {|_{3 \ 1}^{1}}}+{{1 \over 4}\ {|_{3 \ 2}^{1}}}+{{1 \over 4}\ {|_{3 \ 3}^{1}}}+{{1 \over 4}\ {|_{3 \ 4}^{1}}}+ \ \ \displaystyle {{1 \over 4}\ {|_{4 \ 1}^{1}}}-{{1 \over 4}\ {|_{4 \ 2}^{1}}}-{{1 \over 4}\ {|_{4 \ 3}^{1}}}+{{1 \over 4}\ {|_{4 \ 4}^{1}}}+{{1 \over 4}\ {|_{1 \ 1}^{2}}}-{{1 \over 4}\ {|_{1 \ 2}^{2}}}+ \ \ \displaystyle {{1 \over 4}\ {|_{1 \ 3}^{2}}}-{{1 \over 4}\ {|_{1 \ 4}^{2}}}-{{1 \over 4}\ {|_{2 \ 1}^{2}}}-{{1 \over 4}\ {|_{2 \ 2}^{2}}}+{{1 \over 4}\ {|_{2 \ 3}^{2}}}+{{1 \over 4}\ {|_{2 \ 4}^{2}}}- \ \ \displaystyle {{1 \over 4}\ {|_{3 \ 1}^{2}}}+{{1 \over 4}\ {|_{3 \ 2}^{2}}}+{{1 \over 4}\ {|_{3 \ 3}^{2}}}-{{1 \over 4}\ {|_{3 \ 4}^{2}}}+{{1 \over 4}\ {|_{4 \ 1}^{2}}}+{{1 \over 4}\ {|_{4 \ 2}^{2}}}+ \ \ \displaystyle {{1 \over 4}\ {|_{4 \ 3}^{2}}}+{{1 \over 4}\ {|_{4 \ 4}^{2}}}-{{1 \over 4}\ {|_{1 \ 1}^{3}}}-{{1 \over 4}\ {|_{1 \ 2}^{3}}}-{{1 \over 4}\ {|_{1 \ 3}^{3}}}-{{1 \over 4}\ {|_{1 \ 4}^{3}}}+ \ \ \displaystyle {{1 \over 4}\ {|_{2 \ 1}^{3}}}-{{1 \over 4}\ {|_{2 \ 2}^{3}}}-{{1 \over 4}\ {|_{2 \ 3}^{3}}}+{{1 \over 4}\ {|_{2 \ 4}^{3}}}-{{1 \over 4}\ {|_{3 \ 1}^{3}}}-{{1 \over 4}\ {|_{3 \ 2}^{3}}}+ \ \ \displaystyle {{1 \over 4}\ {|_{3 \ 3}^{3}}}+{{1 \over 4}\ {|_{3 \ 4}^{3}}}+{{1 \over 4}\ {|_{4 \ 1}^{3}}}-{{1 \over 4}\ {|_{4 \ 2}^{3}}}+{{1 \over 4}\ {|_{4 \ 3}^{3}}}-{{1 \over 4}\ {|_{4 \ 4}^{3}}}- \ \ \displaystyle {{1 \over 4}\ {|_{1 \ 1}^{4}}}+{{1 \over 4}\ {|_{1 \ 2}^{4}}}+{{1 \over 4}\ {|_{1 \ 3}^{4}}}-{{1 \over 4}\ {|_{1 \ 4}^{4}}}-{{1 \over 4}\ {|_{2 \ 1}^{4}}}-{{1 \over 4}\ {|_{2 \ 2}^{4}}}- \ \ \displaystyle {{1 \over 4}\ {|_{2 \ 3}^{4}}}-{{1 \over 4}\ {|_{2 \ 4}^{4}}}-{{1 \over 4}\ {|_{3 \ 1}^{4}}}+{{1 \over 4}\ {|_{3 \ 2}^{4}}}-{{1 \over 4}\ {|_{3 \ 3}^{4}}}+{{1 \over 4}\ {|_{3 \ 4}^{4}}}- \ \ \displaystyle {{1 \over 4}\ {|_{4 \ 1}^{4}}}-{{1 \over 4}\ {|_{4 \ 2}^{4}}}+{{1 \over 4}\ {|_{4 \ 3}^{4}}}+{{1 \over 4}\ {|_{4 \ 4}^{4}}}$

(54)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))

axiom

H0:𝐋 :=eval(H,ex1)$𝐋

$\label{eq55}-{|_{1}^{1}}-{|_{2}^{1}}+{|_{3}^{1}}+{|_{4}^{1}}$

(55)

Type: LinearOperator?(4,OrderedVariableList?([]),Expression(Integer))