Solution 2 to problem over
Remaining equations |
Expressions |
Parameters |
Inequalities |
Relevance |
Back to problem over
Equations
The following unsolved equations remain:
2 2
0=a12 + a13
Expressions
The solution is given through the following expressions:
1 3 2 1 2 2 1 2 2
---*a12 *n3 *r351 - ---*a12 *a13 *n3*r215 + ---*a12*a13 *n3 *r351
4 2 2
r10=-------------------------------------------------------------------
5
a13
1 2 2 1 2
---*a12 *n3 *r351 + ---*a12*a13 *n3*r215
4 2
r11=------------------------------------------
4
a13
1 1 2
---*a12*n1*n3*r351 + ---*a13 *n1*r215
4 2
r12=---------------------------------------
3
a13
r13=0
r14=0
r15=0
r20=0
r21=0
r23=0
r24=0
r25=0
r26=0
1
- ---*n1*r351
2
r27=----------------
a13
1
---*a12*n3*r351
2
r28=-----------------
2
a13
r29=r214
1
---*n1*r351
2
r210=-------------
a13
1 2
---*a12 *n3*r351
2
r212=------------------
3
a13
r213=0
1 2 2 1 2
- ---*a12 *n3*r351 + a12*a13 *r215 - ---*a13 *n3*r351
2 2
r216=--------------------------------------------------------
3
a13
r217=0
r219=0
r220=r214
r30=0
r31=0
r32=0
r33=0
r34=0
r35=0
r36=0
r37=0
r38=0
r39=0
r310=r338
r311=r339
r312=0
r313=r340
r314=0
r315=0
- a12*r351 + a13*r343
r316=------------------------
a13
r317=0
r318=0
r319=0
r320=0
r321=r338
r322=r339
r323=0
r324=r340
r325=0
- a12*r351 + a13*r343
r327=------------------------
a13
r328=0
r329=0
r330=0
r331=r326
r332=0
r333=0
r334=0
r335=0
r336=0
r337=0
r342=0
r344=0
r345=0
r346=r341
r347=r326 - r351
r348=0
r349=0
- a12*r351
r350=-------------
a13
r352=r341
r353=0
r354=0
r355=0
m3=0
m2=0
m1=0
a12*n3
n2=--------
a13
c33=0
c23=0
c22=0
c13=0
c12=0
b33=0
b31=0
b21=0
b13=0
b11=0
Parameters
Apart from the condition that they must not vanish to give
a non-trivial solution and a non-singular solution with
non-vanishing denominators, the following parameters are free:
r215, r214, r340, r338, r339, r341, r343, r326, r351, n3,
n1, a12, a13
Inequalities
In the following not identically vanishing expressions are shown.
Any auxiliary variables g00?? are used to express that at least
one of their coefficients must not vanish, e.g. g0019*p4 + g0020*p3
means that either p4 or p3 or both are non-vanishing.
{a12,a13}
Relevance for the application:
Modulo the following equation:
2 2
0=a12 + a13
the system of equations related to the Hamiltonian HAM:
2
2*u1*u2*a12*a13 + 2*u1*u3*a13 + u1*a13*n1 + u2*a12*n3 + u3*a13*n3
HAM=--------------------------------------------------------------------
a13
has apart from the Hamiltonian and Casimirs the following 9 first integrals:
2 5 2 4 5
FI=u1 *v2*a13 - u1 *v3*a12*a13 - u1*u2*v1*a13
1 2 2 1 4 4
+ u1*v2*( - ---*a12 *a13 *n3 - ---*a13 *n3) - u2*u3*v2*a12*a13
2 2
1 2 2 1 4 2 4
+ ---*u2*v1*a12 *a13 *n3 + ---*u2*v3*a13 *n1 - u3 *v3*a12*a13
2 2
1 3 1 4 1 2
+ ---*u3*v1*a12*a13 *n3 - ---*u3*v2*a13 *n1 + ---*v1*a12*a13 *n1*n3
2 2 4
1 2 2 1 3 2 1 2 2
+ ---*v2*a12 *a13*n3 + v3*(---*a12 *n3 + ---*a12*a13 *n3 )
4 4 2
3 7 2 7 2 7 2 6
{HAM,FI} = 2*u1 *v1*a13 + 2*u1 *u2*v2*a13 + 2*u1 *u3*v3*a13 + u1 *v1*a13 *n3
2 7 6 5
- 2*u1*u2 *v1*a13 + 2*u1*u2*u3*v1*a12*a13 + u1*u2*v1*a12*a13 *n1
6 6 3 7
+ u1*u2*v2*a13 *n3 + u1*u3*v3*a13 *n3 - 2*u2 *v2*a13
2 6 2 7 2 5
+ 2*u2 *u3*v2*a12*a13 - 2*u2 *u3*v3*a13 + u2 *v2*a12*a13 *n1
2 6 5
+ 2*u2*u3 *v3*a12*a13 + u2*u3*v3*a12*a13 *n1
2
FI=u1*u2*v1 + u2 *v2 + u2*u3*v3
3 2 2 2
{HAM,FI} = - 2*u1 *v1*a13 - 2*u1 *u2*v2*a13 - 2*u1 *u3*v3*a13 - u1 *v1*n3
2
+ 2*u1*u2*u3*v1*a12 - u1*u2*v2*n3 + 2*u1*u3 *v1*a13 + u1*u3*v1*n1
2 2 2
- u1*u3*v3*n3 + 2*u2 *u3*v2*a12 + 2*u2*u3 *v2*a13 + 2*u2*u3 *v3*a12
3 2
+ u2*u3*v2*n1 + 2*u3 *v3*a13 + u3 *v3*n1
2
FI=u1*u3*v1 + u2*u3*v2 + u3 *v3
3 2 2
{HAM,FI} = 2*u1 *v1*a12*a13 + 2*u1 *u2*v2*a12*a13 + 2*u1 *u3*v3*a12*a13
2 2 2
+ u1 *v1*a12*n3 - 2*u1*u2 *v1*a12*a13 - 2*u1*u2*u3*v1*a13
- u1*u2*v1*a13*n1 + u1*u2*v2*a12*n3 + u1*u3*v3*a12*n3
3 2 2 2
- 2*u2 *v2*a12*a13 - 2*u2 *u3*v2*a13 - 2*u2 *u3*v3*a12*a13
2 2 2
- u2 *v2*a13*n1 - 2*u2*u3 *v3*a13 - u2*u3*v3*a13*n1
2
FI=u1 *v1 + u1*u2*v2 + u1*u3*v3
2 2 2 2 2
{HAM,FI} = 2*u1 *u2*v1*a13 - 2*u1 *u3*v1*a12*a13 + 2*u1*u2 *v2*a13
2
- 2*u1*u2*u3*v2*a12*a13 + 2*u1*u2*u3*v3*a13 + u1*u2*v1*a13*n3
2 2
- 2*u1*u3 *v3*a12*a13 - u1*u3*v1*a12*n3 + u2 *v2*a13*n3
2
- u2*u3*v2*a12*n3 + u2*u3*v3*a13*n3 - u3 *v3*a12*n3
2
FI=u1*v1*v2 + u2*v2 + u3*v2*v3
2 2 2
{HAM,FI} = - 2*u1 *v1 *a13 - 2*u1*u2*v1*v2*a13 + 2*u1*u2*v1*v3*a12 - u1*v1 *n3
2
+ u1*v1*v3*n1 + 2*u2 *v2*v3*a12 + 2*u2*u3*v2*v3*a13
2 2 2
+ 2*u2*u3*v3 *a12 - u2*v1*v2*n3 + u2*v2*v3*n1 + 2*u3 *v3 *a13
2
- u3*v1*v3*n3 + u3*v3 *n1
2
FI=u1*v1*v3 + u2*v2*v3 + u3*v3
2 2 2
{HAM,FI} = 2*u1 *v1 *a12*a13 - 2*u1*u3*v1*v2*a13 + 2*u1*u3*v1*v3*a12*a13
2 2 2
+ u1*v1 *a12*n3 - u1*v1*v2*a13*n1 - 2*u2 *v2 *a12*a13
2 2
- 2*u2*u3*v2 *a13 - 2*u2*u3*v2*v3*a12*a13 + u2*v1*v2*a12*n3
2 2 2
- u2*v2 *a13*n1 - 2*u3 *v2*v3*a13 + u3*v1*v3*a12*n3
- u3*v2*v3*a13*n1
2
FI=u1*v1 + u2*v1*v2 + u3*v1*v3
2 2 2 2 2
{HAM,FI} = 2*u1 *v1*v2*a13 - 2*u1 *v1*v3*a12*a13 + 2*u1*u2*v2 *a13
2 2
- 2*u1*u2*v2*v3*a12*a13 + 2*u1*u3*v2*v3*a13 - 2*u1*u3*v3 *a12*a13
2
+ u1*v1*v2*a13*n3 - u1*v1*v3*a12*n3 + u2*v2 *a13*n3
2
- u2*v2*v3*a12*n3 + u3*v2*v3*a13*n3 - u3*v3 *a12*n3
2 2 2
FI=u1 + u2 + u3
{HAM,FI} = 0
2 3 1 2 1
FI=u1*v2*a12*a13 + u1*v3*a13 + ---*v1*a13 *n1 + ---*v2*a12*a13*n3
2 2
1 2
- ---*v3*a12 *n3
2
{HAM,FI} = 0
And again in machine readable form:
HAM=(2*u1*u2*a12*a13 + 2*u1*u3*a13**2 + u1*a13*n1 + u2*a12*n3 + u3*a13*n3)/a13$
FI=u1**2*v2*a13**5 - u1**2*v3*a12*a13**4 - u1*u2*v1*a13**5 + u1*v2*( - 1/2*a12**
2*a13**2*n3 - 1/2*a13**4*n3) - u2*u3*v2*a12*a13**4 + 1/2*u2*v1*a12**2*a13**2*n3
+ 1/2*u2*v3*a13**4*n1 - u3**2*v3*a12*a13**4 + 1/2*u3*v1*a12*a13**3*n3 - 1/2*u3*
v2*a13**4*n1 + 1/4*v1*a12*a13**2*n1*n3 + 1/4*v2*a12**2*a13*n3**2 + v3*(1/4*a12**
3*n3**2 + 1/2*a12*a13**2*n3**2)$
FI=u1*u2*v1 + u2**2*v2 + u2*u3*v3$
FI=u1*u3*v1 + u2*u3*v2 + u3**2*v3$
FI=u1**2*v1 + u1*u2*v2 + u1*u3*v3$
FI=u1*v1*v2 + u2*v2**2 + u3*v2*v3$
FI=u1*v1*v3 + u2*v2*v3 + u3*v3**2$
FI=u1*v1**2 + u2*v1*v2 + u3*v1*v3$
FI=u1**2 + u2**2 + u3**2$
FI=u1*v2*a12*a13**2 + u1*v3*a13**3 + 1/2*v1*a13**2*n1 + 1/2*v2*a12*a13*n3 - 1/2*
v3*a12**2*n3$