Solution 36 to problem e3null
Expressions |
Parameters |
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Expressions
The solution is given through the following expressions:
1
a22=---*a33
2
b22=0
b31=0
b33=0
c12=0
c13=0
c22=0
c23=0
1 2
- ---*b32
2
c33=-------------
a33
n1=0
n2=0
a33*m2
n3=--------
b32
m3=0
r6=0
r5=0
r4=0
r3=0
r2=0
r1=0
q19=0
q18=0
q17=0
- 2*m2*p5
q16=------------
a33
- 2*m1*p5
q15=------------
a33
2 2
- b32*m1 *p5 - b32*m2 *p5
q14=----------------------------
2
a33 *m2
q13=0
q12=0
q11=0
q10=0
2 2
- b32*m1 *p5 - b32*m2 *p5
q9=----------------------------
2
a33 *m2
q8=0
q7=0
q5=0
q4=0
m2*p5
q3=-------
b32
q2=0
m2*p5
q1=-------
b32
p50=0
3
b32 *p5
p49=---------
3
a33
3
b32 *m1*p5
p48=------------
3
a33 *m2
2
3*b32 *p5
p47=-----------
2
a33
p46=0
p45=0
p44=0
p43=0
p42=0
p41=0
p40=0
p39=0
p38=0
p37=0
p36=0
- 4*b32*p5
p35=-------------
a33
- b32*m1*p5
p34=--------------
a33*m2
p33=0
p32=0
p31=0
p30=0
p29=0
p28=0
p27=0
p26=0
p25=0
p24=0
p23=0
p22=0
p21=0
p20=0
- b32*p5
p19=-----------
a33
b32*m1*p5
p18=-----------
a33*m2
- b32*p5
p17=-----------
a33
p16=0
p15=0
p14=0
p13=0
p12=0
- b32*m1*p5
p11=--------------
a33*m2
p10=0
p9=0
p8=0
p7=p5
p6=0
p4=0
p3=0
p2=0
p1=0
k104=0
k103=0
k102=0
k101=0
k100=0
1 5
---*b32 *p5
2
k99=-------------
4
a33 *m2
k98=0
4
b32 *p5
k97=---------
3
a33 *m2
k96=0
k95=0
1 5
---*b32 *p5
2
k94=-------------
4
a33 *m2
k93=0
k92=0
3
2*b32 *p5
k91=-----------
2
a33 *m2
k90=0
k89=0
1 3
---*b32 *p5
2
k88=-------------
2
a33 *m2
k87=0
1 3
---*b32 *p5
2
k86=-------------
2
a33 *m2
k85=0
k84=0
k83=0
k82=0
k81=0
k80=0
k79=0
k78=0
k77=0
k76=0
k75=0
k74=0
k73=0
k72=0
k71=0
k70=0
k69=0
k68=0
k67=0
k66=0
k65=0
2
- 2*b32 *p5
k64=--------------
a33*m2
k63=0
k62=0
k61=0
k60=0
k59=0
k58=0
k57=0
k56=0
1 5
---*b32 *p5
4
k55=-------------
4
a33 *m2
k54=0
k53=0
k52=0
k51=0
1 5
---*b32 *p5
2
k50=-------------
4
a33 *m2
k49=0
k48=0
k47=0
k46=0
k45=0
k44=0
k43=0
k42=0
k41=0
k40=0
k39=0
k38=0
k37=0
k36=0
k35=0
k34=0
k33=0
2
- b32 *p5
k32=------------
a33*m2
k31=0
2
- b32 *p5
k30=------------
a33*m2
k29=0
k28=0
k27=0
k26=0
1 5
---*b32 *p5
4
k25=-------------
4
a33 *m2
k24=0
k23=0
k21=0
k20=0
k19=0
k18=0
k17=0
k16=0
k14=0
k13=0
k12=0
k11=0
k10=0
k9=0
k8=0
k7=0
k6=0
1
- ---*b32*p5
4
k5=---------------
m2
k4=0
1
- ---*b32*p5
2
k3=---------------
m2
k2=0
1
- ---*b32*p5
4
k1=---------------
m2
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:
p5,m1,b32,m2,a33
Relevance for the application:
The following expression INT is a first
integral for the Hamiltonian HAM:
2 2 2 2 2 2 2
HAM=(a33 *b32*u1 + a33 *b32*u2 + 2*a33 *b32*u3 + 2*a33 *m2*u3
2 3 2
+ 2*a33*b32 *u3*v2 + 2*a33*b32*m1*v1 + 2*a33*b32*m2*v2 - b32 *v3 )/(2*a33
*b32)
4 2 4 4 2 2 2 4 2 4
INT=(p5*( - a33 *b32 *u1 - 2*a33 *b32 *u1 *u2 - a33 *b32 *u2
4 2 4 2 4 2 2
+ 4*a33 *b32*m2*u1 *u3 + 4*a33 *b32*m2*u2 *u3 + 4*a33 *m2 *u1
4 2 2 3 3 2 3 3 2
+ 4*a33 *m2 *u2 - 4*a33 *b32 *u1 *u3*v2 - 4*a33 *b32 *u2 *u3*v2
3 3 2 3 2
- 8*a33 *b32 *u2*u3 *v3 + 4*a33 *b32 *m1*u1*u2*v2
3 2 3 2 2
- 4*a33 *b32 *m1*u1*u3*v3 - 4*a33 *b32 *m1*u2 *v1
3 2 2 3 2 2
- 4*a33 *b32 *m2*u1 *v2 - 4*a33 *b32 *m2*u2 *v2
3 2 3
- 16*a33 *b32 *m2*u2*u3*v3 - 8*a33 *b32*m1*m2*u1*v3
3 2 2 4 2 2 2 4 2 2
- 8*a33 *b32*m2 *u2*v3 + 2*a33 *b32 *u1 *v3 + 2*a33 *b32 *u2 *v3
2 4 2 2 2 3 2 2 2 2 2
+ 8*a33 *b32 *u3 *v3 + 12*a33 *b32 *m2*u3*v3 - 4*a33 *b32 *m1 *v1
2 2 2 2 2 2 2 2 2 2 2 2
- 4*a33 *b32 *m1 *v2 - 4*a33 *b32 *m2 *v1 - 4*a33 *b32 *m2 *v2
5 2 4 2 4 2
+ 4*a33*b32 *u3*v2*v3 + 4*a33*b32 *m1*v1*v3 + 4*a33*b32 *m2*v2*v3
6 4 6 2 2 6 2 2 6 4
+ b32 *v1 + 2*b32 *v1 *v2 + 2*b32 *v1 *v3 + b32 *v2
6 2 2 4
+ 2*b32 *v2 *v3 ))/(4*a33 *b32*m2)
And again in machine readable form:
HAM=(a33**2*b32*u1**2 + a33**2*b32*u2**2 + 2*a33**2*b32*u3**2 + 2*a33**2*m2*u3 +
2*a33*b32**2*u3*v2 + 2*a33*b32*m1*v1 + 2*a33*b32*m2*v2 - b32**3*v3**2)/(2*a33*
b32)$
INT=(p5*( - a33**4*b32**2*u1**4 - 2*a33**4*b32**2*u1**2*u2**2 - a33**4*b32**2*u2
**4 + 4*a33**4*b32*m2*u1**2*u3 + 4*a33**4*b32*m2*u2**2*u3 + 4*a33**4*m2**2*u1**2
+ 4*a33**4*m2**2*u2**2 - 4*a33**3*b32**3*u1**2*u3*v2 - 4*a33**3*b32**3*u2**2*u3
*v2 - 8*a33**3*b32**3*u2*u3**2*v3 + 4*a33**3*b32**2*m1*u1*u2*v2 - 4*a33**3*b32**
2*m1*u1*u3*v3 - 4*a33**3*b32**2*m1*u2**2*v1 - 4*a33**3*b32**2*m2*u1**2*v2 - 4*
a33**3*b32**2*m2*u2**2*v2 - 16*a33**3*b32**2*m2*u2*u3*v3 - 8*a33**3*b32*m1*m2*u1
*v3 - 8*a33**3*b32*m2**2*u2*v3 + 2*a33**2*b32**4*u1**2*v3**2 + 2*a33**2*b32**4*
u2**2*v3**2 + 8*a33**2*b32**4*u3**2*v3**2 + 12*a33**2*b32**3*m2*u3*v3**2 - 4*a33
**2*b32**2*m1**2*v1**2 - 4*a33**2*b32**2*m1**2*v2**2 - 4*a33**2*b32**2*m2**2*v1
**2 - 4*a33**2*b32**2*m2**2*v2**2 + 4*a33*b32**5*u3*v2*v3**2 + 4*a33*b32**4*m1*
v1*v3**2 + 4*a33*b32**4*m2*v2*v3**2 + b32**6*v1**4 + 2*b32**6*v1**2*v2**2 + 2*
b32**6*v1**2*v3**2 + b32**6*v2**4 + 2*b32**6*v2**2*v3**2))/(4*a33**4*b32*m2)$