# How to compute with Quaternion numbers in Z3?

In Complex numbers in Z3 Leonardo de Moura was able to introduce and to compute with complex numbers in Z3.

Using the code proposed by Leonardo I am introducing and computing with quaternion numbers in Z3 according with the code presented here. Using this "quaternion " code I am solving the following problem:

``````x = Quaternion("x")
s = Tactic('qfnra-nlsat').solver()
s.add(x*x + 30  == 0, x.i3 > 0, x.i2 >0, x.i1 > 0)
print(s.check())
m = s.model()
print m
``````

and the corresponding output is:

``````sat
[x.r = 0, x.i1 = 1, x.i2 = 1, x.i3 = 5.2915026221?]
``````

This result was verified using Maple.

Other example:

``````x = Quaternion("x")
y = Quaternion("y")
z = Quaternion("z")
s = Tactic('qfnra-nlsat').solver()
s.add(x*y + 30 + x + y*z == 0, x - y + z == 10)
print(s.check())
m = s.model()
print m
``````

and the output is:

``````sat
[y.r = 1/8,
z.r = 2601/64,
y.i1 = 1/2,
z.i1 = 45/8,
y.i2 = -1/2,
z.i2 = -45/8,
y.i3 = -1/2,
z.i3 = -45/8,
x.i3 = 41/8,
x.i2 = 41/8,
x.i1 = -41/8,
x.r = -1953/64]
``````

Other example:

Proving that

`````` x * y != y * x
``````

Code:

``````x = Quaternion("x")
y = Quaternion("y")
a1, b1, c1, d1 = Reals('a1 b1 c1 d1')
a2, b2, c2, d2 = Reals('a2 b2 c2 d2')

x.r =  a1
x.i1 = b1
x.i2 = c1
x.i3 = d1
y.r =  a2
y.i1 = b2
y.i2 = c2
y.i3 = d2
print simplify((x * y - y * x).r)
print simplify((x * y - y * x).i1)
print simplify((x * y - y * x).i2)
print simplify((x * y - y * x).i3)
``````

Output:

``````0
2·c2·d1 + -2·c1·d2
-2·b2·d1 + 2·b1·d2
2·b2·c1 + -2·b1·c2
``````

Other example : Proving that the quaternions

``````A = (1+ I)/sqrt(2),
B =(1 + J)/sqrt(2),
C = (1 + K)/sqrt(2)
``````

generate a representation of the Braid Group, it is to say, we have that

``````ABA = BAB,  ACA = CAC,   BCB = CBC.
``````

Code:

``````A = Quaternion('A')
B = Quaternion('B')
C = Quaternion('C')
A.r = 1/Sqrt(2)
A.i1 = 1/Sqrt(2)
A.i2 = 0
A.i3 = 0
B.r = 1/Sqrt(2)
B.i1 = 0
B.i2 = 1/Sqrt(2)
B.i3 = 0
C.r = 1/Sqrt(2)
C.i1 = 0
C.i2 = 0
C.i3 = 1/Sqrt(2)
print simplify((A*B*A-B*A*B).r)
print simplify((A*B*A-B*A*B).i1)
print simplify((A*B*A-B*A*B).i2)
print simplify((A*B*A-B*A*B).i3)
print "Proved : ABA = BAB:"
print simplify((A*C*A-C*A*C).r)
print simplify((A*C*A-C*A*C).i1)
print simplify((A*C*A-C*A*C).i2)
print simplify((A*C*A-C*A*C).i3)
print "Proved : ACA = CAC:"
print simplify((B*C*B-C*B*C).r)
print simplify((B*C*B-C*B*C).i1)
print simplify((B*C*B-C*B*C).i2)
print simplify((B*C*B-C*B*C).i3)
print "Proved : BCB = CBC:"
``````

Output:

``````0
0
0
0
Proved : ABA = BAB.
0
0
0
0
Proved : ACA = CAC.
0
0
0
0
Proved : BCB = CBC.
``````

Other example: Proving that

``````x / x = 1
``````

for all invertible quaternion:

Code:

``````x = Quaternion("x")
a, a1, a2, a3 = Reals('a a1 a2 a3')
x.r = a
x.i1 = a1
x.i2 = a2
x.i3 = a3
s = Solver()
s.add(Or(a != 0, a1 != 0, a2 != 0, a3 != 0), Not((x/x).r == 1))
print s.check()
s1 = Solver()
s1.add(Or(a != 0, a1 != 0, a2 != 0, a3 != 0), Not((x/x).i1 == 0))
print s1.check()
s2 = Solver()
s2.add(Or(a != 0, a1 != 0, a2 != 0, a3 != 0), Not((x/x).i2 == 0))
print s2.check()
s3 = Solver()
s3.add(Or(a != 0, a1 != 0, a2 != 0, a3 != 0), Not((x/x).i3 == 0))
print s3.check()
``````

Output:

``````unsat
unsat
unsat
unsat
``````

Please let me know what do you think about the "quaternion" code and how the "quaternion" code can be improved. Many thanks.

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