# It is possible to compute the Kauffman bracket using Z3py?

I am trying to compute the Kauffman bracket of the trefoil knot using Z3py. Until now I have the following code:

``````a, b, c, d, e, f, A, B = Ints('a b c d e f A B')

delta = Function('delta', IntSort(), IntSort(), IntSort())
def X(a,b,c,d):
return A*delta(a,d)*delta(b,c)+B*delta(a,b)*delta(c,d)
Trefoil = X(a,d,b,e)*X(e,b,f,c)*X(c,f,d,a)
print simplify(simplify(Trefoil, som= True),mul_to_power=True)
``````

with this code I am obtaining the following output:

``````A**3·
delta(a, e)·
delta(b, f)·
delta(c, a)·
delta(d, b)·
delta(e, c)·
delta(f, d) +
A**2·
B·
delta(a, d)·
delta(b, e)·
delta(b, f)·
delta(c, a)·
delta(e, c)·
delta(f, d) +
A**2·
B·
delta(a, e)·
delta(c, a)·
delta(d, b)·
delta(e, b)·
delta(f, c)·
delta(f, d) +
A·
B**2·
delta(a, d)·
delta(b, e)·
delta(c, a)·
delta(e, b)·
delta(f, c)·
delta(f, d) +
A**2·
B·
delta(a, e)·
delta(b, f)·
delta(c, f)·
delta(d, a)·
delta(d, b)·
delta(e, c) +
A·
B**2·
delta(a, d)·
delta(b, e)·
delta(b, f)·
delta(c, f)·
delta(d, a)·
delta(e, c) +
A·
B**2·
delta(a, e)·
delta(c, f)·
delta(d, a)·
delta(d, b)·
delta(e, b)·
delta(f, c) +
B**3·
delta(a, d)·
delta(b, e)·
delta(c, f)·
delta(d, a)·
delta(e, b)·
delta(f, c)
``````

Now I need to apply the rule:

``````delta(a,b)*delta(b,c) = delta(a,c)
``````

and to simplify the output using such rule. Please, could you tell me how to do it. Many thanks.

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