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I posted a related question, but then I think it was not very clear. I would like to rephrase the problem like this:

Two formulas a1 == a + b (1) and a1 == b (2) are equivalent if a == 0. Given these formulas (1) and (2), how can I use Z3 python to find out this required condition (a == 0) so the above formulas become equivalent?

I suppose that a1, a and b are all in the format of BitVecs(32).

Edit: I came up with the code like this:

from z3 import *

a, b = BitVecs('a b', 32)
a1 = BitVec('a1', 32)
s = Solver()
s.add(ForAll(b, a + b == b))
if s.check() == sat:
    print 'a =', s.model()[a]
else:
    print 'Not Equ'

The output is: a = 0, as expected.

However, when I modified the code a bit to use two formulas, it doesnt work anymore:

from z3 import *

a, b = BitVecs('a b', 32)
a1 = BitVec('a1', 32)

f = True
f = And(f, a1 == a * b)

g = True
g = And(g, a1 == b)

s = Solver()
s.add(ForAll(b, f == g))
if s.check() == sat:
    print 'a =', s.model()[a]
else:
    print 'Not Equ'

The output now is different: a = 1314914305

So the questions are:

(1) Why the second code produces different (wrong) result?

(2) Is there any way to do this without using ForAll (or quantifier) at all?

Thanks

share|improve this question
    
If you already open a new question instead of improving your previous one, at least provide a link to the latter. –  Malte Schwerhoff Jun 14 '13 at 16:17
    
i think opening the new question is less confused than modifying the old one. i added the link. thanks. –  user311703 Jun 14 '13 at 16:45
    
The 2nd code piece produces a different result because the solver can choose the value of a1 to make the two formulas evaluate the same - which it does. You would need to quantify over a1 as well to prevent that from happening. –  Vladimir Klebanov Jun 15 '13 at 16:12
    
Vladimir, this seems to fix my problem! Do you have any idea to avoid ForAll quantifier for this problem? Thanks! –  user311703 Jun 15 '13 at 16:14

1 Answer 1

The two codes produce the same correct answer a = 0. You have a typo: you are writing a1 = a*b and it must be a1 = a + b . Do you agree?

Possible code without using ForAll:

a, b = BitVecs('a b', 32)
a1 = BitVec('a1', 32)
s = Solver()
s.add(a + b == b)
if s.check() == sat:
print 'a =', s.model()[a]
else:
print 'Not Equ'
s1 = Solver()
s1.add(a==0, Not(a + b == b))
print s1.check()

Output:

a = 0
unsat
share|improve this answer
    
Juan, indeed I had a typo, but then the question is: why the result is a = 1314914305, but not a = 1? (since with a * b == b with every 'b', we should have a == 1). –  user311703 Jun 15 '13 at 14:48
    
Juan, the second problem with your solution is that: the s.check() produces a model, but that model may not be true for all values of b. What I want is to find a so that a + b == b with every b, so I dont think I can avoid ForAll. Correct me if I am wrong, though. Thanks –  user311703 Jun 15 '13 at 15:51
    
As you can see, the first solver obtains the value a =0 and then the second solver generates the output "unsat" and then a + b = b with every b when a = 0. Do you agree? –  Juan Ospina Jun 15 '13 at 16:33
    
Juan, as I said the model might give different value (a != 0), so I dont think your is correct. The answer of Vladimir seems to be the best to me. –  user311703 Jun 15 '13 at 16:42

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