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With the z3/python web interface, if I ask:

x = Real ('x')
solve(x * x == 2, show=True)

I nicely get:

Problem:
[x·x = 2]
Solution:
[x = -1.4142135623?]

I thought the following smt-lib2 script would have the same solution:

(set-option :produce-models true)
(declare-fun s0 () Real)
(assert (= 2.0 (* s0 s0)))
(check-sat)

Alas, I get unknown with z3 (v3.2).

I suspect the problem is with the non-linear term (* s0 s0), which the python interface somehow doesn't suffer from. Is there a way to code the same in smt-lib2 to get a model?

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1 Answer 1

up vote 1 down vote accepted

Try your example with Z3 web interface, I get a result of sat.

Z3 web interface and Z3Py are based on Z3 v4.0, so I think the problem is fixed in the upcoming release.

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Quite right! And this is what it returns for the value of s0: ((s0 (root-obj (+ (^ x 2) (- 2)) 1))) I'm curious how the "root-obj" function is interpreted; and how other tools querying Z3 can get a real-number out of it. –  Levent Erkok Apr 3 '12 at 4:42
    
That's what I wonder too. Hopefully @Leo can clarify it. –  pad Apr 3 '12 at 21:22
    
Z3 4.0 uses root-obj to repredent algebraic irrational numbers. It consists of a univariate polynomial and an index. The root-obj above is representing the first root of x^2 - 2, which is -1.41... We can ask the SMT 2.0 to display the results in decimal notation by using '(set-option :pp-decimal true)'. I used decimals by default in z3py because the goal is to reach a crowd that is not used to constraint solving and algebraic number theory. –  Leonardo de Moura Apr 5 '12 at 1:55
    
More information about the new nonlinear arithmetic procedure in z3 4.0 can be found here research.microsoft.com/apps/pubs/default.aspx?id=159549 –  Leonardo de Moura Apr 5 '12 at 1:58
1  
@LeonardodeMoura: Repeating earlier comment, in case it missed your attention: Are there some restrictions regarding mixing and matching of integer coefficients? I noticed that the following works:rise4fun.com/Z3Py/xCU, but the integer coefficient version doesn't: rise4fun.com/Z3Py/TDA –  Levent Erkok Apr 18 '12 at 7:53

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