Using ProB with Z3: Difference between revisions

 
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= How to install Z3 for ProB =
= How to install Z3 for ProB =
First of all, download a nightly build of ProB from the [[Download|Downloads]] page. To connect Z3 to ProB you also need the proper extension.
For Linux and Mac OS, the extension is built on our infrastructure and ships with the regular ProB download. You don't need to install Z3 on your system.
For Linux and Mac OS, the extension is built by on our infrastructure and ships with the regular ProB download.
For Windows, you can download it from the following URLs:
* [https://www3.hhu.de/stups/downloads/z3interface/windows32/z3interface.dll 32bit]
* [https://www3.hhu.de/stups/downloads/z3interface/windows64/z3interface.dll 64bit]
and place it in the "lib" folder of the ProB nightly build.
 
In addition to ProB, you need to install Z3 by downloading it from [https://github.com/Z3Prover Z3's GitHub page]. Previously, ProB 1.6 was linked against the stable release 4.4.1 of Z3. Current nightly builds of ProB work with version 4.8.7 of Z3.
Inside the zip file of Z3 you will find a folder called "bin" with the z3 binary and the belonging libraries inside.
 
These Z3 libraries have to be made available to ProB. On Linux or Mac, this can either be done by placing them in an appropriate folder (like /usr/lib or /usr/local/lib) or by setting an environmental variable (like LD_LIBRARY_PATH on Linux or DYLD_LIBRARY_PATH on Mac).
On Windows, you can place z3.dll in the main folder of the ProB distribution, i. e., on the same level as the lib directory, not inside it.
If the libraries can not be loaded, ProB will answer with "solver_not_available" when Z3 is queried.
 
* Versions 4.8.8 and 4.8.9 of Z3 are currently not recommended for use with ProB. An [https://github.com/Z3Prover/z3/issues/4699 issue in the model extraction] can lead to erroneous models.


= What can be translated =
= What can be translated =
Currently, the Z3 translation is unable to cope with the following constructs:
Currently, the Z3 translation is unable to cope with the following constructs:
* Strings
* Generalised union, generalised intersection
* Generalised concatenation
* Generalised concatenation
* Permutation
* Permutation
* Iteration and Closure
* Iteration and Closure
* Projection


When using Z3 alone, the solver will report "unsupported_type_or_expression" if it can not handle parts of a constraint.
When using Z3 alone, the solver will report "unsupported_type_or_expression" if it can not handle parts of a constraint.
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  >>> :z3 X<Y & Y<X & X:INTEGER
  >>> :z3 X<Y & Y<X & X:INTEGER
  PREDICATE is FALSE
  PREDICATE is FALSE
Now an example which can be solved by ProB’s own solver:
>>> (2|->4):{y|#x.(y=(x|->x+2))}
PREDICATE is TRUE
This one cannot be solved by earlier versions of Z3 and ProB (but can now be solved in the latest nightly release):
>>> :z3 (2|->4):{y|#x.(y=(x|->x+2))}
PREDICATE is UNKNOWN: solver_answered_unknown


Here an example that shows that Z3 can be used to solve constraints and obtain solutions for the open variables:
Here an example that shows that Z3 can be used to solve constraints and obtain solutions for the open variables:
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* [https://www3.hhu.de/stups/downloads/z3interface/rawdata raw data] from our benchmarks including the R scripts to generate the
* [https://www3.hhu.de/stups/downloads/z3interface/rawdata raw data] from our benchmarks including the R scripts to generate the
* [https://www3.hhu.de/stups/downloads/z3interface/output resulting graphs].
* [https://www3.hhu.de/stups/downloads/z3interface/output resulting graphs].
A [https://link.springer.com/article/10.1007/s10009-022-00682-y journal paper] describing an extended interface to Z3 and alternative translation from B to SMT-LIB using Lambda functions has been published in the International Journal on Software Tools for Technology Transfer in 2022.

Latest revision as of 07:39, 6 June 2023


The current nightly versions of ProB can make use of Z3 as an alternate way of solving constraints.

How to use Z3 within ProB

One can start a REPL (Read-Eval-Print-Loop) by starting probcli with the '-repl' command line option. Any predicate preceded with :z3 will be solved by Z3 considering the current machine's state. The command :z3-free can be used to solve a constraint without considering the current machine's state. The full integration of Z3 and ProB’s kernel can be enabled by setting the corresponding preference by passing

-p SMT SUPPORTED INTERPRETER TRUE

on the command line.

How to install Z3 for ProB

For Linux and Mac OS, the extension is built on our infrastructure and ships with the regular ProB download. You don't need to install Z3 on your system.

What can be translated

Currently, the Z3 translation is unable to cope with the following constructs:

  • Generalised concatenation
  • Permutation
  • Iteration and Closure

When using Z3 alone, the solver will report "unsupported_type_or_expression" if it can not handle parts of a constraint.

When used together with ProB, everything Z3 can not be coped with will be handled by ProB alone automatically.

Examples

Using the repl, one can try out different examples.

First an example which can be solved by Z3 and not by ProB:

>>> X<Y & Y<X & X:INTEGER
% Timeout when posting constraint:
% kernel_objects:(_981727#>0)
### Warning: enumerating X : INTEGER : inf:sup ---> -1:3
Existentially Quantified Predicate over X,Y is UNKNOWN
[FALSE with ** ENUMERATION WARNING **]

Using the Z3 translation it can be solved:

>>> :z3 X<Y & Y<X & X:INTEGER
PREDICATE is FALSE

Here an example that shows that Z3 can be used to solve constraints and obtain solutions for the open variables:

>>> :z3 {x} /\ {y} /= {} & x:1000000..20000000 & y>=0 & y<2000000
PREDICATE is TRUE
Solution:
      x = 1000000
      y = 1000000

As of version 1.10.0-beta4 you can also issue the <t>:z3-version</t> command in the REPL to obtain version information.

More details

A paper describing the integration of ProB and Z3 has been published at iFM 2016. You can download the

A journal paper describing an extended interface to Z3 and alternative translation from B to SMT-LIB using Lambda functions has been published in the International Journal on Software Tools for Technology Transfer in 2022.