Using ProB with Atelier B: Difference between revisions

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* Closure: The transitive and reflexive closure operator of classical B is not supported as defined in the B-Book by Abrial. AtelierB also does not support the operator as defined in the B-Book (as this version cannot be applied in practice). For the reflexive component of closure, ProB will compute the elements in the domain and range of the relation.  
* Closure: The transitive and reflexive closure operator of classical B is not supported as defined in the B-Book by Abrial. AtelierB also does not support the operator as defined in the B-Book (as this version cannot be applied in practice). For the reflexive component of closure, ProB will compute the elements in the domain and range of the relation.  


Note however, that the transitive closure operator closure1 is fully supported, and hence one can translate an expression closure(e), where e is a binary relation over some domain d, into the expression closure1(e) \/ id(d).
Note however, that the transitive closure operator <tt>closure1</tt> is fully supported, and hence one can translate an expression <tt>closure(e)</tt>, where e is a binary relation over some domain d, into the expression <tt>closure1(e) \/ id(d</tt>).


* Unsupported Operators:
* Unsupported Operators:
** fnc, rel: These operators are not supported. Also, succ and pred are only supported when applied to numbers (i.e., succ(x) is supported; dom(succ) is not).
** Trees and binary trees: These constructs are not supported (the <tt>STRING</tt> type is now supported);  
** Trees and binary trees: These constructs are not supported (the STRING type is now supported);  
** <tt>VALUES</tt>: This clause of the <tt>IMPLEMENTATION</tt> machines is not yet supported;
** VALUES: This clause of the IMPLEMENTATION machines is not yet supported;


* There are also some general limitations wrt refinements. See [[Current Limitations#Multiple Machines and Refinements]] for more details.
* There are also some general limitations wrt refinements. See [[Current Limitations#Multiple Machines and Refinements]] for more details.

Revision as of 16:06, 27 February 2012


As of version 1.3, ProB contains a much improved parser which tries be compliant with Atelier B as much as possible.

Atelier B Plugin

There is also a plugin for Atelier B for use withthe standalone Tcl/Tk Version on Atelier B projects.

Differences with Atelier B

Extra Features of ProB

  • Identifiers: ProB also allows identifiers consisting of a single letter.
  • Typing:
    • ProB makes use of a unification-based type inference algorithm. As such, typing information can not only flow from left-to-right inside a formula, but also from right-to-left. For example, it is sufficient to type xx<:yy & yy<:NAT instead of typing both xx and yy in ProB.
    • Similar to Rodin, ProB extracts typing information from all predicates. As such, it is sufficient to type xx/:{1,2} instead of xx.
  • DEFINITIONS: the definitions and its arguments are checked by ProB. We believe this to be an important feature for a formal method language. However, as such, every DEFINITION must be either a predicate, an expression or a substitution. You cannot use, for example, lists of identifiers as a definition. Also, for the moment, the arguments to DEFINITIONS have to be expressions.

Limitations

  • Parsing: ProB will require parentheses around the comma, the relational composition, and parallel product operators. For example, you cannot write r2=rel;rel. You need to write r2=(rel;rel). This allows ProB to distinguish the relational composition from the sequential composition (or other uses of the semicolon).
  • Clarity: ProB will try to check if your predicates are well-defined during animation or model checking. For this ProB assumes (similar to Rodin) a stricter left-to-right definition of clarity than Atelier B.


  • Closure: The transitive and reflexive closure operator of classical B is not supported as defined in the B-Book by Abrial. AtelierB also does not support the operator as defined in the B-Book (as this version cannot be applied in practice). For the reflexive component of closure, ProB will compute the elements in the domain and range of the relation.

Note however, that the transitive closure operator closure1 is fully supported, and hence one can translate an expression closure(e), where e is a binary relation over some domain d, into the expression closure1(e) \/ id(d).

  • Unsupported Operators:
    • Trees and binary trees: These constructs are not supported (the STRING type is now supported);
    • VALUES: This clause of the IMPLEMENTATION machines is not yet supported;