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* <tt>LibraryStrings.mch</tt>: functions manipulating B STRING objects by providing <tt>length</tt>, <tt>append</tt>, <tt>split</tt> and conversion functions <tt>chars</tt>, <tt>codes</tt>. | * <tt>LibraryStrings.mch</tt>: functions manipulating B STRING objects by providing <tt>length</tt>, <tt>append</tt>, <tt>split</tt> and conversion functions <tt>chars</tt>, <tt>codes</tt>. | ||
* <tt>LibraryFiles.mch</tt>: various functions to obtain information about files and directories in the underlying file system | * <tt>LibraryFiles.mch</tt>: various functions to obtain information about files and directories in the underlying file system | ||
* <tt>LibraryIO.def</tt> providing functions to write information to screen or file. Note: these external functions are polymorphic and as such cannot be defined as B constants: you have to use the DEFINITIONS provided in <tt>LibraryIO.def</tt>. | * <tt>LibraryIO.def</tt>: providing functions to write information to screen or file. Note: these external functions are polymorphic and as such cannot be defined as B constants: you have to use the DEFINITIONS provided in <tt>LibraryIO.def</tt>. | ||
* <tt>CHOOSE.def</tt> providing the [http://planetmath.org/encyclopedia/HilbertsEpsilonOperator.html Hilbert choice operator] for choosing a designated element from each set. Again, this function is polymorphic and thus cannot be defined as a B function. This function is useful for defining [[Recursively_Defined_Functions|recursive functions]] over sets (see also [[TLA]]). Note that it in ProB it is undefined for the empty set. | * <tt>CHOOSE.def</tt>: providing the [http://planetmath.org/encyclopedia/HilbertsEpsilonOperator.html Hilbert choice operator] for choosing a designated element from each set. Again, this function is polymorphic and thus cannot be defined as a B function. This function is useful for defining [[Recursively_Defined_Functions|recursive functions]] over sets (see also [[TLA]]). Note that it in ProB it is undefined for the empty set. | ||
To use a library machine you can use the <tt>SEES</tt> mechanism: | To use a library machine you can use the <tt>SEES</tt> mechanism: |
As of version 1.3.5-beta7 ProB can make use of externally defined functions.
These functions must currently be written in Prolog (in principle C, Java, Tcl or even other languages can be used via the SICStus Prolog external function interfaces).
These functions can be used to write expression, predicates, or substitutions.
The general mechanism that is used is to mark certain DEFINITIONS as external, in which case ProB will make use of external Prolog code rather than using the right-hand-side of the DEFINITION whenever it is used. However, these DEFINITIONS can often (unless they are polymorphic) be wrapped into B (constant) functions. If you just want to use the standard external functions already defined by ProB, then you don't have to understand this mechanism in detail (or at all).
In a first instance we have predefined a series of external functions and grouped them in various library machines and definition files:
To use a library machine you can use the SEES mechanism:
SEES LibraryMath
In general you can do the following with an external function, such as sin, wrapped into a constant:
To use a library definition file, you need to include the file in the DEFINITIONS clause:
DEFINITIONS "LibraryIO.def"
Currently, external functions are linked to classical B machines using B DEFINITIONS as follows:
Usually, it is also a good idea to encapsulate the external function inside a CONSTANT which is defined as a lambda abstraction with as body simply the call to the first DEFINITION. For COS this would be cos = %x.(x:NATURAL|COS(x)). Observe that for Atelier-B this is a tautology. For ProB, the use of such a constant allows one to have a real B function representing the external function, for which we can compute the domain, range, etc.
For the typing of an external function NAME with type TYPE there are three possibilities, depending on whether the function is a function, a predicate or a substitution:
In case the external function is polymorhpic, the DEFINITION can take extra arguments: each argument is treated like a type variable. For example, the following is used in CHOOSE.def to declare the Hilbert choice operator: