Handbook/B Language

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Current Limitations

ProB in general requires all deferred sets to be given a finite cardinality. If no cardinality is specified, a default size will be used. Also, unless finite bounds can be inferred by the ProB constraint solver, mathematical integers will only be enumerated within MININT to MAXINT (and ProB will generate enumeration warnings in case no solution is found).

Other general limitations are:

  • Trees and binary trees. These constructs are specific to the AtelierB tool and are only partially supported;
  • Definitions. Definitions (from the DEFINITIONS clause) with arguments are supported, but in contrast to AtelierB they are parsed independently and have to be either an expression, a predicate, or a substitution; definitions which are predicates or substitutions must be declared before first use. Also: the arguments of DEFINITIONS have to be expressions. Finally, when replacing DEFINITIONS the associativity is not changed. E.g., with PLUS(x,y) == x+y, the expression PLUS(2,3)*10 will evaluate to 50 (and not to 32 as with Atelier-B).

Also, ProB will generate a warning when variable capture may occur.

  • There are also limitations with refinements. See below;
  • VALUES This clause of IMPLEMENTATION machines is not yet fully supported;
  • 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). You also generally need to put BEGIN and END around the sequential composition operator, e.g., Op = BEGIN x:=1;y:=2 END.

See the page Using ProB with Atelier B for more details.

Multiple Machines and Refinements

It is possible to use multiple classical B machines with ProB. However, ProB may not enforce all of the classical B visibility rules (although we try to). As far as the visibility rules are concerned, it is thus a good idea to check the machines in another B tool, such as Atelier B or the B-Toolkit.

While refinements are supported, the preconditions of operations are not propagated down to refinement machines. This means that you should rewrite the preconditions of operations (and, if necessary, reformulate them in terms of the variables of the refinement machine). Also, the refinement checker does not yet check the gluing invariant.

Note however, that for Rodin Event-B models we now support multi-level animation and validation.

Summary of B Syntax

Summary of B Syntax

Below we describe the "classical" B syntax as supported by ProB. You may also wish to consult

Logical predicates

 P & Q        conjunction
 P or Q       disjunction
 P => Q       implication
 P <=> Q      equivalence
 not(P)       negation
 !(x).(P=>Q)  universal quantification
 #(x).(P&Q)   existential quantification
 btrue        truth (this is a predicate)
 bfalse       falsity (this is a predicate)

Above, P and Q stand for predicates. Inside the universal quantification, P must give a value type to the quantified variable. Note: you can also introduce multiple variables inside a universal or existential quantification, e.g., !(x,y).(P => Q).


 E = F   equality
 E /= F  disequality


 TRUE     truth value (this is an expression)
 FALSE    falsity value (this is an expression)
 BOOL     set of boolean values ({TRUE,FALSE})
 bool(P)  convert predicate into BOOL value

Warning: TRUE and FALSE are expression values and not predicates in B and cannot be combined using logical connectives. To combine two boolean values x and y using conjunction you have to write x=TRUE & y=TRUE. To convert a predicate such as z>0 into a boolean value you have to use bool(z>0).


 {}              empty set
 {E}             singleton set
 {E,F}           set enumeration
 {x|P}           comprehension set
 {(x).P|E}       Event-B style comprehension set (brackets needed)
 POW(S)          power set
 POW1(S)         set of non-empty subsets
 FIN(S)          set of all finite subsets
 FIN1(S)         set of all non-empty finite subsets
 card(S)         cardinality
 S*T             cartesian product
 S\/T            set union
 S/\T            set intersection
 S-T or S \ T    set difference
 E:S             element of
 E/:S            not element of
 S<:T            subset of
 S/<:T           not subset of
 S<<:T           strict subset of
 S/<<:T          not strict subset of
 union(S)        generalised union over sets of sets
 inter(S)        generalised intersection over sets of sets
 UNION(z).(P|E)  generalised union with predicate
 INTER(z).(P|E)  generalised intersection with predicate


 INTEGER         set of integers
 NATURAL         set of natural numbers
 NATURAL1        set of non-zero natural numbers
 INT             set of implementable integers (MININT..MAXINT)
 NAT             set of implementable natural numbers
 NAT1            set of non-zero implementable natural numbers
 n..m            set of numbers from n to m
 MININT          the minimum implementable integer
 MAXINT          the maximum implementable integer
 m>n             greater than
 m<n             less than
 m>=n            greater than or equal
 m<=n            less than or equal
 max(S)          maximum of a set of numbers
 min(S)          minimum of a set of numbers
 m+n             addition
 m-n             difference
 m*n             multiplication
 m/n             division
 m**n            power
 m mod n         remainder of division
 PI(z).(P|E)     set product
 SIGMA(z).(P|E)  set summation
 succ(n)         successor (n+1)
 pred(n)         predecessor (n-1)
 0xH             hexadecimal literal, where H is a sequence of letters in [0-9A-Fa-f]


 S<->T         relation
 S<<->T        total relation
 S<->>T        surjective relation
 S<<->>T       total surjective relation
 E|->F         maplet
 dom(r)        domain of relation
 ran(r)        range of relation
 id(S)         identity relation
 S<|r          domain restriction
 S<<|r         domain subtraction
 r|>S          range restriction
 r|>>S         range subtraction
 r~            inverse of relation
 r[S]          relational image
 r1<+r2        relational overriding (r2 overrides r1)
 r1><r2        direct product (all pairs (x,(y,z)) with x,y:r1 and x,z:r2)
 (r1;r2)       relational composition {x,y| x|->z:r1 & z|->y:r2}
 (r1||r2)      parallel product (all pairs ((x,v),(y,w)) with x,y:r1 and v,w:r2)
 prj1(S,T)     projection function (usage prj1(Dom,Ran)(Pair))
 prj2(S,T)     projection function (usage prj2(Dom,Ran)(Pair))
               prj1(Pair) and prj2(Pair) are also allowed
 fnc(r)        translate relation A<->B into function A+->POW(B)
 rel(r)        translate relation A<->POW(B) into relation A<->B
 closure1(r)   transitive closure
 closure(r)    reflexive & transitive closure
               (equal to id(TYPEOF_r) \/ closure1(r))
 iterate(r,n)  iteration of r with n>=0
               (Note: iterate(r,0)=id(s) where s=TYPEOF_r)


 S+->T         partial function
 S-->T         total function
 S+->>T        partial surjection
 S-->>T        total surjection
 S>+>T         partial injection
 S>->T         total injection
 S>+>>T        partial bijection
 S>->>T        total bijection
 %x.(P|E)      lambda abstraction
 f(E)          function application
 f(E1,...,En)  is also supported (as well as f(E1|->E2...|->En))


 [] or <>  empty sequence
 [E]       singleton sequence
 [E,F]     constructed sequence
 seq(S)    set of sequences over S
 seq1(S)   set of non-empty sequences over S
 iseq(S)   set of injective sequences over S
 iseq1(S)  set of non-empty injective sequences over S
 perm(S)   set of bijective sequences (permutations) over S
 size(s)   size of sequence
 s^t       concatenation
 E->s      prepend element
 s<-E      append element
 rev(s)    reverse of sequence
 first(s)  first element
 last(s)   last element
 front(s)  front of sequence (all but last element)
 tail(s)   tail of sequence (all but first element)
 conc(S)   concatenation of sequence of sequences
 s/|\n     take first n elements of sequence
 s\|/n     drop first n elements from sequence


 struct(ID:S,...,ID:S)  set of records with given fields and field types
 rec(ID:E,...,ID:E)     construct a record with given field names and values
 E'ID                   get value of field with name ID


 ID    must start with letter (ASCII or Unicode), can then contain
       letters (ASCII or Unicode), digits and underscore (_) and
       can end with Unicode subscripts followed by Unicode primes
 M.ID  composed identifier for identifier coming from included machine M
 `ID`  an identifier in backquotes can contain almost any character (except newline)


 "astring"      a specific (single-line) string value
 '''astring'''  an alternate way of writing (multi-line) strings, no need to escape "
 ```tstring```  template strings, where ${Expr} parts are evaluated and converted to string,
                you can provide options separated by commas in square brackets like $[2f]{Expr}.
                Valid options are: Nf (for floats/reals), Nd (for integer), Np (padding),
                ascii (can be abbreviated to a), unicode (can be abbreviated to u).
 STRING         the set of all strings

Atelier-B does not support any operations on strings, apart from equality and disequality. In ProB, however, some of the sequence operators work also on strings:

 size(s)   the length of a string s
 rev(s)    the reverse of a string s
 s ^ t     the concatenation of two strings
 conc(ss)  the concatenation of a sequence of strings

You can turn this support off using the STRING_AS_SEQUENCE preference. The library LibraryStrings.def in stdlib contains additional useful external functions (like TO_STRING, STRING_SPLIT, FORMAT_TO_STRING, INT_TO_HEX_STRING, ...).

ProB also allows multi-line strings.

As of version 1.7.0, ProB will support the following escape sequences within strings:

 \n  newline (ASCII character 13)
 \r  carriage return (ASCII 10)
 \t  tab (ASCII 9)
 \"  the double quote symbol "
 \'  the single quote symbol '
 \\  the backslash symbol

Within single-line string literals, you do not need to escape '. Within multi-line string literals, you do not need to escape " and you can use tabs and newlines.

ProB assumes that all B machines and strings use the UTF-8 encoding.


 REAL        set of reals
 FLOAT       set of floating point numbers
 i.f         real literal in decimal notation, where i and f are natural numbers
 i.fEg       real literal in scientific notation, where i,f are natural numbers and g is an integer
 real(n)     convert an integer n into a real number
 floor(r)    convert a real r into an integer
 ceiling(r)  convert a real r into an integer

One can also use a lowercase e for literals in scientific notation (e.g. 1.0e-10). Standard arithmetic operators can be applied to reals: +, - , *, /, SIGMA, PI. Exponentiation of a real with an integer is also allowed. The comparison predicates =, /=, <, >, <=, >= also all work. Support for reals and floats is experimental. The definition in Atelier-B is also not stable yet. Currently ProB supports floating point numbers only. Warning: properties such as associativity and commutativity of arithmetic operators thus do not hold. The library LibraryReals.def in stdlib contains additional useful external functions (like RSIN, RCOS, RLOG, RSQRT, RPOW, ...). You can turn off support for REALS using the preference ALLOW_REALS. The REAL_SOLVER preference how constraints are solved.


Nodes in the tree are denoted by index sequences (branches), e.g, n=[1,2,1] Each node in the tree is labelled with an element from a domain S. A tree is a function mapping of branches to elements of the domain S.

 tree(S)       set of trees over domain S
 btree(S)      set of binary trees over domain S
 top(t)        top of a tree
 const(E,s)    construct a tree from info E and sequence of subtrees s
 rank(t,n)     rank of the node at end of branch n in the tree t
 father(t,n)   father of the node denoted by branch n in the tree t
 son(t,n,i)    the ith son of the node denoted by branch n in tree t
 sons(t)       the sequence of sons of the root of the tree t
 bin(E)        construct a binary tree with a single node E
 bin(tl,E,tr)  construct a binary tree with root info E and subtrees tl,tr
 left(t)       the left (first) son of the root of the binary tree t
 right(t)      the right (last) son of the root of the binary tree t
 sizet(t)      the size of the tree (number of nodes)
 prefix(t)     the nodes of the tree t in prefix order
 postfix(t)    the nodes of the tree t in prefix order
 mirror, infix are recognised by the parser but not yet supported by ProB itself


ProB allows the following for predicates, expressions and substitutions:

 IF P THEN E1 END                    conditional branching
 IF P THEN E1 ELSIF E2 END           we also allow multiple ELSIF branches
 IF P THEN E1 ELSE E2 END            but you always need an ELSE branch for expressions and predicates
 LET x1,... BE x1=E1 & ... IN E END  introduce local variables

Note: the expression Ei defining xi is allowed to use x1,...,x(i-1) for predicates/expressions. By setting the preference ALLOW_COMPLEX_LETS to TRUE, this is also allowed for substitutions.

Statements (aka Substitutions)

 skip                                                      no operation
 x := E                                                    assignment
 f(x) := E                                                 functional override
 x :: S                                                    choice from set
 x : (P)                                                   choice by predicate P (constraining x; previous value of x is x$0)
 x <-- OP(x)                                               call operation and assign return value
 G||H                                                      parallel substitution**
 G;H                                                       sequential composition**
 ANY x,... WHERE P THEN G END                              non deterministic choice
 LET x,... BE x=E & ... IN G END
 VAR x,... IN G END                                        generate local variables
 WHEN P THEN G END                                         is a synonym for SELECT P THEN G END

**: cannot be used at the top-level of an operation, but needs to be wrapped inside a BEGIN END or another statement (to avoid confusion with the operators ; and || on relations).

Machine header


Note: machine parameters can either be SETS (if identifier is all upper-case) or scalars (i.e., integer, boolean or SET element; if identifier is not all upper-case; typing must be provided be CONSTRAINTS)

You can also use MODEL or SYSTEM as a synonym for MACHINE, as well as EVENTS as a synonym for OPERATIONS. ProB also supports the ref keyword of Atelier-B for event refinement.

Machine sections

 CONSTRAINTS         P                     (logical predicate)
 SETS                S;T={e1,e2,...};...
 FREETYPES           x=x1,x2(arg2),...;...
 CONSTANTS           x,y,...
 PROPERTIES          P                     (logical predicate)
 DEFINITIONS         m(x,...) == BODY;...
 VARIABLES           x,y,...
 INVARIANT           P                     (logical predicate)
 ASSERTIONS          P;...;P               (list of logical predicates separated by ;)
 INITIALISATION      S                     (substitution)
 OPERATIONS          O;...                 (operations)

Machine inclusion

 USES      list of machines
 INCLUDES  list of machines
 SEES      list of machines
 EXTENDS   list of machines
 PROMOTES  list of operations
 REFINES   machine

Note: Refinement machines should express the operation preconditions in terms of their own variables.


 NAME1 == Expression;     Definition without arguments
 NAME2(ID,...,ID) == E2;  Definition with arguments
 "FILE.def";              Include definitions from file

There are a few specific definitions which can be used to influence ProB:

 GOAL == P                          to define a custom Goal predicate for Model Checking
                                    (the Goal is also set by using "Advanced Find...")
 SCOPE == P                         to limit the search space to "interesting" nodes
 scope_SETNAME == n..n              to define custom cardinality for set SETNAME
 scope_SETNAME == n                 equivalent to 1..n
 SET_PREF_MAX_INITIALISATIONS == n  max. number of intialisations computed
 SET_PREF_MAX_OPERATIONS == n       max. number of enablings per operation computed
 MAX_OPERATIONS_OPNAME == n         max. number of enablings for the operation OPNAME
 SET_PREF_TIME_OUT == n             time out for operation computation in ms
 ASSERT_LTL... == "LTL Formula"  	using X,F,G,U,R LTL operators +
                                    Y,O,H,S Past-LTL operators +
                                    atomic propositions: e(OpName), [OpName], {BPredicate}
 HEURISTIC_FUNCTION == n            in directed model-checking mode nodes with smalles value will be processed first

The following definitions allow providing a custom state visualization (n can be empty or a number):

 ANIMATION_FUNCTIONn == e                           a function (INT*INT) +-> INT or an INT
 ANIMATION_FUNCTION_DEFAULT == e                    a function (INT*INT) +-> INT or an INT
                                                    instead of any INT above you can also use BOOL or any SET
                                                    as a result you can also use STRING values,
                                                    or even other values which are pretty printed
 ANIMATION_IMGn == "PATH to .gif"                   a path to a gif file
 ANIMATION_STRn == "sometext"                       a string without spaces;
                                                    the result integer n will be rendered as a string
 ANIMATION_STR_JUSTIFY_LEFT == TRUE                 computes the longest string in the outputs and pads
                                                    the other strings accordingly
 SET_PREF_TK_CUSTOM_STATE_VIEW_PADDING == n         additional padding between images in pixels
 SET_PREF_TK_CUSTOM_STATE_VIEW_STRING_PADDING == n  additional padding between text in pixels

The following definitions allow providing a custom state graph (n can be empty or a number):

 CUSTOM_GRAPH_NODESn == e  define a set of nodes to be shown,
                           nodes can also be pairs (Node,Colour), triples (Node,Shape,Colour) or
                           records or sets of records like
                           rec(color:Colour, shape:Shape, style:Style, label:Label, value:Node, ...)
                           Colours are strings of valid Dot/Tk colors (e.g., "maroon" or "red")
                           Shapes are strings of valid Dot shapes (e.g., "rect" or "hexagon"), and
                           Styles are valid Dot shape styles (e.g., "rounded" or "solid" or "dashed")
 CUSTOM_GRAPH_EDGESn == e  define a relation to be shown as a graph
                           edges can either be pairs (node1,node2) or triples (node1,Label,node2)
                           where Label is either a Dot/Tk color or a string or value representing
                           the label to be used for the edges

In both cases e can also be a record which defines default dot attributes like color, shape, style and description, e.g.:

 CUSTOM_GRAPH_NODES == rec(color:"blue", shape:"rect", style:"filled", nodes:e);
 CUSTOM_GRAPH_EDGES == rec(color:"red", style:"dotted", dir:"none", penwidth:2, edges:e)

Alternatively, the complete graph can be put into one definition using CUSTOM_GRAPH. You have to define a single CUSTOM_GRAPH definition of a record with global graph attributes

  (like rankdir or layout) and optionally with edges and nodes attributes (replacing
   CUSTOM_GRAPH_EDGES and CUSTOM_GRAPH_NODES respectively), e.g.:
    CUSTOM_GRAPH == rec(layout:"circo", nodes:mynodes, edges:myedges)

You can now also use a single CUSTOM_GRAPH definition of a record with global graph attributes (like rankdir or layout) and optionally with edges and nodes attributes (replacing CUSTOM_GRAPH_EDGES and CUSTOM_GRAPH_NODES respectively), e.g.:

 CUSTOM_GRAPH == rec(layout:"circo", nodes:mynodes, edges:myedges)

You can also provide SEQUENCE_CHART_opname definitions for generating UML sequence charts.

These DEFINITIONS affect VisB:

 VISB_JSON_FILE == "PATH to .json"  a path to a default VisB JSON file for visualisation;
                                    if it is "" an empty SVG will be created
 VISB_SVG_OBJECTSn == ...           define a record or set of records for creating new SVG objects
 VISB_SVG_UPDATESn == ...           define a record or set of records containing updates of SVG objects
 VISB_SVG_HOVERSn == ...            define a record or set of records for VisB hover functions
 VISB_SVG_BOX == ...                record with dimensions (height, width) of a default empty SVG
 VISB_SVG_CONTENTS == ...           defines a string to be included into a created empty SVG file

Comments and Pragmas

B supports two styles of comments:
 /* ... */  block comments
 // ...     line comments

ProB recognises several pragma comments of the form /*@ PRAGMA VALUE */ The whitespace between @ and PRAGMA is optional.

 /*@symbolic */             put before comprehension set, lambda, union or composition to instruct ProB
                            to keep it symbolic and not try to compute it explicitly
 /*@label LBL */            associates a label LBL with the following predicate
                            (LBL must be identifier or a string "....")
 /*@desc DESC */            associates a description DESC with the preceding predicate or
                            introduced identifier (in VARIABLES, CONSTANTS,... section)
                            There are three special descriptions:
                            /*@desc memo*/          to be put after identifiers in the ABSTRACT_CONSTANTS section
                                                    indicating that these functions should be memoized
                            /*@desc expand*/        to be put after identifiers (in VARIABLES, CONSTANTS,... section)
                                                    indicating that they should be expanded and not kept symbolically
                            /*@desc prob-ignore */  to be put after predicates (e.g., in PROPERTIES) which
                                                    should be ignored by ProB
                                                    when the preference USE_IGNORE_PRAGMAS is TRUE
 /*@file PATH */            associates a file for machines in SEES, INCLUDES, ...
                            put pragma after a seen or included machine
 /*@package NAME */         at start of machine, machine file should be in folder NAME/...
                            NAME can be qualified N1.N2...Nk, in which case the machine
                            file should be in N1/N2/.../Nk
 /*@import-package NAME */  adds ../NAME to search paths for SEES,...
                            NAME can also be qualified N1.N2...Nk, use after package pragma
 /*@generated */            can be put at the top of a machine file; indicates the machine
                            is generated from some other source

File Extensions

 .mch   for abstract machine files
 .ref   for refinement machines
 .imp   for implementation machines
 .def   for DEFINITIONS files
 .rmch  for Rules machines for data validation

Free Types

More information can be found here.

Free types exist in Z and in the Rodin theory plugin and are supported by ProB. You can also define new free types in classical B by adding a FREETYPES clause with free type definitions separated by semicolon.

Here is a definition of an inductive type IntList for lists of integers constructed using inil and icons:

  IntList = inil, icons(INTEGER*IntList)

Differences with AtelierB/B4Free

Basically, ProB tries to be compatible with Atelier B and conforms to the semantics of Abrial's B-Book and of Atelier B's reference manual. Here are the main differences with Atelier B:

 - tuples without parentheses are not supported; write (a,b,c) instead of a,b,c
 - relational composition has to be wrapped into parentheses; write (f;g)
 - parallel product also has to be wrapped into parentheses; write (f||g)
 - not all tree operators are supported
 - the VALUES clause is only partially supported
 - definitions have to be syntactically correct and be either an expression,
   predicate or substitution;
   the arguments to definitions have to be expressions;
   definitions which are predicates or substitutions must be declared before first use
 - definitions are local to a machine
 - for ProB the order of fields in a record is not relevant (internally the fields are
   sorted), Atelier-B reports a type error if the order of the name of the fields changes
 - well-definedness: for disjunctions and implications ProB uses the L-system
   of well-definedness (i.e., for P => Q, P should be well-defined and
   if P is true then Q should also be well-defined)
 - ProB allows WHILE loops and sequential composition in abstract machines
 - ProB now allows the IF-THEN-ELSE and LET for expressions and predicates
   (e.g., IF x<0 THEN -x ELSE x END or LET x BE x=f(y) IN x+x END)
 - ProB's type inference is stronger than Atelier-B's, much less typing predicates
   are required
 - You can apply prj1 and prj2 without providing the type arguments, e.g., prj2(prj1(1|->2|->3))
 - ProB accepts operations with parameters but without pre-conditions
 - ProB allows identifiers consisting of a single character and identifiers in single backquotes (`id`)
 - ProB allows to use <> for the empty sequence (but this use is deprecated)
 - ProB allows escape codes (\n, \', \", see above) and supports UTF-8 characters in strings,
   and ProB allows multi-line string literals written using three apostrophes ('''string''')
   as well as template strings using three backquotes (e.g., ```1+2=${1+2}```)
 - ProB allows a she-bang line in machine files starting with #!
 - ProB allows btrue and bfalse as predicates in B machines
 - ProB allows to use the Event-B relation operators <<->, <->>, <<->>
 - ProB allows set comprehensions with an extra expression like {x•x:1..10|x*x}.
 - The FREETYPES section and the external libraries (LibraryStrings.def, ...) do not exist in Atelier-B

See also our Wiki for documentation:

Also note that there are various differences between BToolkit and AtelierB/ProB:

 - AtelierB/ProB do not allow true as predicate;
   e.g., PRE true THEN ... END is not allowed (use BEGIN ... END instead)
   ProB now allows btrue and bfalse to be used as predicates.
 - AtelierB/ProB do not allow a machine parameter to be used in the PROPERTIES
 - AtelierB/ProB require a scalar machine parameter to be typed in the
 - In AtelierB/ProB the BOOL type is pre-defined and cannot be redefined

If you discover more differences, please let us know!

Other notes

 ProB now supports the Unicode mathematical symbols, exactly like Atelier-B
 ProB is best at treating universally quantified formulas of the form
   !x.(x:SET => RHS), or
   !(x,y).(x|->y:SET =>RHS), 
   !(x,y,z).(x|->y|->z:SET =>RHS), ...;
 otherwise the treatment of !(x1,...,xn).(LHS => RHS) may delay until all values
 treated by LHS are known.
 Similarly, expressions of the form SIGMA(x).(x:SET|Expr) and PI(x).(x:SET|Expr)
 lead to better constraint propagation.
 The construction S:FIN(S) is recognised by ProB as equivalent to the Event-B
 finite(S) operator.
 ProB assumes that machines and STRING values are encoded using UTF-8.

Event-B Syntax

Note that the Event-B syntax in Rodin is slightly different (e.g, no sequences or strings built-in). There is also an Event-B summary by Ken Robinson (File:EventB-summary.pdf). The Event-B syntax is only available for Event-B models in Rodin, ProB2-UI and ProB Jupyter notebooks.


Please help us to improve this documentation by providing feedback in our bug tracker, asking questions in our prob-users group or sending an email to Michael Leuschel.


Out of date icon.png Warning This page has not yet been reviewed. Parts of it may no longer be up to date

ProB requires all constants and variables to be typed. As of version 1.3, ProB uses a new unification-based type inference and checking algorithm. As such, you should be able to use most Atelier B models without problem. On the other hand, certain models that ProB accepts will have to be rewritten to be type checked by Atelier B (e.g., by adding additional typing predicates). Also note that, in contrast to Atelier B, ProB will type check macro DEFINITIONS.

What is a basic type in B

  • BOOL
  • Any name of a set introduced in a SETS clause or introduced as a parameter of the machine
  • POW (τ) (power set) for τ being a type
  • τ1 * τ2 (Cartesian product) for τ1 and τ2 being two types

What needs to be typed

Generally speaking, any constant or variable. More precisely:

  • Constants declared in the CONSTANTS clause must be typed in the PROPERTIES clause;
  • Variables declared in the VARIABLES clause must be typed in the INVARIANT;
  • Arguments of an operation must be typed in the precondition PRE or a top-level SELECT statement of the operation;
  • Variables in universal or existential quantifications;
  • Variables of set comprehensions must be typed in a conjunct of the body of the set comprehension. For example, {xx | xx:NAT & xx>0 & xx<5} is fine, but {xx | xx>0 & xx<5} is not;
  • Variables of lambda abstractions must be typed in the predicate part of the abstraction. For example, %yy.(yy:NAT|yy-1) properly types the variable yy;
  • Variables introduced in ANY statements must be typed in the WHERE part of the statement.

ProB will warn you if a variable has not been given a type.

HINT: The Analyse|Show Typing command reveals the typing that ProB has inferred for your constants and global variables.

Restriction on the Domains of the Variables

Animating and verifying a B specification is in principle undecidable. ProB overcomes this by requiring that the domain of the variables is finite (i.e., with finitely many values) or integer. This ensures that the state space has finite size. Typing of the B specification ensures this restriction.

In the B specification, a set is either defined explicitely, thus being a finite domain, or its definition is deferred. In the later case, the user can indicate the size of the set mySET (without defining its elements) by creating a macro in the DEFINITIONS clause with the name scope_mySET and an integer value (e.g. scope_mySET==2) or a value specified as a range (e.g. scope_mySET == 1..12). The macros with the prefix "scope_" will be used by ProB and do not modify the B specification. If the size of the set is unspecified, ProB considers the set to have a default size. The value for the default size is defined in the Preferences|Animation Preferences... preference window by the preference Size of unspecified sets in SETS section.

The B method enables to specify the size of a set with the card operator in the PROPERTIES clause; this form of constraint is now supported by ProB, provided it is of a simple form card(S)=Nr, where S is a deferred set and Nr a natural number.

Enumeration in ProB

The typing information is used by ProB to enumerate the possible values of a constant or a variable whenever a specification does not narrow down that value to a single value.

For example, if you write xx:NAT & xx=1 ProB does not have to resort to enumeration as the xx=1 constraint imposes a single possible value for xx. However, if you write xx:NAT & xx<3 ProB will enumerate the possible values of xx in order to find those that satisfy the constraints imposed by the machine (here 0,1,2).

ProB will use the constraints to try to cut down the enumeration space, and will resort to enumeration usually only as a last resort. So something like xx:NAT & xx<10 & x>2 & x=5 will not result in enumeration.

The enumeration range for integers is controlled by two preferences in the Preferences|Animation Preferences... preference window: !MinInt, used for expressions such as xx::INT, and !MaxInt, used for expressions such as xx::NAT preferences. Nevertheless, writing xx: NAT & xx = 55 puts the value 55 in x no matter what !MaxInt is set to, as no enumeration is required.

Note that these preferences also apply to the mathematical integers (INTEGER) and natural numbers (NATURAL). In case a mathematical integer or natural number is enumerated (using !MinInt and !MaxInt) a warning is printed on the console.

Deferred Sets

A deferred set in B is declared in the SETS Section and is not explicitly enumerated. In the example below, AA is a deferred set and BB is an enumerated set.

SETS AA; BB={bb,cc,dd}

ProB in general requires all deferred sets to be given a finite cardinality before starting animation or model checking. If no cardinality is specified, a default size will be used (which is controlled by the DEFAULT_SETSIZE preference).

In general (for both probcli and ProB Tcl/Tk) you can set the cardinality of a set AA either by

  • making it an enumerated set, i.e., adding AA = {v1,v2,…} to the SETS clause
  • adding a predicate card(AA) = constant to the PROPERTIES clause
  • Note: various other predicates in the PROPERTIES clause will also influence the size used for AA by ProB, for example:
     - card(AA) > 1
     - aa:AA & bb:AA & aa/=bb
     - AA = {aa,bb} & aa/=bb 
     - …
  • you can add a DEFINITION scope_AA == constant to instruct ProB to set the cardinality of AA to the constant.

Using Refinement for Animation Preferences

Note: instead of adding AA = {aa,bb} to the SETS clause you can also add AA = {aa,bb} & aa/=bb to the PROPERTIES clause. This can also be done in a refinement. A good idea is then to generate a refinement for animation with ProB (which may contain other important settings for animation):

AA = {aa,bb} & aa/=bb

Setting Deferred Set Cardinalities within probcli

From the command-line, using probcli you can use the command-line switch:

-card <GS> <VAL>


probcli my.mch -card PID 5

See manual page for probcli.

Free Types


Free types exist in Z and in the Rodin theory plugin and are supported by ProB. You can also define new free types in classical B by adding a FREETYPES clause with free type definitions separated by semicolon.

Here is a definition of an inductive type IntList for lists of integers constructed using inil and icons:

  IntList = inil, icons(INTEGER*IntList)

What is a Free Type

Free types are sum types [1]. They make it easier to define recursive structures. A free type value may take exactly one of the defined subtypes, with additional payload data, and later the exact subtype can be queried and the payload data retrieved.



The FREETYPES machine clause contains a semicolon separated list of Freetype Definitions:

  <Freetype Definition 1>;
  <Freetype Definition N>

Freetype Definition

Each Freetype Definition consists of an identifier (the name of the free type), followed by an equals symbol and one or more Freetype Constructors separated by commas:

<Identifier> = <Freetype Constructor 1>, ..., <Freetype Constructor N>

Freetype Constructor

A Freetype Constructor may be a single identifier (the name of the free type constructor) or an identifier with a single expression argument (the type of the payload data) in parentheses.



The name of the free type can be used anywhere in the machine as a type identifier (like a set) to define the type of a value.

To actually create a value of the free type one needs to use one of the free type constructors. Free type constructors that do not take an argument can be used as the right side of an assignment as-is, while free type constructors that have an argument need a value parameter of that type - this works like a function call. Because those constructor calls work like function calls, we benefit from the tuple-function syntactic sugar and can use one tuple parameter as a way to represent multiple logical parameters and call the constructor with values separated by commas without having to create a tuple first.

Internally constructors without parameter are just values, while constructors with parameters are functions that take the payload data and return the free type value with the given payload. To check whether a free type value has a specific subtype one can use equality for parameter-less constructors and membership in the range for constructors with a parameter.

To get the contained value out of a free type value one can use the inverse constructor (also called deconstructor), simply created by applying the B operator ~.


In our example from the introduction we have a free type with two constructors that represents a list. The constructor inil represents an empty list and takes no argument, while the icons constructor represents a list head with the first value and the rest of the list combined as a tuple.

To create a list with content we are using the simplified function call syntax, so we do not have to construct the tuple (head, tail) directly.

To get values out of the icons subtype we use the the deconstructor icons~. The resulting value is a tuple which we need to project to the first or second value respectively.

Here we implement a stack:

FREETYPES IntList = inil, icons(INTEGER*IntList)
INVARIANT list : IntList
    push(value) = PRE value : INTEGER THEN
        list := icons(value, list)
    pop = PRE list /= inil THEN
        list := prj2(icons~(list)) 
    value <-- peek = PRE list : ran(icons) THEN
        value := prj1(icons~(list)) 

Example usage in ProB2-UI:

Freetype example 1.png

External Functions

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).

We have a PDF describing the external functions generated from a ProB-Jupyter notebook: File:ExternalFunctions.pdf The Notebook is available and can now be launched via binder.

Standard Libraries provided by ProB

In a first instance we have predefined a series of external functions and grouped them in various library machines and definition files:

  • LibraryMath.mch: defining sin, cos, tan, sinx, cosx, tanx, logx, gcd, msb, random as well as access to all other Prolog built-in arithmetic functions.
  • LibraryStrings.mch: functions manipulating B STRING objects by providing length, append, split and conversion functions chars, codes.
  • LibraryStrings.def used by LibraryStrings.mch: providing direct access to various operators on strings (STRING_LENGTH, STRING_APPEND, STRING_SPLIT INT_TO_STRING,...)
  • LibraryFiles.mch: various functions to obtain information about files and directories in the underlying file system
  • LibraryIO.def: 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 LibraryIO.def.
  • CHOOSE.def: providing the 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 recursive functions over sets (see also TLA). Note that it in ProB it is undefined for the empty set.
  • LibraryMeta.def: providing access to meta-information about the loaded model (PROJECT_INFO), about the state space (HISTORY, STATE_TRANS, ...) and about ProB itself (GET_PREF, PROB_INFO_STR, PROB_INFO_INT,..).
  • LibraryReals.def: providing access to operators on Reals and Floats (RSIN, RCOS, RTAN, REXP, ROUND, RLOG,RSQRT,...).
  • LibraryRegex.def: providing access to regular expression operators on strings (REGEX_MATCH, REGEX_REPLACE, REGEX_SEARCH,...)
  • LibraryCSV.def: contains a READ_CSV external function to read in CSV files or strings and convert them to a B data structure
  • LibrarySVG.def: providing utility functions for VisB (svg_points, svg_axis,...)
  • LibraryXML.def: contains a READ_XML external function to read in XML files or strings and convert them to a B data structure with strings and records. Also contains READ_JSON to read JSON files and converting them to the same B format.
  • LibraryBits.def: contains bit-manipulation functions on integers (BNOT, BAND, BXOR,...).
  • SORT.def: providing sorting related functions (SORT, SQUASH, REPLACE).
  • SCCS.def: providing access to SCCS to compute the strongly connected components of a relation and CLOSURE1 an alternative algorithm for compting the transitive closure of a relation.

Since version 1.5 the standard library is shipped with ProB and references to machines and DEFINITION-files in the standard library are resolved automatically when referenced (see PROBPATH for information about how to customize the lookup path).

To use a library machine you can use the SEES mechanism:

SEES LibraryMath

Note that for rules machines (.rmch) you have to use REFERENCES instead.

In general you can do the following with an external function, such as sin, wrapped into a constant:

  • apply the function: sin(x)
  • compute the image of the function: sin[1..100]
  • compose the function with a finite relation on the left: ([1..100] ; sin)
  • compute the domain of the function: dom(sin)

To use a library definition file, you need to include the file in the DEFINITIONS clause:


Overview of the External Function DEFINITION Mechanism

Currently, external functions are linked to classical B machines using B DEFINITIONS as follows:

  • one definition, which defines the function as it is seen by tools other than ProB (e.g., Atelier-B). Suppose we want to declare an external cosinus function named COS, then this definition could be COS(x) == cos(x).
  • one definition declaring the type of the function. For COS this would be EXTERNAL_FUNCTION_COS == INTEGER --> INTEGER.
  • Prolog code which gets called by ProB in place of the right-hand-side of the first definition

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 polymorphic, 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:


Recursively Defined Functions

Symbolic Functions and Relations

Take the following function:

 parity : (NATURAL --> {0,1}) & 
 parity(0) = 0 & 
 !x.(x:NATURAL => parity(x+1) = 1 - parity(x))

Here, ProB will complain that it cannot find a solution for parity. The reason is that parity is a function over an infinite domain, but ProB tries to represent the function as a finite set of maplets.

There are basically four solutions to this problem:

  • Write a finite function:
parity : (NAT --> {0,1}) & 
parity(0) = 0 & 
!x.(x:NAT & x<MAXINT => parity(x+1) = 1 - parity(x))
  • Rewrite your function so that in the forall you do not refer to values of parity greater than x:
parity : (NATURAL --> {0,1}) & 
parity(0) = 0 & 
!x.(x:NATURAL1 => parity(x) = 1 - parity(x-1))
  • Write your function constructively using a single recursive equation using set comprehensions, lambda abstractions, finite sets and set union. This requires ProB 1.3.5-beta7 or higher and you need to declare parity as ABSTRACT_CONSTANT. Here is a possible equation:
parity : INTEGER <-> INTEGER & 
parity = {0|->0} \/ %x.(x:NATURAL1|1-parity(x-1))

Note, you have to remove the check parity : (NATURAL --> {0,1}), as this will currently cause expansion of the recursive function. We describe this new scheme in more detail below.

  • Another solution is try and write your function constructively and non-recursively, ideally using a lambda abstraction:
  parity : (NATURAL --> INTEGER) & 
  parity = %x.(x:NATURAL|x mod 2)
  • Here ProB detects that parity is an infinite function and will keep it symbolic (if possible). With such an infinite function you can:
    • apply the function, e.g., parity(10001) is the value 1
    • compute the image of the function, e.g., parity[10..20] is {0,1}
    • check if a tuple is a member of the function, e.g., 20|->0 : parity
    • check if a tuple is not a member of the function, e.g., 21|->0 /: parity
    • check if a finite set of tuples is a subset of the function, e.g., {20|->0, 120|->0, 121|->1, 1001|->1} <: parity
    • check if a finite set of tuples is not a subset of the function, e.g., {20|->0, 120|->0, 121|->1, 1001|->2} /<: parity
    • compose the function with a finite relation, e.g., (id(1..10) ; parity) gives the value [1,0,1,0,1,0,1,0,1,0]
    • sometimes compute the domain of the function, here, dom(parity) is determined to be NATURAL. But this only works for simple infinite functions.
    • sometimes check that you have a total function, e.g., parity: NATURAL --> INTEGER can be checked by ProB. However, if you change the range (say from INTEGER to 0..1), then ProB will try to expand the function.
    • In version 1.3.7 we are adding more and more operators that can be treated symbolically. Thus you can now also compose two symbolic functions using relational composition ; or take the transitive closure (closure1) symbolically.

You can experiment with those by using the Eval console of ProB, experimenting for example with the following complete machine. Note, you should use ProB 1.3.5-beta2 or higher. (You can also type expressions and predicates such as parity = %x.(x:NATURAL|x mod 2) & parity[1..10] = res directly into the online version of the Eval console).

MACHINE InfiniteParityFunction
  parity : NATURAL --> INTEGER & 
  parity = %x.(x:NATURAL|x mod 2)
 Inc = BEGIN c:=c+1 END;
 r <-- Parity = BEGIN r:= parity(c) END;
 r <-- ParityImage = BEGIN r:= parity[0..c] END;
 r <-- ParityHistory = BEGIN r:= (%i.(i:1..c+1|i-1) ; parity) END

You may also want to look at the tutorial page on modeling infinite datatypes.

When does ProB treat a set comprehension or lambda abstraction symbolically ?

Currently there are four cases when ProB tries to keep a function such as f = %x.(PRED|E) symbolically rather than computing an explicit representation:

  • the domain of the function is obviously infinite; this is the case for predicates such as x:NATURAL; in version 1.3.7-beta5 or later this has been considerably improved. Now ProB also keeps those lambda abstractions or set comprehensions symbolic where the constraint solver cannot reduce the domain of the parameters to a finite domain. As such, e.g., {x,y,z| x*x + y*y = z*z} or {x,y,z| z:seq(NATURAL) & x^y=z} are now automatically kept symbolic.
  • f is declared to be an ABSTRACT_CONSTANT and the equation is part of the PROPERTIES with f on the left.
  • the preference SYMBOLIC is set to true (e.g., using a DEFINITION SET_PREF_SYMBOLIC == TRUE)
  • a pragma is used to mark the lambda abstraction as symbolic as follows: f = /*@ symbolic */ %x.(PRED|E); this requires ProB version 1.3.5-beta10 or higher. In Event-B, pragmas are represented as Rodin database attributes and one should use the symbolic constants plugin.

Recursive Function Definitions in ProB

As of version 1.3.5-beta7 ProB now accepts recursively defined functions. For this:

  • the function has to be declared an ABSTRACT_CONSTANT.
  • the function has to be defined using a single recursive equation with the name of the function on the left of the equation
  • the right-hand side of the equation can make use of lambda abstractions, set comprehensions, set union and other finite sets

Here is a full example:

 parity : INTEGER <-> INTEGER & 
 parity = {0|->0} \/ %x.(x:NATURAL1|1-parity(x-1))

As of version 1.6.1 you can also use IF-THEN-ELSE and LET constructs in the body of a recursive function. The above example can for example now be written as:

 parity : INTEGER <-> INTEGER & 
 parity = %x.(x:NATURAL|IF x=0 THEN 0 ELSE 1-parity(x-1)END) 

Operations applicable for recursive functions

With such a recursive function you can:

  • apply the function to a given argument, e.g., parity(100) will give you 0;
  • compute the image of the function, e.g., parity[1..10] gives {0,1}.
  • composing it with another function, notably finite sequences: ([1,2] ; parity) corresponds to the "map" construct of functional programming and results in the output [1,0].

Also, you have to be careful to avoid accidentally expanding these functions. For example, trying to check parity : INTEGER <-> INTEGER or parity : INTEGER +-> INTEGER will cause older version of ProB to try and expand the function. ProB 1.6.1 can actually check parity:NATURAL --> INTEGER, but it cannot check parity:NATURAL --> 0..1.

There are the following further restrictions:

  • ProB does not support mutual recursion yet
  • the function is not allowed to depend on other constants, unless those other constants can be valued in a deterministic way (i.e., ProB finds only one possible solution for them)

Memoization for Functions

As of version 1.9.0-beta9 ProB allows you to annotate functions in the ABSTRACT_CONSTANTS section for memoization. Memoization is a technique for storing results of function applications and reusing the result if possible to avoid re-computing the function for the same arguments again.

To enable memoization you either need to

  • annotate the function in the ABSTRACT_CONSTANTS section with the pragma /*@desc memo */
  • set the preference MEMOIZE_FUNCTIONS to true. In this case ProB will try to memoize all functions in the ABSTRACT_CONSTANTS section, unless they are obviously small and finite and can thus be precomputed completely.

Take the following example:

 MACHINE MemoizationTests
   fib /*@desc memo */,
   fact /*@desc memo */
   fib = %x.(x:NATURAL |
            (IF x=0 or x=1 THEN 1
            ELSE fib(x-1)+fib(x-2)
   fact = %x.(x:NATURAL|(IF x=0 THEN 1 ELSE x*fact(x-1) END))
   fib[28..30] = {514229,832040,1346269};
   30|->1346269 : fib;
   30|->1346268 /: fib;
   {x| 30|->x:fib} = {1346269};

Memoization means that the recursive Fibonacci function now runs in linear time rather than in exponential time. Generally, memoization is useful for functions which are complex to compute but which are called repeatedly with the same arguments.

As can be seen above, memoization is active for

  • function calls such as fib(30) (which in turn calls fib(29) and fib(28) which are also memoized)
  • computation of relational image such as fib[28..30], which internally results in three function calls to fib
  • membership predicates of the form x|->y:fib, where x is a known value
  • non-membership predicates of the form x|->y/:fib, where x is a known value

The following points are relevant:

  • Memoization is currently only possible for functions declared in the ABSTRACT_CONSTANTS section
  • Memoization means that all results of function calls are stored. The memoization table is reset when another B machine is loaded or the same B machine is re-loaded.
  • Memoized functions are often treated in a similar way to symbolic functions. If your function is finite and relatively small, it may be better to put the function into the CONCRETE_CONSTANTS section so that it gets computed in its entirety once.
  • Memoization of a function f is currently not active for computations such as dom(f).
  • If a predicate requires the computation of the full function, e.g., ran(f), then the results will be stored and will be available for future function calls or in case the full value is needed again.

With the command-line version probcli you can use the -profile command to obtain some statistics about memoization. An example output is the following one:

ProB profile info after 9670 ms walltime (7217 ms runtime)
No source profiling information available
Recompile ProB with -Dprob_src_profile=true
No profiling information available
Recompile ProB with -Dprob_profile=true
MEMO Table:
Summary of reuse per memoization ID:
MemoID 1 (prime) : Values Stored: 999 (? ms to compute), Reused ?
MemoID 2 (fib) : Values Stored: 31 (? ms to compute), Reused ?
MemoID 3 (fact) : Values Stored: 11 (? ms to compute), Reused ?
MemoID 4 (evenupto) : Values Stored: 0 (? ms to compute), Reused ?
MemoID 5 (sum) : Values Stored: 1001 (? ms to compute), Reused ?
MemoID 6 (M91) : Values Stored: 111 (? ms to compute), Reused ?
Hashes computed: 1002, expansions reused: 0
Memoization functions registered: 6, results reused: 1345

If the compile time flag -Dprob_profile=true is set, the output is more detailed:

MEMO Table:
Summary of reuse per memoization ID:
MemoID 1 (prime) : Values Stored: 999 (336 ms to compute), Reused 1003
MemoID 2 (fib) : Values Stored: 31 (20 ms to compute), Reused 45
MemoID 3 (fact) : Values Stored: 11 (10 ms to compute), Reused 1
MemoID 4 (evenupto) : Values Stored: 0 (0 ms to compute), Reused 0
MemoID 5 (sum) : Values Stored: 1001 (16659 ms to compute), Reused 1
MemoID 6 (M91) : Values Stored: 111 (15 ms to compute), Reused 295
Hashes computed: 1002, expansions reused: 0
Memoization functions registered: 6, results reused: 1345

In verbose mode (-v flag for probcli) you also obtain information about individual stored results.

MEMO Table:
MemoID 1 stored FUNCTION prime 
     :  %x.(x : NATURAL|(IF !y.(y : 2 .. x - 1 => x mod y /= 0) THEN TRUE ELSE FALSE END))
MemoID 2 stored FUNCTION fib 
     :  %x.(x : NATURAL|(IF x : {0,1} THEN 1 ELSE MEMOIZE_STORED_FUNCTION(2)(x - 1) + MEMOIZE_STORED_FUNCTION(2)(x - 2) END))
MemoID 6 stored FUNCTION M91 
MemoID 1 (prime) result for argument 13
     :  TRUE
MemoID 1 (prime) result for argument 14
     :  FALSE
MemoID 1 (prime) result for argument 2
     :  TRUE
MemoID 1 (prime) result for argument 3
     :  TRUE
Memoization functions registered: 6, results reused: 1345

Tips: B Idioms

Also have a look at Tips:_Writing_Models_for_ProB.


Classical B only has a LET substitution, no let construct for predicates or expressions. Event-B has no let construct whatsoever.

ProB's Extended Syntax

Since version 1.6.1-beta (28th of April 2016), ProB supports the use of the LET substitution syntax in expressions and predicates.


>>> LET a BE a = 10 IN a + 10 END
Expression Value = 20
>>> LET a BE a=10 IN a END + 10
Expression Value = 20
>>> LET a BE a=10 IN a END = 10
Predicate is TRUE
>>> LET a BE a = 10 IN a < 10 END
Predicate is FALSE
>>> LET a BE a=10 IN a /= 10 END or 1=1
Predicate is TRUE
>>> LET a, b BE a = 10 & b = 1 IN a + b END
Expression Value = 11

Let for predicates

For predicates this encodes a let predicate:

#x.(x=E & P)

corresponds to something like

let x=E in P

Within set comprehensions one can use the following construct:

dom({x,y|y=E & P})

corresponds to something like

{x|let y=E in P}

One can also use the ran operator or introduce multiple lets in one go:

dom(dom({x,y,z|y=E1 & z=E2 &P}))


ran({y,z,x|y=E1 & z=E2 &P})

both encode

{x|let y=E1 & z=E2 in P}

Let for expressions

In case F is a set expression, then the following construct can be used to encode a let statement:


corresponds to something like

let x=E in F

The following construct has exactly the same effect:



Classical B only has an IF-THEN-ELSE substitution (aka statement), no such construct for predicates or expressions.

Nightly Builds

Since version 1.6.1-beta (28th of April 2016), ProB supports the use of the LET substitution syntax in expressions and predicates.


>>> IF 1 = 1 THEN 3 ELSE 4 END
Expression Value = 3
>>> IF 1 = 1 THEN 3 ELSE 4 END + 5
Expression Value = 8
Predicate is FALSE
Predicate is TRUE


The following construct

%((x).(x=0 & PRED|C1)\/%(x).(x=0 & not(PRED)|C2)) (0)

encodes an if-then-else for expressions:


The former lambda-construct is recognised by ProB and replaced internally by an if-then-else construct. The latter syntax is actually now recognised as well by ProB 1.6 (version 1.6.0 still requires parentheses around the IF-THEN-ELSE; version 1.6.1 no longer requires them).


In classical B there is no counterpart to the Event-B finite operator. However, the following construct has the same effect as finite(x) (and is recognised by ProB):

x : FIN(x)


One can encode the fact that n objects x1,...,xn are pair-wise different using the following construct (recognised by ProB):



Given a function f and a sequence sqce one can map the function over all elements of sqce using the relational composition operator ;:

(sqce ; f)

For example, ([1,2,3] ; succ) gives us the sequence [2,3,4].

Recursion using closure1

Even though B has no built-in support for recursion, one can use the transitive closure operator closure1 to compute certain recursive functions. For this we need to encode the recursion as a step function of the form:


where P is a predicate which in case we have not yet reached a base case for the input value in. The computation result has to be stored in an accumulator: acc is the accumulator before the recursion step, accr after. inr is the new input value for the recursive call. In case the base case is reached for in, the predicate P should be false and the value of the recursive call should be the value of the accumulator.

The value of the recursive function can thus be obtained by calling:


where in is the input value, b is the base case and ia is the initial (empty) accumulator.

For example, to sort a set of integers into a ascending sequence, we would define the step function as follows:

step = %(s,o).(s/={} | (s\{min(s)},o<-min(s)))

A particular call would be:


resulting in the sequence [2,4,5].

Observe that, even though closure1(step) is an infinite relation, ProB can compute the relational image of closure1(step) for a particular set such as {({4,5,2},[])} (provided the recursion terminates).


Recursive functions can be declared using the ABSTRACT_CONSTANTS section in B machines. Functions declared as ABSTRACT_CONSTANTS are treated symbolically by ProB and not evaluated eagerly.

For example, to sort a set of integers into a ascending sequence, as above, we would define a recursive function as follows:

    Recursive_Sort : POW(INTEGER) <-> POW(INTEGER*INTEGER)
    & Recursive_Sort =
        %in.(in : POW(INTEGER) & in = {} | [])
        \/ %in.(in : POW(INTEGER) & in /= {}
                         | min(in) -> Recursive_Sort(in\{min(in)}))

By defining Recursive_Sort as an abstract constant we indicate that ProB should handle the function symbolically, i.e. ProB will not try to enumerate all elements of the function. The recursive function itself is composed of two single functions: a function defining the base case and a function defining the recursive case. Note, that the intersection of the domains of these function is empty, and hence, the union is still a function.

Tips: Writing Models for ProB

The most common issue is that ProB needs to find values for the constants which satisfy the properties (aka axioms in Event-B). You should read the tutorial pages on this (in particular Understanding the ProB Setup Phases and Tutorial Troubleshooting the Setup)

  • Try to use ProB as early as possible in the modeling process; this will make it easier to identify the cause of problems (and also will hopefully give you valuable feedback on your model as well).
  • Try to put complicated properties into ASSERTIONS rather than PROPERTIES. Something like !s.(s<:S => P) will have to check P for all subsets of S (i.e., checking is exponential in the size of S)
  • You may wish to give explicit values to certain constants. For example, in Event-B, this can be done by refining a context.
  • Try to set the symbolic preference of ProB to true (use -p SYMBOLIC TRUE for probcli or set the Animation preference "Lazy expansion ... (SYMBOLIC)" to true) if you have large or infinite functions (see discussion about closure below). In symbolic mode, ProB will keep lambda expressions and set comprehensions symbolic as much as possible. In classical B, any ABSTRACT_CONSTANT will also at first be kept symbolic. However, there are only limited things you can do with a "symbolic" function without forcing an expansion: taking the value of a function is fine, computing the image over a set is also possible as is taking the union with another symbolic function.

Effective Constraint Solving with ProB

Existential Quantifiers

Existential quantifiers can pose subtle problems when solving constraint problems.

For an existential quantifier #x.P ProB will often wait until all variables in P apart from x are known to evaluate the quantifier. Indeed, if all variables apart from x are known, ProB can stop when it finds one solution for x. Take for example:

#x.(x:0..1000 & x=p) & p:101..104

Here, ProB will wait until p is known (e.g., 101) before enumerating possible values for x. However, it could be that the predicate P is required to instantiate the outside variable, as in this example:

 #x.(x:100..101 & x=p) & p:NATURAL

Here, the existential quantifier is required to narrow down the possible values of p. Thus, before enumerating an unbounded variable, ProB will start enumerating the existential variable x. Note, however, that the priority with which it will be enumerated is much lower than if it was a regular variable! Hence:

  • Tip: Beware of putting important domain variables into existential quantifiers.

One exception to the above treatment are existential quantifiers of the form #x.(x=E & P). They are recognised by ProB as LET-PREDICATES. This is a good use of the existential quantifier. This quantifier will never "block".

  • Tip: use existential quantifiers as LET-PREDICATES #x.(x=E & P) to avoid repeated computations (common-subexpression elimination) and to make your predicates more readable

Universal Quantifiers

The situation is very similar to the existential quantifier. In the worst case ProB may delay evaluating a universal quantifier !x.(P=>Q) until all variables in P are known so as to be able to determine all values of x for which Q has to be checked.

There are a few optimisations:

  • if ProB can determine that the domain of x is finite and small, then the universal quantifier will be expanded into a conjunction. E.g., !x.(x:1..3 & x<y => P(x) will be expanded into (1<y => P(1)) & (2<y => P(2)) & (3<y => P(3)) even if y is not yet known. Setting the preference SMT to true will increase the threshold for which this expansion occurs.
  • if the quantifier is of the form !x.(x:S => P), then P will be gradually checked for every new value that is added to S; ProB does not wait for S to be completely known before checking the quantifier.

Tip: sometimes one can force expansion of a quantifier by using two implications. E.g., suppose we know that the domain of s is a subset of 1..10, then we can rewrite !x.(s(x)=5 => P(x) into !x.(x:1..10 => (s(x)=5 => P(x)). This will ensure that the quantifier is checked

Transitive Closure in Event-B

Classical B contains the transitive closure operator closure1. It is not available by default in Event-B, and axiomatisations of it may be very difficult to treat by ProB. Indeed, if you define the transitive closure in Event-B as a function tclos from relations to relations, ProB will try to find a value for tclos. The search space for this function is (2^n*n)^(2^n*n), where n is the size of the base set (see Tutorial Understanding the Complexity of B Animation). For n=3 this is already way too big too handle (the search space has 1.40e+1387 relations).

Hence, in Event-B, you should use a theory of the transitive closure which contains a special mapping file which instructs ProB to use the classical B operator. See the page on supporting Event-B theories along with the links to theories that can be used efficiently with ProB.

  • Tip: within set comprehensions use the form dom({x,y|P}) rather than {x|#y.P}. This is generally more efficient.


There are various ways in which you can debug your model. We focus here on debugging performance issues

Debugging with LibraryIO

The standard library "LibraryIO.def" contains various external functions and predicates with which you can instrument your formal model.

To use the library in your model you need to include the following


With the external predicate printf you can view values of variables and identifiers. The printf predicate is always true and will print its arguments when all of them have been fully computed. The printf predicate uses the format from SICStus Prolog for the format string. The most important are ~w for printing an argument and ~n for a newline. There must be exactly as many ~w in the format string as there are aguments. Below is a small example, to inspect in which order ProB enumerates values. The example is typed in the REPL of probcli (started using the command probcli -repl File.mch where File.mch includes the definitions section above):

>>> {x,y | x:1..5 & y:1..2 & x+y=6 & printf("x=~w~n",[x]) & printf("y=~w~n",[y])}
Expression Value = 

As you can see, ProB has enumerated y before x, as its domain was smaller.

You can use the external function observe to inspect a list of identifiers:

>>> {x,y | x:1..5 & y:1..2 & x+y=6 & observe((x,y))}
 observing x
 observing y
 y = 1  (walltime: 562188 ms)
. x = 5  (walltime: 562188 ms)
..* Value complete: x |-> y = (5|->1)  (walltime: 562188 ms)
 y = 2  (walltime: 562188 ms)
. x = 4  (walltime: 562188 ms)
..* Value complete: x |-> y = (4|->2)  (walltime: 562188 ms)
Expression Value = 

With the external function TIME you can get the current time in seconds:

>>> TIME("sec")
Expression Value = 
>>> TIME("now")
Expression Value = 
>>> TIME("now")
Expression Value = 

With the external function DELTA_WALLTIME you can get the time in milliseconds since the last call to DELTA_WALLTIME.

Performance Messages

By setting the preference PERFORMANCE_INFO to TRUE ProB will print various performance messages. For example it may print messages when the evaluation of comprehension sets has exceeded a threshold. This threshold (in ms) can be influenced by setting the preference PERFORMANCE_INFO_LIMIT.

Debugging Constants Setup

By setting the preference TRACE_INFO to TRUE ProB will print additional messages when evaluating certain predicates, in particular the PROPERTIES clause of a B machine. With this feature you can observe how constants get bound to values and can sometimes spot expensive predicates and large values. Some additional information about debugging the PROPERTIES can be found in the Tutorial Troubleshooting the Setup.

Let us take the following machine

  a = card(b) &
  b = %x.(x:1..c|x*x) &
  c : 1000..1001 & c < 1001
  Sqr = SELECT x:dom(b) THEN x := b(x) END;
  Finished = SELECT x /: dom(b) THEN skip END

Here is how we can debug the constants setup:

$ probcli Debug.mch -p TRACE_INFO TRUE -init
% unused_constants(2,[a,c])

 ====> (1) c < 1001

 ====> (1) a = card(b)

 ====> (1) b = %x.(x : 1 .. c|x * x)

 ====> (1) c : 1000 .. 1001
 :?: a int(?:0..sup)
 :?: b VARIABLE: _31319 : GRVAL-CHECK
 :?: c int(?:inf..1000)
--1-->> a
--1-->> b
--1-->> c
% Runtime for SOLUTION for SETUP_CONSTANTS: 107 ms (walltime: 110 ms)
% Runtime to FINALISE SETUP_CONSTANTS: 0 ms (walltime: 0 ms)

 =INIT=> x := 2
 [=OK= 0 ms]

Debugging Constant Size

Indeed, for performance it can be much more efficient to expand a value (such as a function or relation) once, rather than keeping it symbolic. On the other, expanding a very large set can be costly in terms of memory. A useful feature to analyse these issues is the constants_analysis command. It generates a CSV table which can be inspected in an editor or a spreadsheet program. The table provides an overview of the constants, in particular their size and whether they are kept symbolic or expanded.

Note that B distinguishes between abstract and concrete constants. By default, concrete constants will be evaluated (unless they are known to be infinite or larger or annotated as symbolic). Abstract constants are more often kept symbolic. You can influence ProB's treatmen of constants by - choosing to put constants into the ABSTRACT_CONSTANTS or CONCRETE_CONSTANTS section - annotating the values with the /*@ symbolic */ pragma - annotating the constant with the /@ desc expand */ pragma to force expansion - annotating the constant with the /@desc memo */ pragma to memoize its evaluation (i.e., cache evaluation results involving the constant)

Let us examine this machine, where the constants a1,a2,a3 are identical to c1,c2,c3 but are located in the abstract rather than the concrete constants section:

MACHINE DebugSymbolicConstants
  a1, a2, a3
  c1, c2, c3
  a1 = %x.(x:1..10000|x+x) &
  a2 = {x | x:1..10000 & x mod 100 = 0} &
  a3 = %x.(x:1..100|x*x) &
  c1 = %x.(x:1..10000|x+x) &
  c2 = {x | x:1..10000 & x mod 100 = 0} &
  c3 = %x.(x:1..100|x*x)

The command can now be run as follows. Here the output is written to the console (by providing user_output as file name). The list of constants is sorted according to size.

 probcli DebugSymbolicConstants.mch -init -csv constants_analysis user_output
Calling table command constants_analysis

! Message (source: constants_analysis):
! Abstract constant is stored symbolically but can be expanded to a finite set of size 10000 (by moving to ABSTRACT_CONSTANTS or annotating with /*@desc expand */ pragma): a1
! Line: 3 Column: 2 until Line: 3 Column: 4 in file: /Users/leuschel/git_root/prob_examples/public_examples/B/Tester/ConstantsDebug/DebugSymbolicConstants.mch

! Message (source: constants_analysis):
! Abstract constant is stored symbolically but can be expanded to a finite set of size 100 (by moving to ABSTRACT_CONSTANTS or annotating with /*@desc expand */ pragma): a2
! Line: 3 Column: 6 until Line: 3 Column: 8 in file: /Users/leuschel/git_root/prob_examples/public_examples/B/Tester/ConstantsDebug/DebugSymbolicConstants.mch

! Message (source: constants_analysis):
! Abstract constant is stored symbolically but can be expanded to a finite set of size 100 (by moving to ABSTRACT_CONSTANTS or annotating with /*@desc expand */ pragma): a3
! Line: 3 Column: 10 until Line: 3 Column: 12 in file: /Users/leuschel/git_root/prob_examples/public_examples/B/Tester/ConstantsDebug/DebugSymbolicConstants.mch
CONSTANT class kind termsize value
c1 CONCRETE AVL-Set:10000 90002 #10000:{(1|->2),(2|->4),...,(9999|->19998),(10000|->20000)}
c3 CONCRETE AVL-Set:100 902 {(1|->1),(2|->4),(3|->9),(4|->16),(5|->25),(6|->36),(7|->49),(8|->64),(9|->81),(10|->100),(11|->121)...
a3 ABSTRACT FINITE-SYMBOLIC-Set:100 708 /*@symbolic*/ %x.(x : {1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,23,24,25,26,27,28,29...
c2 CONCRETE AVL-Set:100 602 {100,200,300,400,500,600,700,800,900,1000,1100,1200,1300,1400,1500,1600,1700,1800,1900,2000,2100,220...
a2 ABSTRACT FINITE-SYMBOLIC-Set:100 162 /*@symbolic*/ {x|x : (1 .. 10000) & x mod 100 = 0}
a1 ABSTRACT FINITE-SYMBOLIC-Set:10000 151 /*@symbolic*/ %x.(x : (1 .. 10000)|x + x)
Finished exporting constants_analysis to user_output

Let us now add pragmas to study their influence:

MACHINE DebugSymbolicConstants_pragmas
  a1 /*@desc expand*/, a2 /*@desc expand*/, a3 /*@desc expand*/
  c1 /*@desc memo */, c2, c3
  a1 = %x.(x:1..10000|x+x) &
  a2 = {x | x:1..10000 & x mod 100 = 0} &
  a3 = %x.(x:1..100|x*x) &
  c1 = /*@symbolic */ %x.(x:1..10000|x+x) &
  c2 = /*@symbolic */ {x | x:1..10000 & x mod 100 = 0} &
  c3 = /*@symbolic */ %x.(x:1..100|x*x)

You can see that a1,a2 and a3 are expanded, while c1, c2 and c3 kept symbolic.

 probcli DebugSymbolicConstants_pragmas.mch -init -csv constants_analysis user_output
Calling table command constants_analysis

! Message (source: constants_analysis):
! Concrete constant is stored symbolically but can be expanded to a finite set of size 10000 (by annotating with /*@desc expand */ pragma): c1
! Line: 5 Column: 2 until Line: 5 Column: 4 in file: /Users/leuschel/git_root/prob_examples/public_examples/B/Tester/ConstantsDebug/DebugSymbolicConstants_pragmas.mch

! Message (source: constants_analysis):
! Concrete constant is stored symbolically but can be expanded to a finite set of size 100 (by annotating with /*@desc expand */ pragma): c2
! Line: 5 Column: 22 until Line: 5 Column: 24 in file: /Users/leuschel/git_root/prob_examples/public_examples/B/Tester/ConstantsDebug/DebugSymbolicConstants_pragmas.mch

! Message (source: constants_analysis):
! Concrete constant is stored symbolically but can be expanded to a finite set of size 100 (by annotating with /*@desc expand */ pragma): c3
! Line: 5 Column: 26 until Line: 5 Column: 28 in file: /Users/leuschel/git_root/prob_examples/public_examples/B/Tester/ConstantsDebug/DebugSymbolicConstants_pragmas.mch
CONSTANT class kind termsize value
a1 ABSTRACT AVL-Set:10000 90002 #10000:{(1|->2),(2|->4),...,(9999|->19998),(10000|->20000)}
a3 ABSTRACT AVL-Set:100 902 {(1|->1),(2|->4),(3|->9),(4|->16),(5|->25),(6|->36),(7|->49),(8|->64),(9|->81),(10|->100),(11|->121)...
c3 CONCRETE FINITE-SYMBOLIC-Set:100 708 /*@symbolic*/ %x.(x : {1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,23,24,25,26,27,28,29...
a2 ABSTRACT AVL-Set:100 602 {100,200,300,400,500,600,700,800,900,1000,1100,1200,1300,1400,1500,1600,1700,1800,1900,2000,2100,220...
c2 CONCRETE FINITE-SYMBOLIC-Set:100 162 /*@symbolic*/ {x|x : (1 .. 10000) & x mod 100 = 0}
c1 MEMOIZED FINITE-SYMBOLIC-Set:10000 154 /*@symbolic*/ %x.(x : (1 .. 10000)|x + x)
Finished exporting constants_analysis to user_output

For symbolic constants you can also inspect the value graphically. Using probcli this can be done as follows:

probcli -init DebugSymbolicConstants_pragmas.mch -dot_expr id_value_formula_tree c3 c3.pdf

The command is also available by right-clicking on an identifier in the Evaluation View of ProB Tcl/Tk.

Debugging Animation or Execution

By using the -animate_stats flag, you can see execution times for operations that are executed either using the -execute or -animate commands. In verbose mode (-v flag) you also see the memory consumption.

$ probcli Debug.mch -execute_all -animate_stats
% unused_constants(2,[a,c])
% Runtime for SOLUTION for SETUP_CONSTANTS: 79 ms (walltime: 80 ms)
       91 ms walltime (89 ms runtime), since start: 1107 ms
       5 ms walltime (4 ms runtime), since start: 1112 ms
3    : Sqr
       10 ms walltime (10 ms runtime), since start: 1123 ms
4    : Sqr
       0 ms walltime (0 ms runtime), since start: 1123 ms
5    : Sqr
       1 ms walltime (0 ms runtime), since start: 1124 ms
6    : Sqr
       0 ms walltime (0 ms runtime), since start: 1124 ms
7    : Finished
       3 ms walltime (4 ms runtime), since start: 1127 ms
Infinite loop reached after 8 steps (looping on Finished).
% Runtime for -execute: 116 ms (with gc: 116 ms, walltime: 119 ms); time since start: 1132 ms


You can obtain some profiling information using the -prob_profile command. This command unfortunately requires that ProB was compiled using special flags (-Dprob_profile=true and -Dprob_src_profile=true).

$ probcli ../prob_examples/public_examples/B/Tutorial/Debug.mch -execute_all -prob_profile
ProB profile info after 5685 ms walltime (5248 ms runtime)
----Source Location Profiler Information----
----Tracks number of times B statements (aka substitutions) are hit
 1 hits at 9:15 -- 9:19 in /Users/leuschel/git_root/prob_examples/public_examples/B/Tutorial/Debug.mch
 1 hits at 12:37 -- 12:41 in /Users/leuschel/git_root/prob_examples/public_examples/B/Tutorial/Debug.mch
 4 hits at 11:29 -- 11:38 in /Users/leuschel/git_root/prob_examples/public_examples/B/Tutorial/Debug.mch
---- ProB Runtime Profiler ----
---- Tracks time spent in B operations and invariant evaluation
 $setup_constants : 78 ms (80 ms walltime & 80 ms max. walltime; #calls 1)
 Sqr : 9 ms (9 ms walltime & 9 ms max. walltime; #calls 1)
 $initialise_machine : 5 ms (5 ms walltime & 5 ms max. walltime; #calls 1)
 Finished : 3 ms (4 ms walltime & 4 ms max. walltime; #calls 1)
 Total Walltime: 98 ms for #calls 4

Note, if you memoize functions you can also inspect time spent in evaluating function calls. E.g., if you set the preference MEMOIZE_FUNCTIONS to true then all abstract constants will be memoised and you can inspect number of calls and time. See Memoization_for_Functions.

See also