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 | terms.pl -- SICStus 4-compatible library(terms). |
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- term_variables_set(@Term, -Variables) is det
- Same as term_variables_bag/2, but Variables is an ordered set.
- subsumeschk(+Generic, @Specific) is semidet
- SICStus 4 name of subsumes_chk/2.
- term_order(@X, @Y, -R) is det
- Same as compare/3, except for the order of arguments.
Re-exported predicates
The following predicates are exported from this file while their implementation is defined in imported modules or non-module files loaded by this module.
- term_variables_bag(+Term, -Variables) is det
- Variables is a list of variables that appear in Term. The variables are ordered according to depth-first left-right walking of the term. Variables contains no duplicates. This is the same as SWI-Prolog's term_variables/2.
- contains_term(+Sub, +Term) is semidet
- Succeeds if Sub is contained in Term (=, deterministically)
- contains_var(+Sub, +Term) is semidet
- Succeeds if Sub is contained in Term (==, deterministically)
- free_of_term(+Sub, +Term) is semidet
- Succeeds of Sub does not unify to any subterm of Term
- free_of_var(+Sub, +Term) is semidet
- Succeeds of Sub is not equal (==) to any subterm of Term
- occurrences_of_term(@SubTerm, @Term, ?Count) is det
- Count the number of SubTerms in Term that unify with SubTerm. As
this predicate is implemented using backtracking, SubTerm and Term
are not further instantiated. Possible constraints are enforced. For
example, we can count the integers in Term using
?- freeze(S, integer(S)), occurrences_of_term(S, f(1,2,a), C). C = 2, freeze(S, integer(S)).
- occurrences_of_var(@SubTerm, @Term, ?Count) is det
- Count the number of SubTerms in Term that are equal to SubTerm. Equality is tested using ==/2. Can be used to count the occurrences of a particular variable in Term.
- sub_term(-Sub, +Term)
- Generates (on backtracking) all subterms of Term.
- term_size(@Term, -Size) is det
- True if Size is the size in cells occupied by Term on the
global (term) stack. A cell is 4 bytes on 32-bit machines and
8 bytes on 64-bit machines. The calculation does take sharing
into account. For example:
?- A = a(1,2,3), term_size(A,S). S = 4. ?- A = a(1,2,3), term_size(a(A,A),S). S = 7. ?- term_size(a(a(1,2,3), a(1,2,3)), S). S = 11.
Note that small objects such as atoms and small integers have a size 0. Space is allocated for floats, large integers, strings and compound terms.
- variant(@Term1, @Term2) is semidet
- Same as SWI-Prolog
Term1 =@= Term2. - subsumes_chk(@Generic, @Specific)
- True if Generic can be made equivalent to Specific without changing Specific.
- subsumes(+Generic, @Specific)
- True if Generic is unified to Specific without changing Specific.
- term_subsumer(+Special1, +Special2, -General) is det
- General is the most specific term that is a generalisation of Special1 and Special2. The implementation can handle cyclic terms.
- term_factorized(+Term, -Skeleton, -Substiution)
- Is true when Skeleton is Term where all subterms that appear
multiple times are replaced by a variable and Substitution is a
list of Var=Value that provides the subterm at the location Var.
I.e., After unifying all substitutions in Substiutions, Term ==
Skeleton. Term may be cyclic. For example:
?- X = a(X), term_factorized(b(X,X), Y, S). Y = b(_G255, _G255), S = [_G255=a(_G255)].
- mapargs(:Goal, ?Term1, ?Term2)
- Term1 and Term2 have the same functor (name/arity) and for each
matching pair of arguments
call(Goal, A1, A2)is true. - mapsubterms(:Goal, +Term1, -Term2) is det
- mapsubterms_var(:Goal, +Term1, -Term2) is det
- Recursively map sub terms of Term1 into subterms of Term2 for every
pair for which
call(Goal, ST1, ST2)succeeds. Procedurably, the mapping for each (sub) term pairT1/T2is defined as:- If T1 is a variable
- mapsubterms/3 unifies T2 with T1.
- mapsubterms_var/3 treats variables as other terms.
- If
call(Goal, T1, T2)succeeds we are done. Note that the mapping does not continue in T2. If this is desired, Goal must call mapsubterms/3 explicitly as part of its conversion. - If T1 is a dict, map all values, i.e., the tag and keys are left untouched.
- If T1 is a list, map all elements, i.e., the list structure is left untouched.
- If T1 is a compound, use same_functor/3 to instantiate T2 and recurse over the term arguments left to right.
- Otherwise T2 is unified with T1.
Both predicates are implemented using foldsubterms/5.
- If T1 is a variable
- mapsubterms(:Goal, +Term1, -Term2) is det
- mapsubterms_var(:Goal, +Term1, -Term2) is det
- Recursively map sub terms of Term1 into subterms of Term2 for every
pair for which
call(Goal, ST1, ST2)succeeds. Procedurably, the mapping for each (sub) term pairT1/T2is defined as:- If T1 is a variable
- mapsubterms/3 unifies T2 with T1.
- mapsubterms_var/3 treats variables as other terms.
- If
call(Goal, T1, T2)succeeds we are done. Note that the mapping does not continue in T2. If this is desired, Goal must call mapsubterms/3 explicitly as part of its conversion. - If T1 is a dict, map all values, i.e., the tag and keys are left untouched.
- If T1 is a list, map all elements, i.e., the list structure is left untouched.
- If T1 is a compound, use same_functor/3 to instantiate T2 and recurse over the term arguments left to right.
- Otherwise T2 is unified with T1.
Both predicates are implemented using foldsubterms/5.
- If T1 is a variable
- foldsubterms(:Goal3, +Term1, +State0, -State) is semidet
- foldsubterms(:Goal4, +Term1, ?Term2, +State0, -State) is semidet
- The predicate foldsubterms/5 calls
call(Goal4, SubTerm1, SubTerm2, StateIn, StateOut)for each subterm, including variables, in Term1. If this call fails, StateIn and StateOut are the same. This predicate may be used to map subterms in a term while collecting state about the mapped subterms. The foldsubterms/4 variant does not map the term. - foldsubterms(:Goal3, +Term1, +State0, -State) is semidet
- foldsubterms(:Goal4, +Term1, ?Term2, +State0, -State) is semidet
- The predicate foldsubterms/5 calls
call(Goal4, SubTerm1, SubTerm2, StateIn, StateOut)for each subterm, including variables, in Term1. If this call fails, StateIn and StateOut are the same. This predicate may be used to map subterms in a term while collecting state about the mapped subterms. The foldsubterms/4 variant does not map the term. - same_functor(?Term1, ?Term2) is semidet
- same_functor(?Term1, ?Term2, -Arity) is semidet
- same_functor(?Term1, ?Term2, ?Name, ?Arity) is semidet
- True when Term1 and Term2 are terms that have the same functor
(Name/Arity). The arguments must be sufficiently instantiated, which
means either Term1 or Term2 must be bound or both Name and Arity
must be bound.
If Arity is 0, Term1 and Term2 are unified with Name for compatibility.
- same_functor(?Term1, ?Term2) is semidet
- same_functor(?Term1, ?Term2, -Arity) is semidet
- same_functor(?Term1, ?Term2, ?Name, ?Arity) is semidet
- True when Term1 and Term2 are terms that have the same functor
(Name/Arity). The arguments must be sufficiently instantiated, which
means either Term1 or Term2 must be bound or both Name and Arity
must be bound.
If Arity is 0, Term1 and Term2 are unified with Name for compatibility.
- same_functor(?Term1, ?Term2) is semidet
- same_functor(?Term1, ?Term2, -Arity) is semidet
- same_functor(?Term1, ?Term2, ?Name, ?Arity) is semidet
- True when Term1 and Term2 are terms that have the same functor
(Name/Arity). The arguments must be sufficiently instantiated, which
means either Term1 or Term2 must be bound or both Name and Arity
must be bound.
If Arity is 0, Term1 and Term2 are unified with Name for compatibility.
Undocumented predicates
The following predicates are exported, but not or incorrectly documented.