A binary relation R on a set X is a subset of X ×X. A binary relation can also be thought of as a (general) mapping from X to itself or as a directed graph where each edge represents a tuple of R.
In GAP, a relation is conceptually represented as a general mapping
from X to itself. The category IsBinaryRelation is the same as the
category IsEndoGeneralMapping (see IsEndoGeneralMapping). Attributes
and properties of relations in GAP are supported for relations, via
considering relations as a subset of X×X, or as a directed graph;
examples include finding the strongly connected components of a relation,
via StronglyConnectedComponents (see StronglyConnectedComponents), or
enumerating the tuples of the relation.
IsBinaryRelation( R ) C
is exactly the same category as (i.e. a synonym for)
IsEndoGeneralMapping (see IsEndoGeneralMapping).
We have the following general constructors.
BinaryRelationByElements( domain, elms ) F
is the binary relation on domain and with underlying relation
consisting of the tuples collection elms. This construction is similar
to GeneralMappingByElements (see GeneralMappingByElements) where the
source and range are the same set.
IdentityBinaryRelation( degree ) F
IdentityBinaryRelation( domain ) F
is the binary relation which consists of diagonal tuples i.e. tuples of the form (x,x). In the first form if a positive integer degree is given then the domain is the integers {1,...,degree }. In the second form, the tuples are from the domain domain.
EmptyBinaryRelation( degree ) F
EmptyBinaryRelation( domain ) F
is the relation with R empty. In the first form of the command with degree an integer, the domain is the points {1,..., degree }. In the second form, the domain is that given by the argument domain.
IsReflexiveBinaryRelation( R ) P
returns true if the binary relation R is reflexive, and false
otherwise.
A binary relation R (as tuples) on a set X is reflexive if for all x ∈ X, (x,x) ∈ R. Alternatively, R as a mapping is reflexive if for all x ∈ X, x is an element of the image set R(x).
A reflexive binary relation is necessarily a total endomorphic
mapping (tested via IsTotal; see IsTotal).
IsSymmetricBinaryRelation( R ) P
returns true if the binary relation R is symmetric, and false
otherwise.
A binary relation R (as tuples) on a set X is symmetric if (x,y) ∈ R then (y,x) ∈ R. Alternatively, R as a mapping is symmetric if for all x ∈ X, the preimage set of x under R equals the image set R(x).
IsTransitiveBinaryRelation( R ) P
returns true if the binary relation R is transitive, and false
otherwise.
A binary relation R (as tuples) on a set X is transitive if (x,y), (y,z) ∈ R then (x,z) ∈ R. Alternatively, R as a mapping is transitive if for all x ∈ X, the image set R(R(x)) of the image set R(x) of x is a subset of R(x).
IsAntisymmetricBinaryRelation( rel ) P
returns true if the binary relation rel is antisymmetric, and false
otherwise.
A binary relation R (as tuples) on a set X is antisymmetric if (x,y), (y,x) ∈ R implies x = y. Alternatively, R as a mapping is antisymmetric if for all x ∈ X, the intersection of the preimage set of x under R and the image set R(x) is {x}.
IsPreOrderBinaryRelation( rel ) P
returns true if the binary relation rel is a preorder, and false
otherwise.
A preorder is a binary relation that is both reflexive and transitive.
IsPartialOrderBinaryRelation( rel ) P
returns true if the binary relation rel is a partial order, and
false otherwise.
IsHasseDiagram( rel ) P
returns true if the binary relation rel is a Hasse Diagram of a
partial order, i.e. was computed via HasseDiagramBinaryRelation
(see HasseDiagramBinaryRelation).
IsEquivalenceRelation( R ) P
returns true if the binary relation R is an equivalence relation, and
false otherwise.
Recall, that a relation R on the set X is an equivalence relation if it is symmetric, transitive, and reflexive.
Successors( R ) A
returns the list of images of a binary relation R. If the underlying
domain of the relation is not [1..n] for some positive integer n,
then an error is signalled.
The returned value of Successors is a list of lists where the lists are
ordered as the elements according to the sorted order of the underlying
set of R. Each list consists of the images of the element whose index
is the same as the list with the underlying set in sorted order.
The Successors of a relation is the adjacency list representation
of the relation.
DegreeOfBinaryRelation( R ) A
returns the size of the underlying domain of the binary relation R. This is most natural when working with a binary relation on points.
PartialOrderOfHasseDiagram( HD ) A
is the partial order associated with the Hasse Diagram HD i.e. the partial order generated by the reflexive and transitive closure of HD.
We have special construction methods when the underlying X of our relation is the set of integers {1,..., n }.
BinaryRelationOnPoints( list ) F
BinaryRelationOnPointsNC( list ) F
Given a list of n lists, each containing elements from
the set {1,...,n},
this function constructs a binary relation such that 1 is related
to list[1], 2 to list[2] and so on.
The first version checks whether the list supplied is valid. The
the NC version skips this check.
RandomBinaryRelationOnPoints( degree ) F
creates a relation on points with degree degree.
AsBinaryRelationOnPoints( trans ) F
AsBinaryRelationOnPoints( perm ) F
AsBinaryRelationOnPoints( rel ) F
return the relation on points represented by general relation rel, transformation trans or permutation perm. If rel is already a binary relation on points then rel is returned.
Transformations and permutations are special general endomorphic mappings and have a natural representation as a binary relation on points.
In the last form, an isomorphic relation on points is constructed where the points are indices of the elements of the underlying domain in sorted order.
ReflexiveClosureBinaryRelation( R ) O
is the smallest binary relation containing the binary relation R which is reflexive. This closure inherents the properties symmetric and transitive from R. E.g. if R is symmetric then its reflexive closure is also.
SymmetricClosureBinaryRelation( R ) O
is the smallest binary relation containing the binary relation R which is symmetric. This closure inherents the properties reflexive and transitive from R. E.g. if R is reflexive then its symmetric closure is also.
TransitiveClosureBinaryRelation( rel ) O
is the smallest binary relation containing the binary relation R which is transitive. This closure inerents the properties reflexive and symmetric from R. E.g. if R is symmetric then its transitive closure is also.
TransitiveClosureBinaryRelation is a modified version of the
Floyd-Warshall method of solving the all-pairs shortest-paths problem
on a directed graph. Its asymptotic runtime is O(n3) where n is
the size of the vertex set. It only assumes there is an arbitrary
(but fixed) ordering of the vertex set.
HasseDiagramBinaryRelation( partial-order ) O
is the smallest relation contained in the partial order partial-order whose reflexive and transitive closure is equal to partial-order.
StronglyConnectedComponents( R ) O
returns an equivalence relation on the vertices of the binary relation R.
PartialOrderByOrderingFunction( dom, orderfunc ) F
constructs a partial order whose elements are from the domain dom
and are ordered using the ordering function orderfunc. The ordering
function must be a binary function returning a boolean value. If the
ordering function does not describe a partial order then fail is
returned.
An equivalence relation E over the set X is a relation on X which is reflexive, symmetric, and transitive. of the set X. A partition P is a set of subsets of X such that for all R,S ∈ P R∩S is the empty set and ∪P=X. An equivalence relation induces a partition such that if (x,y) ∈ E then x,y are in the same element of P.
Like all binary relations in GAP equivalence
relations are regarded as general endomorphic mappings (and the operations,
properties and attributes of general mappings are available).
However, partitions provide an efficient way of representing equivalence
relations. Moreover, only the non-singleton classes
or blocks are listed allowing for small equivalence relations to be
represented on infinite sets. Hence the main attribute of equivalence
relations is EquivalenceRelationPartition which provides the partition
induced by the given equivalence.
EquivalenceRelationByPartition( domain, list ) F
EquivalenceRelationByPartitionNC( domain, list ) F
constructs the equivalence relation over the set domain which induces the partition represented by list. This representation includes only the non-trivial blocks (or equivalent classes). list is a list of lists, each of these lists contain elements of domain and are pairwise mutually exclusive.
The list of lists do not need to be in any order nor do the
elements in the blocks (see EquivalenceRelationPartition).
a list of elements of domain
The partition list is a
list of lists, each of these is a list of elements of domain
that makes up a block (or equivalent class). The
domain is the domain over which the relation is defined, and
list is a list of lists, each of these is a list of elements
of domain which are related to each other.
list need only contain the nontrivial blocks
and singletons will be ignored. The NC version will not check
to see if the lists are pairwise mutually exclusive or that
they contain only elements of the domain.
EquivalenceRelationByRelation( rel ) F
returns the smallest equivalence relation containing the binary relation rel.
EquivalenceRelationByPairs( D, elms ) F
EquivalenceRelationByPairsNC( D, elms ) F
return the smallest equivalence relation on the domain D such that every pair in elms is in the relation.
In the second form, it is not checked that elms are in the domain D.
EquivalenceRelationByProperty( domain, property ) F
creates an equivalence relation on domain whose only defining datum is that of having the property property.
EquivalenceRelationPartition( equiv ) A
returns a list of lists of elements of the underlying set of the equivalence relation equiv. The lists are precisely the nonsingleton equivalence classes of the equivalence. This allows us to describe ``small'' equivalences on infinite sets.
GeneratorsOfEquivalenceRelationPartition( equiv ) A
is a set of generating pairs for the equivalence relation equiv. This set is not unique. The equivalence equiv is the smallest equivalence relation over the underlying set X which contains the generating pairs.
JoinEquivalenceRelations( equiv1, equiv2 ) O
MeetEquivalenceRelations( equiv1, equiv2 ) O
JoinEquivalenceRelations(equiv1,equiv2) returns the smallest
equivalence relation containing both the equivalence relations
equiv1 and equiv2.
MeetEquivalenceRelations( equiv1,equiv2 ) returns the
intersection of the two equivalence relations equiv1 and equiv2.
IsEquivalenceClass( O ) C
returns true if the object O is an equivalence class, and false
otherwise.
An equivalence class is a collection of elements which are mutually related to each other in the associated equivalence relation. Note, this is a special category of object and not just a list of elements.
EquivalenceClassRelation( C ) A
returns the equivalence relation of which C is a class.
EquivalenceClasses( rel ) A
returns a list of all equivalence classes of the equivalence relation rel. Note that it is possible for different methods to yield the list in different orders, so that for two equivalence relations c1 and c2 we may have c1 = c2 without having EquivalenceClasses( c1 ) = EquivalenceClasses( c2 ).
EquivalenceClassOfElement( rel, elt ) O
EquivalenceClassOfElementNC( rel, elt ) O
return the equivalence class of elt in the binary relation rel, where elt is an element (i.e. a pair) of the domain of rel. In the second form, it is not checked that elt is in the domain over which rel is defined.
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GAP 4 manual
March 2006