[index] [finite-map] Algebra::Set / Enumerable
Algebra::Set
Class of Set
This is the class of sets. The conclusion relationship is determined by each and has?, that is, s is the subset of t if and only if
s.all?{|x| t.has?(x)}
is true.
File Name:
- finite-set.rb
SuperClass:
- Object
Included Module:
- Enumerable
Class Methods:
::[[obj0, [obj1, [obj2, ...]]]]-
Creates Set objects from parameters.
Example: Create {"a", [1, 2], 0}
require "finite-set" p Algebra::Set[0, "a", [1, 2]] p Algebra::Set.new(0, "a", [1, 2]) p Algebra::Set.new_a([0, "a", [1, 2]]) p Algebra::Set.new_h({0=>true, "a"=>true, [1, 2]=>true}) ::new([obj0, [obj1, [obj2, ...]]])-
Creates Set objects from parameters.
::new_a(a)-
Creates Set objects from an array a.
::new_h(h)-
Creates Set objects from a hash.
::empty_set-
Returns the empty set.
::phi::null-
Alias of ::empty_set.
::singleton(x)-
Creates the set of one element x.
Methods:
empty_set-
Returns the empty set.
phinull-
Alias of ::empty_set.
empty?-
Returns true if self is the empty set.
phi?empty_set?null?-
Alias of empty?
singleton(x)-
Creates the set of one element x.
singleton?-
Returns true if self is a singleton set.
size-
Returns the size of self.
each-
Iterates the block with the block parameter of each element. The order of iteration is indefinite.
Example:
require "finite-set" include Algebra Set[0, 1, 2].each do |x| p x #=> 1, 0, 2 end
separate-
Return the set of the elements which make the block true.
Example:
require "finite-set" include Algebra p Set[0, 1, 2, 3].separate{|x| x % 2 == 0} #=> {2, 0} select_sfind_all_s-
Alias of separate
map_s-
Return the set of the values of the block.
Example:
require "finite-set" include Algebra p Set[0, 1, 2, 3].map_s{|x| x % 2 + 1} #=> {2, 1} pick-
Returns a elements of self. The chois is indefinite.
shift-
Takes an element from self and returns it.
Example:
require "finite-set" include Algebra s = Set[0, 1, 2, 3] p s.shift #=> 2 p s #=> {0, 1, 3} dup-
Returns the duplication of self.
append!(x)-
Appends x to self and returns self.
push<<-
Alias of append!.
append(x)-
Duplicates and appends x to it and returns it.
concat(other)-
Add the all elements of other. This is the destructive version of +.
rehash-
Rehashes the internal Hash object.
eql?(other)-
Returns true if self is equal to other. This is equivalent to
self >= other and self <= other. ==-
Alias of eql?
hash-
Returns the hash value of self.
include?(x)-
Returns true if x is a element of self.
has?contains?-
Alias of include.
superset?(other)n-
Returns true if self containds other. This is equivalent to
other.all{|x| has?(x)}. >=incl?-
Alias of
superset?. subset?(other)-
Returns true if self is a subset of other.
<=part_of?-
Alias of subset?.
<(other)-
Returns true if self is a proper subset of other.
>(other)-
Returns true if other is a proper subset of self.
union(other = nil)-
Returns the union of self and other. If other is omitted, returns the union of the self the set of sets.
Example:
require "finite-set" include Algebra p Set[0, 2, 4].cup Set[1, 3] #=> {0, 1, 2, 3, 4} s = Set[*(0...15).to_a] s2 = s.separate{|x| x % 2 == 0} s3 = s.separate{|x| x % 3 == 0} s5 = s.separate{|x| x % 5 == 0} p Set[s2, s3, s5].union #=> {1, 7, 11, 13} |+cup-
Alias of union.
intersection(other = nil)-
Returns the intersection of self and other. If other is omitted, returns the intersection of the self the set of sets.
Example:
require "finite-set" include Algebra p Set[0, 2, 4].cap(Set[4, 2, 0]) #=> {0, 2, 4} s = Set[*(0..30).to_a] s2 = s.separate{|x| x % 2 == 0} s3 = s.separate{|x| x % 3 == 0} s5 = s.separate{|x| x % 5 == 0} p Set[s2, s3, s5].cap #=> {0, 30} &cap-
Alias of intersection.
difference(other)-
Returns the set of the elements of self which are not in other.
--
Alias of difference.
each_pair-
Iterates with each two different elements of self.
Example:
require "finite-set" include Algebra s = Set.phi Set[0, 1, 2].each_pair do |x, y| s.push [x, y] end p s == Set[[0, 1], [0, 2], [1, 2]] #=> true
each_member(n)-
Iterates with each n different elements of self.
Example:
require "finite-set" include Algebra s = Set.phi Set[0, 1, 2].each_member(2) do |x, y| s.push [x, y] end p s == Set[[0, 1], [0, 2], [1, 2]] #=> true
each_subset-
Iterates over each subset of self.
Example:
require "finite-set" include Algebra s = Set.phi Set[0, 1, 2].each_subset do |t| s.append! t end p s.size = 2**3 #=> true
each_non_trivial_subset-
Iterates over each non trivial subset of self
power_set-
Returns the set of subsets.
each_product(other)-
Iterates over for each x in self and each y in other
Exameple:
require "finite-set" include Algebra Set[0, 1].each_prodct(Set[0, 1]) do |x, y| p [x, y] #=> [0,0], [0,1], [1,0], [1,1] end
product(other)-
Returns the product set of self and other. The elements are the arrays of type
[x, y]. If the block is given, it returns the set which consists of the value of the block.Example:
require "finite-set" include Algebra p Set[0, 1].product(Set[0, 1]) #=> {[0,0], [0,1], [1,0], [1,1]} p Set[0, 1].product(Set[0, 1]){|x, y| x + 2*y} #=> {0, 1, 2, 3] *-
Alias of product.
equiv_class([equiv])-
Returns the quotient set by the equivalent relation. The relation are given as following:
The evaluation of the block:
require "finite-set" include Algebra s = Set[0, 1, 2, 3, 4, 5] p s.equiv_class{|a, b| (a - b) % 3 == 0} #=> {{0, 3}, {1, 4}, {2, 5}}The value of the instance method call(x, y) of the parameter.
require "finite-set" include Algebra o = Object.new def o.call(x, y) (x - y) % 3 == 0 end s = Set[0, 1, 2, 3, 4, 5] p s.equiv_class(o) #=> {{0, 3}, {1, 4}, {2, 5}}The value of method indicated Symbol.
require "finite-set" include Algebra s = Set[0, 1, 2, 3, 4, 5] def q(x, y) (x - y) % 3 == 0 end p s.equiv_class(:q) #=> {{0, 3}, {1, 4}, {2, 5}}
/-
Alias of equiv_class.
to_a-
Returns the array of elements. The order is indefinite.
to_ary-
Alias of to_a.
sort-
Returns the value of
to_a.sort. power(other)-
Returns the all maps from other to self. The maps are the instances of Map.
Example:
require "finite-map" include Algebra a = Set[0, 1, 2, 3] b = Set[0, 1, 2] s = p( (a ** b).size ) #=> 4 ** 3 = 64 p b.surjections(a).size #=> S(3, 4) = 36 p a.injections(b).size #=> 4P3 = 24
** power-
Alias of power.
surjections(other)-
Returns all surjections from other toself.
injections(other)-
Returns all injections from other toself.
bijections(other)-
Returns all bijections from other toself.
Enumerable
File Name:
- finite-set.rb