object Set extends Delegate[Set]
This object provides a set of operations to create Set
values.
- Annotations
- @SerialVersionUID()
- Source
- Set.scala
- Alphabetic
- By Inheritance
- Set
- Delegate
- IterableFactory
- Serializable
- AnyRef
- Any
- Hide All
- Show All
- Public
- Protected
Value Members
- def apply[A](elems: A*): Set[A]
Creates a set with the specified elements.
Creates a set with the specified elements.
- A
the type of the set's elements
- elems
the elements of the created set
- returns
a new set with elements
elems
- Definition Classes
- Delegate → IterableFactory
- def concat[A](xss: Iterable[A]*): Set[A]
Concatenates all argument collections into a single set.
Concatenates all argument collections into a single set.
- xss
the collections that are to be concatenated.
- returns
the concatenation of all the collections.
- Definition Classes
- IterableFactory
- def empty[A]: Set[A]
An empty collection
- def fill[A](n1: Int, n2: Int, n3: Int, n4: Int, n5: Int)(elem: => A): Set[Set[Set[Set[Set[A]]]]]
Produces a five-dimensional set containing the results of some element computation a number of times.
Produces a five-dimensional set containing the results of some element computation a number of times.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- n3
the number of elements in the 3rd dimension
- n4
the number of elements in the 4th dimension
- n5
the number of elements in the 5th dimension
- elem
the element computation
- returns
A set that contains the results of
n1 x n2 x n3 x n4 x n5
evaluations ofelem
.
- Definition Classes
- IterableFactory
- def fill[A](n1: Int, n2: Int, n3: Int, n4: Int)(elem: => A): Set[Set[Set[Set[A]]]]
Produces a four-dimensional set containing the results of some element computation a number of times.
Produces a four-dimensional set containing the results of some element computation a number of times.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- n3
the number of elements in the 3rd dimension
- n4
the number of elements in the 4th dimension
- elem
the element computation
- returns
A set that contains the results of
n1 x n2 x n3 x n4
evaluations ofelem
.
- Definition Classes
- IterableFactory
- def fill[A](n1: Int, n2: Int, n3: Int)(elem: => A): Set[Set[Set[A]]]
Produces a three-dimensional set containing the results of some element computation a number of times.
Produces a three-dimensional set containing the results of some element computation a number of times.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- n3
the number of elements in the 3rd dimension
- elem
the element computation
- returns
A set that contains the results of
n1 x n2 x n3
evaluations ofelem
.
- Definition Classes
- IterableFactory
- def fill[A](n1: Int, n2: Int)(elem: => A): Set[Set[A]]
Produces a two-dimensional set containing the results of some element computation a number of times.
Produces a two-dimensional set containing the results of some element computation a number of times.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- elem
the element computation
- returns
A set that contains the results of
n1 x n2
evaluations ofelem
.
- Definition Classes
- IterableFactory
- def fill[A](n: Int)(elem: => A): Set[A]
Produces a set containing the results of some element computation a number of times.
Produces a set containing the results of some element computation a number of times.
- n
the number of elements contained in the set.
- elem
the element computation
- returns
A set that contains the results of
n
evaluations ofelem
.
- Definition Classes
- IterableFactory
- def from[E](it: IterableOnce[E]): Set[E]
Creates a target set from an existing source collection
Creates a target set from an existing source collection
- returns
a new set with the elements of
source
- Definition Classes
- Delegate → IterableFactory
- implicit def iterableFactory[A]: Factory[A, Set[A]]
- Definition Classes
- IterableFactory
- def iterate[A](start: A, len: Int)(f: (A) => A): Set[A]
Produces a set containing repeated applications of a function to a start value.
Produces a set containing repeated applications of a function to a start value.
- start
the start value of the set
- len
the number of elements contained in the set
- f
the function that's repeatedly applied
- returns
a set with
len
values in the sequencestart, f(start), f(f(start)), ...
- Definition Classes
- IterableFactory
- def newBuilder[A]: Builder[A, Set[A]]
- A
the type of the set’s elements
- returns
A builder for
Set
objects.
- Definition Classes
- Delegate → IterableFactory
- def range[A](start: A, end: A, step: A)(implicit arg0: Integral[A]): Set[A]
Produces a set containing equally spaced values in some integer interval.
Produces a set containing equally spaced values in some integer interval.
- start
the start value of the set
- end
the end value of the set (the first value NOT contained)
- step
the difference between successive elements of the set (must be positive or negative)
- returns
a set with values
start, start + step, ...
up to, but excludingend
- Definition Classes
- IterableFactory
- def range[A](start: A, end: A)(implicit arg0: Integral[A]): Set[A]
Produces a set containing a sequence of increasing of integers.
Produces a set containing a sequence of increasing of integers.
- start
the first element of the set
- end
the end value of the set (the first value NOT contained)
- returns
a set with values
start, start + 1, ..., end - 1
- Definition Classes
- IterableFactory
- def tabulate[A](n1: Int, n2: Int, n3: Int, n4: Int, n5: Int)(f: (Int, Int, Int, Int, Int) => A): Set[Set[Set[Set[Set[A]]]]]
Produces a five-dimensional set containing values of a given function over ranges of integer values starting from 0.
Produces a five-dimensional set containing values of a given function over ranges of integer values starting from 0.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- n3
the number of elements in the 3rd dimension
- n4
the number of elements in the 4th dimension
- n5
the number of elements in the 5th dimension
- f
The function computing element values
- returns
A set consisting of elements
f(i1, i2, i3, i4, i5)
for0 <= i1 < n1
,0 <= i2 < n2
,0 <= i3 < n3
,0 <= i4 < n4
, and0 <= i5 < n5
.
- Definition Classes
- IterableFactory
- def tabulate[A](n1: Int, n2: Int, n3: Int, n4: Int)(f: (Int, Int, Int, Int) => A): Set[Set[Set[Set[A]]]]
Produces a four-dimensional set containing values of a given function over ranges of integer values starting from 0.
Produces a four-dimensional set containing values of a given function over ranges of integer values starting from 0.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- n3
the number of elements in the 3rd dimension
- n4
the number of elements in the 4th dimension
- f
The function computing element values
- returns
A set consisting of elements
f(i1, i2, i3, i4)
for0 <= i1 < n1
,0 <= i2 < n2
,0 <= i3 < n3
, and0 <= i4 < n4
.
- Definition Classes
- IterableFactory
- def tabulate[A](n1: Int, n2: Int, n3: Int)(f: (Int, Int, Int) => A): Set[Set[Set[A]]]
Produces a three-dimensional set containing values of a given function over ranges of integer values starting from 0.
Produces a three-dimensional set containing values of a given function over ranges of integer values starting from 0.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- n3
the number of elements in the 3rd dimension
- f
The function computing element values
- returns
A set consisting of elements
f(i1, i2, i3)
for0 <= i1 < n1
,0 <= i2 < n2
, and0 <= i3 < n3
.
- Definition Classes
- IterableFactory
- def tabulate[A](n1: Int, n2: Int)(f: (Int, Int) => A): Set[Set[A]]
Produces a two-dimensional set containing values of a given function over ranges of integer values starting from 0.
Produces a two-dimensional set containing values of a given function over ranges of integer values starting from 0.
- n1
the number of elements in the 1st dimension
- n2
the number of elements in the 2nd dimension
- f
The function computing element values
- returns
A set consisting of elements
f(i1, i2)
for0 <= i1 < n1
and0 <= i2 < n2
.
- Definition Classes
- IterableFactory
- def tabulate[A](n: Int)(f: (Int) => A): Set[A]
Produces a set containing values of a given function over a range of integer values starting from 0.
Produces a set containing values of a given function over a range of integer values starting from 0.
- n
The number of elements in the set
- f
The function computing element values
- returns
A set consisting of elements
f(0), ..., f(n -1)
- Definition Classes
- IterableFactory
- def unfold[A, S](init: S)(f: (S) => Option[(A, S)]): Set[A]
Produces a set that uses a function
f
to produce elements of typeA
and update an internal state of typeS
.Produces a set that uses a function
f
to produce elements of typeA
and update an internal state of typeS
.- A
Type of the elements
- S
Type of the internal state
- init
State initial value
- f
Computes the next element (or returns
None
to signal the end of the collection)- returns
a set that produces elements using
f
untilf
returnsNone
- Definition Classes
- IterableFactory
This is the documentation for the Scala standard library.
Package structure
The scala package contains core types like
Int
,Float
,Array
orOption
which are accessible in all Scala compilation units without explicit qualification or imports.Notable packages include:
scala.collection
and its sub-packages contain Scala's collections frameworkscala.collection.immutable
- Immutable, sequential data-structures such asVector
,List
,Range
,HashMap
orHashSet
scala.collection.mutable
- Mutable, sequential data-structures such asArrayBuffer
,StringBuilder
,HashMap
orHashSet
scala.collection.concurrent
- Mutable, concurrent data-structures such asTrieMap
scala.concurrent
- Primitives for concurrent programming such asFutures
andPromises
scala.io
- Input and output operationsscala.math
- Basic math functions and additional numeric types likeBigInt
andBigDecimal
scala.sys
- Interaction with other processes and the operating systemscala.util.matching
- Regular expressionsOther packages exist. See the complete list on the right.
Additional parts of the standard library are shipped as separate libraries. These include:
scala.reflect
- Scala's reflection API (scala-reflect.jar)scala.xml
- XML parsing, manipulation, and serialization (scala-xml.jar)scala.collection.parallel
- Parallel collections (scala-parallel-collections.jar)scala.util.parsing
- Parser combinators (scala-parser-combinators.jar)scala.swing
- A convenient wrapper around Java's GUI framework called Swing (scala-swing.jar)Automatic imports
Identifiers in the scala package and the
scala.Predef
object are always in scope by default.Some of these identifiers are type aliases provided as shortcuts to commonly used classes. For example,
List
is an alias forscala.collection.immutable.List
.Other aliases refer to classes provided by the underlying platform. For example, on the JVM,
String
is an alias forjava.lang.String
.