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Cheat Sheet |
This cheat sheet originated from the forum, credits to Laurent Poulain. We copied it and changed or added a few things. There are certainly a lot of things that can be improved! If you would like to contribute, you have two options:
-
Click the "Edit" button on this file on GitHub:
https://github.com/lrytz/progfun-wiki/blob/gh-pages/CheatSheet.md
You can submit a pull request directly from there without checking out the git repository to your local machine. -
Fork the repository https://github.com/lrytz/progfun-wiki and check it out locally. To preview your changes, you need jekyll. Navigate to your checkout and invoke
jekyll --auto --server
, then open the page http://localhost:4000/CheatSheet.html.
- Call by value: evaluates the function arguments before calling the function
- Call by name: evaluates the function first, and then evaluates the arguments if need be
def example = 2 // evaluated when called
val example = 2 // evaluated immediately
lazy val example = 2 // evaluated once when needed
def square(x: Double) // call by value
def square(x: => Double) // call by name
def myFct(bindings: Int*) { ... } // bindings is a sequence of int, containing a varying # of arguments
These are functions that take a function as a parameter or return functions.
// sum() returns a function that takes two integers and returns an integer
def sum(f: Int => Int): (Int, Int) => Int = {
def sumf(a: Int, b: Int): Int = {...}
sumf
}
// same as above. Its type is (Int => Int) => (Int, Int) => Int
def sum(f: Int => Int)(a: Int, b: Int): Int = { ... }
// Called like this
sum((x: Int) => x * x * x) // Anonymous function, i.e. does not have a name
sum(x => x * x * x) // Same anonymous function with type inferred
def cube(x: Int) => x * x * x
sum(x => x * x * x)(1, 10) // sum of cubes from 1 to 10
sum(cube)(1, 10) // same as above
Converting a function with multiple arguments into a function with a single argument that returns another function.
def f(a: Int, b: Int): Int // uncurried version (type is (Int, Int) => Int)
def f(a: Int)(b: Int): Int // curried version (type is Int => Int => Int)
class MyClass(x: Int, y: Int) { // Defines a new type MyClass with a constructor
require(y > 0, "y must be positive") // precondition, triggering an IllegalArgumentException if not met
def this (x: Int) = { ... } // auxiliary constructor
def nb1 = x // public method computed every time it is called
def nb2 = y
private def test(a: Int): Int = { ... } // private method
val nb3 = x + y // computed only once
override def toString = // overridden method
member1 + ", " + member2
}
new MyClass(1, 2) // creates a new object of type
this
references the current object, assert(<condition>)
issues AssertionError
if condition
is not met. See scala.Predef
for require
, assume
and assert
.
myObject myMethod 1
is the same as calling myObject.myMethod(1)
Operator (i.e. function) names can be alphanumeric, symbolic (e.g. x1
, *
, +?%&
, vector_++
, counter_=
)
The precedence of an operator is determined by its first character, with the following increasing order of priority:
(all letters)
|
^
&
< >
= !
:
+ -
* / %
(all other special characters)
The associativity of an operator is determined by its last character: Right-associative if ending with :
, Left-associative otherwise.
Note that assignment operators have lowest precedence. (Read Scala Language Specification 2.9 sections 6.12.3, 6.12.4 for more info)
abstract class TopLevel { // abstract class
def method1(x: Int): Int // abstract method
def method2(x: Int): Int = { ... }
}
class Level1 extends TopLevel {
def method1(x: Int): Int = { ... }
override def method2(x: Int): Int = { ...} // TopLevel's method2 needs to be explicitly overridden
}
object MyObject extends TopLevel { ... } // defines a singleton object. No other instance can be created
To create an runnable application in Scala:
object Hello {
def main(args: Array[String]) = println("Hello world")
}
or
object Hello extends App {
println("Hello World")
}
-
Classes and objects are organized in packages (
package myPackage
). -
They can be referenced through import statements (
import myPackage.MyClass
,import myPackage._
,import myPackage.{MyClass1, MyClass2}
,import myPackage.{MyClass1 => A}
) -
They can also be directly referenced in the code with the fully qualified name (
new myPackage.MyClass1
) -
All members of packages
scala
andjava.lang
as well as all members of the objectscala.Predef
are automatically imported. -
Traits are similar to Java interfaces, except they can have non-abstract members:
trait Planar { ... } class Square extends Shape with Planar
-
General object hierarchy:
scala.Any
base type of all types. Has methodshashCode
andtoString
that can be overloadedscala.AnyVal
base type of all primitive types. (scala.Double
,scala.Float
, etc.)scala.AnyRef
base type of all reference types. (alias ofjava.lang.Object
, supertype ofjava.lang.String
,scala.List
, any user-defined class)scala.Null
is a subtype of anyscala.AnyRef
(null
is the only instance of typeNull
), andscala.Nothing
is a subtype of any other type without any instance.
Similar to C++ templates or Java generics. These can apply to classes, traits or functions.
class MyClass[T](arg1: T) { ... }
new MyClass[Int](1)
new MyClass(1) // the type is being inferred, i.e. determined based on the value arguments
It is possible to restrict the type being used, e.g.
def myFct[T <: TopLevel](arg: T): T = { ... } // T must derive from TopLevel or be TopLevel
def myFct[T >: Level1](arg: T): T = { ... } // T must be a supertype of Level1
def myFct[T >: Level1 <: Top Level](arg: T): T = { ... }
Given A <: B
If C[A] <: C[B]
, C
is covariant
If C[A] >: C[B]
, C
is contravariant
Otherwise C is nonvariant
class C[+A] { ... } // C is covariant
class C[-A] { ... } // C is contravariant
class C[A] { ... } // C is nonvariant
For a function, if A2 <: A1
and B1 <: B2
, then A1 => B1 <: A2 => B2
.
Functions must be contravariant in their argument types and covariant in their result types, e.g.
trait Function1[-T, +U] {
def apply(x: T): U
} // Variance check is OK because T is contravariant and U is covariant
class Array[+T] {
def update(x: T)
} // variance checks fails
Find out more about variance in lecture 4.4 and lecture 4.5
Pattern matching is used for decomposing data structures:
unknownObject match {
case MyClass(n) => ...
case MyClass2(a, b) => ...
}
Here are a few example patterns
(someList: List[T]) match {
case Nil => ... // empty list
case x :: Nil => ... // list with only one element
case List(x) => ... // same as above
case x :: xs => ... // a list with at least one element. x is bound to the head,
// xs to the tail. xs could be Nil or some other list.
case 1 :: 2 :: cs => ... // lists that starts with 1 and then 2
case (x, y) :: ps => ... // a list where the head element is a pair
}
The last example shows that every pattern consists of sub-patterns: it
only matches lists with at least one element, where that element is a
pair. x
and y
are again patterns that could match only specific
types.
Pattern matching can also be used for Option
values. Some
functions (like Map.get
) return a value of type Option[T]
which
is either a value of type Some[T]
or the value None
:
val myMap = Map("a" -> 42, "b" -> 43)
def getMapValue(s: String): String = {
myMap get s match {
case Some(nb) => "Value found: " + nb
case None => "No value found"
}
}
getMapValue("a") // "Value found: 42"
getMapValue("c") // "No value found"
Most of the times when you write a pattern match on an option value,
the same expression can be written more concisely using combinator
methods of the Option
class. For example, the function getMapValue
can be written as follows:
def getMapValue(s: String): String =
myMap.get(s).map("Value found: " + _).getOrElse("No value found")
Pattern matches are also used quite often in anonymous functions:
val pairs: List[(Char, Int)] = ('a', 2) :: ('b', 3) :: Nil
val chars: List[Char] = pairs.map(p => p match {
case (ch, num) => ch
})
Instead of p => p match { case ... }
, you can simply write {case ...}
, so the above example becomes more concise:
val chars: List[Char] = pairs map {
case (ch, num) => ch
}
Scala defines several collection classes:
Iterable
(collections you can iterate on)Seq
(ordered sequences)Set
Map
(lookup data structure)
List
(linked list, provides fast sequential access)Stream
(same as List, except that the tail is evaluated only on demand)Vector
(array-like type, implemented as tree of blocks, provides fast random access)Range
(ordered sequence of integers with equal spacing)String
(Java type, implicitly converted to a character sequence, so you can treat every string like aSeq[Char]
)Map
(collection that maps keys to values)Set
(collection without duplicate elements)
Array
(Scala arrays are native JVM arrays at runtime, therefore they are very performant)- Scala also has mutable maps and sets; these should only be used if there are performance issues with immutable types
val fruitList = List("apples", "oranges", "pears")
// Alternative syntax for lists
val fruit = "apples" :: ("oranges" :: ("pears" :: Nil)) // parens optional, :: is right-associative
fruit.head // "apples"
fruit.tail // List("oranges", "pears")
val empty = List()
val empty = Nil
val nums = Vector("louis", "frank", "hiromi")
nums(1) // element at index 1, returns "frank", complexity O(log(n))
nums.updated(2, "helena") // new vector with a different string at index 2, complexity O(log(n))
val fruitSet = Set("apple", "banana", "pear", "banana")
fruitSet.size // returns 3: there are no duplicates, only one banana
val r: Range = 1 until 5 // 1, 2, 3, 4
val s: Range = 1 to 5 // 1, 2, 3, 4, 5
1 to 10 by 3 // 1, 4, 7, 10
6 to 1 by -2 // 6, 4, 2
val s = (1 to 6).toSet
s map (_ + 2) // adds 2 to each element of the set
val s = "Hello World"
s filter (c => c.isUpper) // returns "HW"; strings can be treated as Seq[Char]
// Operations on sequences
val xs = List(...)
xs.length // number of elements, complexity O(n)
xs.last // last element (exception if xs is empty), complexity O(n)
xs.init // all elements of xs but the last (exception if xs is empty), complexity O(n)
xs take n // first n elements of xs
xs drop n // the rest of the collection after taking n elements
xs(n) // the nth element of xs, complexity O(n)
xs ++ ys // concatenation, complexity O(n)
xs.reverse // reverse the order, complexity O(n)
xs updated(n, x) // same list than xs, except at index n where it contains x, complexity O(n)
xs indexOf x // the index of the first element equal to x (-1 otherwise)
xs contains x // same as xs indexOf x >= 0
xs filter p // returns a list of the elements that satisfy the predicate p
xs filterNot p // filter with negated p
xs partition p // same as (xs filter p, xs filterNot p)
xs takeWhile p // the longest prefix consisting of elements that satisfy p
xs dropWhile p // the remainder of the list after any leading element satisfying p have been removed
xs span p // same as (xs takeWhile p, xs dropWhile p)
List(x1, ..., xn) reduceLeft op // (...(x1 op x2) op x3) op ...) op xn
List(x1, ..., xn).foldLeft(z)(op) // (...( z op x1) op x2) op ...) op xn
List(x1, ..., xn) reduceRight op // x1 op (... (x{n-1} op xn) ...)
List(x1, ..., xn).foldRight(z)(op) // x1 op (... ( xn op z) ...)
xs exists p // true if there is at least one element for which predicate p is true
xs forall p // true if p(x) is true for all elements
xs zip ys // returns a list of pairs which groups elements with same index together
xs unzip // opposite of zip: returns a pair of two lists
xs.flatMap f // applies the function to all elements and concatenates the result
xs.sum // sum of elements of the numeric collection
xs.product // product of elements of the numeric collection
xs.max // maximum of collection
xs.min // minimum of collection
xs.flatten // flattens a collection of collection into a single-level collection
xs groupBy f // returns a map which points to a list of elements
xs distinct // sequence of distinct entries (removes duplicates)
x +: xs // creates a new collection with leading element x
xs :+ x // creates a new collection with trailing element x
// Operations on maps
val myMap = Map("I" -> 1, "V" -> 5, "X" -> 10) // create a map
myMap("I") // => 1
myMap("A") // => java.util.NoSuchElementException
myMap get "A" // => None
myMap get "I" // => Some(1)
myMap.updated("V", 15) // returns a new map where "V" maps to 15 (entry is updated)
// if the key ("V" here) does not exist, a new entry is added
// Operations on Streams
val xs = Stream(1, 2, 3)
val xs = Stream.cons(1, Stream.cons(2, Stream.cons(3, Stream.empty))) // same as above
(1 to 1000).toStream // => Stream(1, ?)
x #:: xs // Same as Stream.cons(x, xs)
// In the Stream's cons operator, the second parameter (the tail)
// is defined as a "call by name" parameter.
// Note that x::xs always produces a List
val pair = ("answer", 42) // type: (String, Int)
val (label, value) = pair // label = "answer", value = 42
pair._1 // "answer"
pair._2 // 42
There is already a class in the standard library that represents orderings: scala.math.Ordering[T]
which contains
comparison functions such as lt()
and gt()
for standard types. Types with a single natural ordering should inherit from
the trait scala.math.Ordered[T]
.
import math.Ordering
def msort[T](xs: List[T])(implicit ord: Ordering) = { ...}
msort(fruits)(Ordering.String)
msort(fruits) // the compiler figures out the right ordering
A for-comprehension is syntactic sugar for map
, flatMap
and filter
operations on collections.
The general form is for (s) yield e
s
is a sequence of generators and filtersp <- e
is a generatorif f
is a filter- If there are several generators (equivalent of a nested loop), the last generator varies faster than the first
- You can use
{ s }
instead of( s )
if you want to use multiple lines without requiring semicolons e
is an element of the resulting collection
// list all combinations of numbers x and y where x is drawn from
// 1 to M and y is drawn from 1 to N
for (x <- 1 to M; y <- 1 to N)
yield (x,y)
is equivalent to
(1 to M) flatMap (x => (1 to N) map (y => (x, y)))
A for-expression looks like a traditional for loop but works differently internally
for (x <- e1) yield e2
is translated to e1.map(x => e2)
for (x <- e1 if f) yield e2
is translated to for (x <- e1.filter(x => f)) yield e2
for (x <- e1; y <- e2) yield e3
is translated to e1.flatMap(x => for (y <- e2) yield e3)
This means you can use a for-comprehension for your own type, as long
as you define map
, flatMap
and filter
.
For more, see lecture 6.5.
for {
i <- 1 until n
j <- 1 until i
if isPrime(i + j)
} yield (i, j)
is equivalent to
for (i <- 1 until n; j <- 1 until i if isPrime(i + j))
yield (i, j)
is equivalent to
(1 until n).flatMap(i => (1 until i).filter(j => isPrime(i + j)).map(j => (i, j)))