In computer science, a generator is a routine that can be used to control the iteration behaviour of a loop. All generators are also iterators.[1] A generator is very similar to a function that returns an array, in that a generator has parameters, can be called, and generates a sequence of values. However, instead of building an array containing all the values and returning them all at once, a generator yields the values one at a time, which requires less memory and allows the caller to get started processing the first few values immediately. In short, a generator looks like a function but behaves like an iterator.
Generators can be implemented in terms of more expressive control flow constructs, such as coroutines or first-class continuations.[2] Generators, also known as semicoroutines,[3] are a special case of (and weaker than) coroutines, in that they always yield control back to the caller (when passing a value back), rather than specifying a coroutine to jump to; see comparison of coroutines with generators.
Generators are usually invoked inside loops.[4] The first time that a generator invocation is reached in a loop, an iterator object is created that encapsulates the state of the generator routine at its beginning, with arguments bound to the corresponding parameters. The generator's body is then executed in the context of that iterator until a special yield action is encountered; at that time, the value provided with the yield action is used as the value of the invocation expression. The next time the same generator invocation is reached in a subsequent iteration, the execution of the generator's body is resumed after the yield action, until yet another yield action is encountered. In addition to the yield action, execution of the generator body can also be terminated by a finish action, at which time the innermost loop enclosing the generator invocation is terminated. In more complicated situations, a generator may be used manually outside of a loop to create an iterator, which can then be used in various ways.
Because generators compute their yielded values only on demand, they are useful for representing streams, such as sequences that would be expensive or impossible to compute at once. These include e.g. infinite sequences and live data streams.
When eager evaluation is desirable (primarily when the sequence is finite, as otherwise evaluation will never terminate), one can either convert to a list, or use a parallel construction that creates a list instead of a generator. For example, in Python a generator g
can be evaluated to a list l
via l = list(g)
, while in F# the sequence expression seq { ... }
evaluates lazily (a generator or sequence) but [ ... ]
evaluates eagerly (a list).
In the presence of generators, loop constructs of a language – such as for and while – can be reduced into a single loop ... end loop construct; all the usual loop constructs can then be comfortably simulated by using suitable generators in the right way. For example, a ranged loop like for x = 1 to 10
can be implemented as iteration through a generator, as in Python's for x in range(1, 10)
. Further, break
can be implemented as sending finish to the generator and then using continue
in the loop.
Generators first appeared in CLU (1975),[5] were a prominent feature in the string manipulation language Icon (1977) and are now available in Python (2001),[6]C#,[7]Ruby, the later versions of ECMAScript (as of ES6/ES2015) and other languages. In CLU and C#, generators are called iterators, and in Ruby, enumerators.
The final Common Lisp standard does not natively provide generators, yet various library implementations exist, such as SERIES documented in CLtL2 or pygen.
A yield statement is used to implement iterators over user-defined data abstractions.[8]
string_chars = iter (s: string) yields (char);
index: int := 1;
limit: int := string$size (s);
while index <= limit do
yield (string$fetch(s, index));
index := index + 1;
end;
end string_chars;
for c: char in string_chars(s) do
...
end;
Every expression (including loops) is a generator. The language has many generators built-in and even implements some of the logic semantics using the generator mechanism (logical disjunction or "OR" is done this way).
Printing squares from 0 to 20 can be achieved using a co-routine by writing:
local squares, j squares := create (seq(0) ^ 2) every j := |@squares do if j <= 20 then write(j) else break
However, most of the time custom generators are implemented with the "suspend" keyword which functions exactly like the "yield" keyword in CLU.
C does not have generator functions as a language construct, but, as they are a subset of coroutines, it is simple to implement them using any framework that implements stackful coroutines, such as libdill.[9] On POSIX platforms, when the cost of context switching per iteration is not a concern, or full parallelism rather than merely concurrency is desired, a very simple generator function framework can be implemented using pthreads and pipes.
It is possible to introduce generators into C++ using pre-processor macros. The resulting code might have aspects that are very different from native C++, but the generator syntax can be very uncluttered.[10] The set of pre-processor macros defined in this source allow generators defined with the syntax as in the following example:
$generator(descent)
{
int i;
// place the constructor of our generator, e.g.
// descent(int minv, int maxv) {...}
// from $emit to $stop is a body of our generator:
$emit(int) // will emit int values. Start of body of the generator.
for (i = 10; i > 0; --i)
$yield(i); // similar to yield in Python,
// returns next number in [1..10], reversed.
$stop; // stop, end of sequence. End of body of the generator.
};
This can then be iterated using:
int main(int argc, char* argv[])
{
descent gen;
for(int n; gen(n);) // "get next" generator invocation
printf("next number is %d\n", n);
return 0;
}
Moreover, C++11 allows foreach loops to be applied to any class that provides the begin
and end
functions. It's then possible to write generator-like classes by defining both the iterable methods (begin
and end
) and the iterator methods (operator!=
, operator++
and operator*
) in the same class. For example, it is possible to write the following program:
#include <iostream>
int main()
{
for (int i: range(10))
{
std::cout << i << std::endl;
}
return 0;
}
A basic range implementation would look like that:
class range
{
private:
int last;
int iter;
public:
range(int end):
last(end),
iter(0)
{}
// Iterable functions
const range& begin() const { return *this; }
const range& end() const { return *this; }
// Iterator functions
bool operator!=(const range&) const { return iter < last; }
void operator++() { ++iter; }
int operator*() const { return iter; }
};
Perl does not natively provide generators, but support is provided by the Coro::Generator module which uses the Coro co-routine framework. Example usage:
use strict;
use warnings;
# Enable generator { BLOCK } and yield
use Coro::Generator;
# Array reference to iterate over
my $chars = ['A'...'Z'];
# New generator which can be called like a coderef.
my $letters = generator {
my $i = 0;
for my $letter (@$chars) {
# get next letter from $chars
yield $letter;
}
};
# Call the generator 15 times.
print $letters->(), "\n" for (0..15);
In Tcl 8.6, the generator mechanism is founded on named coroutines.
proc generator {body} {
coroutine gen[incr ::disambiguator] apply {{script} {
# Produce the result of [generator], the name of the generator
yield [info coroutine]
# Do the generation
eval $script
# Finish the loop of the caller using a 'break' exception
return -code break
}} $body
}
# Use a simple 'for' loop to do the actual generation
set count [generator {
for {set i 10} {$i <= 20} {incr i} {
yield $i
}
}]
# Pull values from the generator until it is exhausted
while 1 {
puts [$count]
}
In Haskell, with its lazy evaluation model, everything is a generator - every datum created with a non-strict data constructor is generated on demand. For example,
countfrom n = n : countfrom (n+1)
-- Example use: printing out the integers from 10 to 20.
test1 = mapM_ print $ takeWhile (<= 20) $ countfrom 10
primes = 2 : 3 : nextprime 5 where
nextprime n | b = n : nextprime (n+2)
| otherwise = nextprime (n+2)
where b = all ((/= 0).(rem n)) $ takeWhile ((<= n).(^2)) $ tail primes
where (:)
is a non-strict list constructor, cons, and $
is just a "called-with" operator, used for parenthesization. This uses the standard adaptor function,
takeWhile p [] = []
takeWhile p (x:xs) | p x = x : takeWhile p xs
| otherwise = []
which re-fetches values agreeable with a predicate, and stops requesting new values as soon as a non-agreeable one is encountered. The shared storage access is used as a universal mediator in Haskell. List comprehensions can be freely used:
test2 = mapM_ print $ takeWhile (<= 20) [x*x | x <- countfrom 10]
test3 = mapM_ print [x*x | x <- takeWhile (<= 20) $ countfrom 10]
Racket provides several related facilities for generators. First, its for-loop forms work with sequences, which are a kind of a producer:
(for ([i (in-range 10 20)])
(printf "i = ~s\n" i))
and these sequences are also first-class values:
(define 10-to-20 (in-range 10 20))
(for ([i 10-to-20])
(printf "i = ~s\n" i))
Some sequences are implemented imperatively (with private state variables) and some are implemented as (possibly infinite) lazy lists. Also, new struct definitions can have a property that specifies how they can be used as sequences.
But more directly, Racket comes with a generator library for a more traditional generator specification. For example,
#lang racket
(require racket/generator)
(define (ints-from from)
(generator ()
(for ([i (in-naturals from)]) ; infinite sequence of integers from 0
(yield i))))
(define g (ints-from 10))
(list (g) (g) (g)) ; -> '(10 11 12)
Note that the Racket core implements powerful continuation features, providing general (re-entrant) continuations that are composable, and also delimited continuations. Using this, the generator library is implemented in Racket.
The community of PHP implemented generators in PHP 5.5. Details can be found in the original Request for Comments: Generators.
Infinite Fibonacci sequence:
function fibonacci()
{
$last = 0;
$current = 1;
yield 1;
while (true) {
$current = $last + $current;
$last = $current - $last;
yield $current;
}
}
foreach (fibonacci() as $number) {
echo $number, "\n";
}
Fibonacci sequence with limit:
function fibonacci(int $limit):generator
{
yield $a = $b = $i = 1;
while (++$i < $limit) {
yield $a = ($b = $a + $b) - $a;
}
}
foreach (fibonacci(10) as $number) {
echo "$number\n";
}
Any function which contains a yield statement is automatically a generator function.
Ruby supports generators (starting from version 1.9) in the form of the built-in Enumerator class.
# Generator from an Enumerator object
chars = Enumerator.new(['A', 'B', 'C', 'Z'])
4.times { puts chars.next }
# Generator from a block
count = Enumerator.new do |yielder|
i = 0
loop { yielder.yield i += 1 }
end
100.times { puts count.next }
Java has had a standard interface for implementing iterators since its early days, and since Java 5, the "foreach" construction makes it easy to loop over objects that provide the java.lang.Iterable
interface. (The Java collections framework and other collections frameworks, typically provide iterators for all collections.)
However, Java does not have generators built into the language. This means that creating iterators is often much trickier than in languages with built-in generators, especially when the generation logic is complex. Because all state must be saved and restored every time an item is to be yielded from an iterator, it is not possible to store state in local variables or use built-in looping routines, as when generators are available; instead, all of this must be manually simulated, using object fields to hold local state and loop counters.
Even simple iterators built this way tend to be significantly bulkier than those using generators, with a lot of boilerplate code.
The original example above could be written in Java 5 as:
// Iterator implemented as anonymous class. This uses generics but doesn't need to.
for (int i: new Iterable<Integer>() {
@Override
public Iterator<Integer> iterator() {
return new Iterator<Integer>() {
int counter = 1;
@Override
public boolean hasNext() {
return counter <= 100;
}
@Override
public Integer next() {
return counter++;
}
@Override
public void remove() {
throw new UnsupportedOperationException();
}
};
}
}) {
System.out.println(i);
}
An infinite Fibonacci sequence could also be written in Java 5 as an Iterator:
Iterable<Integer> fibo = new Iterable<Integer>() {
@Override
public Iterator<Integer> iterator() {
return new Iterator<Integer>() {
int a = 1, b = 2;
@Override
public boolean hasNext() {
return true;
}
@Override
public Integer next() {
int temp = a;
a = b;
b = a + temp;
return temp;
}
@Override
public void remove() {
throw new UnsupportedOperationException();
}
};
}
};
// this could then be used as...
for (int f: fibo) {
System.out.println("next Fibonacci number is " + f);
if (someCondition(f)) break;
}
Also an infinite Fibonacci sequence could also be written using Java 8 Stream interface:
IntStream.generate(new IntSupplier() {
int a = 1, b = 2;
public int getAsInt() {
int temp = a;
a = b;
b = a + temp;
return temp;
}
}).forEach(System.out::println);
Or get an Iterator from the Java 8 super-interface BaseStream of Stream interface.
public Iterable<Integer> fibonacci(int limit){
return IntStream.generate(new IntSupplier() {
int a = 1, b = 2;
public int getAsInt() {
int temp = a;
a = b;
b = a + temp;
return temp;
}
}).limit(limit).boxed()::iterator;
}
// this could then be used as...
for (int f: fibonacci(10)) {
System.out.println(f);
}
An example C# 2.0 generator (the yield
is available since C# version 2.0):
Both of these examples utilize generics, but this is not required. yield keyword also helps in implementing custom stateful iterations over a collection as discussed in this discussion.[11]
// Method that takes an iterable input (possibly an array)
// and returns all even numbers.
public static IEnumerable<int> GetEven(IEnumerable<int> numbers)
{
foreach (int number in numbers)
{
if ((number % 2) == 0)
{
yield return number;
}
}
}
It is possible to use multiple yield return
statements and they are applied in sequence on each iteration:
public class CityCollection : IEnumerable<string>
{
public IEnumerator<string> GetEnumerator()
{
yield return "New York";
yield return "Paris";
yield return "London";
}
}
In XL, iterators are the basis of 'for' loops:
import IO = XL.UI.CONSOLE
iterator IntegerIterator (var out Counter : integer; Low, High : integer) written Counter in Low..High is
Counter := Low
while Counter <= High loop
yield
Counter += 1
// Note that I needs not be declared, because declared 'var out' in the iterator
// An implicit declaration of I as an integer is therefore made here
for I in 1..5 loop
IO.WriteLn "I=", I
F# provides generators via sequence expressions, since version 1.9.1.[12] These can define a sequence (lazily evaluated, sequential access) via seq { ... }
, a list (eagerly evaluated, sequential access) via [ ... ]
or an array (eagerly evaluated, indexed access) via [| ... |]
that contain code that generates values. For example,
seq { for b in 0 .. 25 do
if b < 15 then
yield b * b }
forms a sequence of squares of numbers from 0 to 14 by filtering out numbers from the range of numbers from 0 to 25.
Generators were added to Python in version 2.2 in 2001.[6] An example generator:
from typing import Iterator
def countfrom(n: int) -> Iterator[int]:
while True:
yield n
n += 1
# Example use: printing out the integers from 10 to 20.
# Note that this iteration terminates normally, despite
# countfrom() being written as an infinite loop.
for i in countfrom(10):
if i <= 20:
print(i)
else:
break
# Another generator, which produces prime numbers indefinitely as needed.
import itertools
def primes() -> Iterator[int]:
yield 2
n = 3
p = []
while True:
# If dividing n by all the numbers in p, up to and including sqrt(n),
# produces a non-zero remainder then n is prime.
if all(n % f > 0 for f in itertools.takewhile(lambda f: f*f <= n, p)):
yield n
p.append(n)
n += 2
In Python, a generator can be thought of as an iterator that contains a frozen stack frame. Whenever next()
is called on the iterator, Python resumes the frozen frame, which executes normally until the next yield
statement is reached. The generator's frame is then frozen again, and the yielded value is returned to the caller.
PEP 380 (implemented in Python 3.3) adds the yield from
expression, allowing a generator to delegate part of its operations to another generator or iterable.[13]
Python has a syntax modeled on that of list comprehensions, called a generator expression that aids in the creation of generators.
The following extends the first example above by using a generator expression to compute squares from the countfrom
generator function:
squares = (n * n for n in countfrom(2))
for j in squares:
if j <= 20:
print(j)
else:
break
ECMAScript 6 (a.k.a. Harmony) introduced generator functions.
An infinite Fibonacci sequence can be written using a function generator:
function* fibonacci(limit) {
let [prev, curr] = [0, 1];
while (!limit || curr <= limit) {
yield curr;
[prev, curr] = [curr, prev + curr];
}
}
// bounded by upper limit 10
for (const n of fibonacci(10)) {
console.log(n);
}
// generator without an upper bound limit
for (const n of fibonacci()) {
console.log(n);
if (n > 10000) break;
}
// manually iterating
let fibGen = fibonacci();
console.log(fibGen.next().value); // 1
console.log(fibGen.next().value); // 1
console.log(fibGen.next().value); // 2
console.log(fibGen.next().value); // 3
console.log(fibGen.next().value); // 5
console.log(fibGen.next().value); // 8
// picks up from where you stopped
for (const n of fibGen) {
console.log(n);
if (n > 10000) break;
}
The iterators package can be used for this purpose.[14][15]
library(iterators)
# Example ------------------
abc <- iter(c('a','b','c'))
nextElem(abc)
Example in Pharo Smalltalk:
The Golden ratio generator below returns to each invocation 'goldenRatio next' a better approximation to the Golden Ratio.
goldenRatio := Generator on: [ :g | | x y z r |
x := 0.
y := 1.
[
z := x + y.
r := (z / y) asFloat.
x := y.
y := z.
g yield: r
] repeat
].
goldenRatio next.
The expression below returns the next 10 approximations.
Character cr join: ((1 to: 10) collect: [ :dummy | ratio next ]).
See more in A hidden gem in Pharo: Generator.
By: Wikipedia.org
Edited: 2021-06-18 14:09:04
Source: Wikipedia.org