# Rosetta Stone: reservoir random sampling algorithm

I've been killing some time with a little puzzle project -- writing the algorithm described in Knuth for random sampling of a population without knowing the size of the population in advance. So far I've written it in JavaScript Rhino, Clojure, Groovy, Python, and Haskell. The basic parameters are:

• the function takes two arguments, a sample size and the population
• the algorithm should work on the language's basic representation of an iterable item -- e.g. seqs for Clojure, lazy lists for Haskell, iterators for Python, etc.
• the algorithm should work on a stream of values, and not require any more than O(sample-size) memory.
• the algorithm should not do any unnecessary comparisons

Would anyone like to add their own versions, or fix bugs or poor expression in my versions?

import Data.Array
import Random

randomSample 0 _ = return []
randomSample sampleSize items =
(listArray (0,(length sample) - 1) sample)
(zip [sampleSize..] others))
where (sample, others) = splitAt sampleSize items
do index <- getStdRandom (randomR (0,fst item))
return (if index < sampleSize
then current // [(index, (snd item))]
else current)

import Data.Array
import Random

randomSample 0 _ = return []
randomSample sampleSize items =
liftM elems \$ foldM addItem (reservoir \$ take sampleSize items) others
where reservoir x = listArray (0,length x - 1) x
others = zip [sampleSize..] \$ drop sampleSize items
do index <- getStdRandom \$ randomR (0, fst item)
return \$! if index < sampleSize
then current // [(index, snd item)]
else current
-
You might get more replies if you outlined the algorithm beyond calling it "the algorithm described in Knuth". –  ShreevatsaR Nov 27 '08 at 5:25
I figured the five versions would be a good enough outline. ;) –  Steven Huwig Nov 27 '08 at 5:32
Nevertheless I found a decent blog post on the subject and linked it above. –  Steven Huwig Nov 27 '08 at 5:33
I think you should add these solutions as separate answers, especially for a rosetta stone question like this. (Nothing wrong with answering your own questions, according to the founders of StackOverflow.) Great question, btw. –  dreeves Feb 11 '09 at 2:11

The Haskell version is not very efficient. It relies on replacing the n-th item in the reservoir list by index, which is O(n).

A better solution is to use the array accumulation function "accum", which takes an accumulation function, an existing array, and a list of (index,value) pairs. The accumulation function in this case is (flip const), which always returns its second argument. So the reservoir is defined as the first n items in the list and the rest of the list xs1 is zipped with a stream of random numbers into the select function. Each item from xs1 is passed to accum if the corresponding random number is less than n. The stream of random numbers, rs, starts at a range [0,n] inclusive and the upper bound is then incremented for each successive number.

Also this version takes a random generator g instead of using the IO monad generator.

module Reservoir where

import Data.Array
import Data.Maybe
import System.Random

reservoirArray :: StdGen -> Int -> [a] -> Array Int a
reservoirArray g n xs =
if null xs1
then listArray (0, length res - 1) res
else accum (flip const) reservoir \$ catMaybes \$
zipWith select (rs n g) xs1
where
rs k g1 = let (v, g2) = randomR (0, k) g1 in v : rs (k+1) g2
(res, xs1) = splitAt n xs
reservoir = listArray (0, n-1) res
select r x = if r < n then Just (r, x) else Nothing

reservoirList :: StdGen -> Int -> [a] -> [a]
reservoirList g n xs = elems \$ reservoirArray g n xs
-
Thank you very much for your rewrite. I was under the impression that the reservoir was an array and hence replacement would be O(1). The "listArray" call in the definition of reservoir was supposed to do that. I definitely found that the random number generator was very slow in my implementation. –  Steven Huwig Jan 5 '09 at 15:30
flip const == const id, and the latter is shorter ;-) More seriously, you should use Random g => g instead of StdGen and return the final random state, or switch to using Control.Monad.Random. –  ephemient Feb 14 '10 at 19:40

Lua

function randomsample (samplesize, items)
local sample = {}
if samplesize == 0 then return sample end
for num,item in ipairs(items) do
if num <= samplesize then
sample[num] = items[num]
else
local index = math.random(num)
if index <= samplesize then sample[index] = item end
end
end
return sample
end
-
I like that one. So many languages to learn, so little time. –  Steven Huwig Nov 26 '08 at 19:08

Pascal (Delphi, Lazarus)

type
ainteger=array of integer;

procedure randomsample(n,k:integer;var x:ainteger);
var
t,m:integer;
f:boolean;
begin
setlength(x,k);
t:=0; m:=0;
while m<k do begin
f:=random(n-t)<(k-m);
t:=t+1;
if f then begin
x[m]:=t;
m:=m+1;
end;
end;
end;
-

Ocaml, w/ streams:

(* [reservoir_sampling ?seed stream length] Creates an array of an unknown
* number of values from [stream] of size [length].
*
* Caveat: if the stream is previously read it will return an incorrect
* value of Stream.count that is used for the seen values. Change the code
* to using a reference if this is a problem *)
val reservoir_sampling : ?seed:int -> 'a Stream.t -> int -> 'a array

let reservoir_sampling ?seed stream length =
let () = match seed with | Some x -> Random.init x
| None -> Random.self_init ()
and ray = Array.init length (fun _ -> Stream.next stream) in
Stream.iter
(fun x ->
let ran = Random.int (Stream.count stream) in
if ran < length then Array.set ray ran x;
) stream;
ray
-

Note that in your solution, there is a big bias for the order of the items, in the first items - since the first n items are already placed in a specific location.

A 'clean' random.sample may, for instance, return the number 2 when sampling 5 elements out of 1-100, in any of the five places. However, this solution may only return in in the second place. Although the latest items will be returned in any location, the first ones are causing the bias. So although a set-test (just checking the elements returned) will be legit, the order is not very random. Perhaps re-shuffling the sample before returning, would be better (another flag-parameter?), or it can be inserted into the beginning of the function, in a more complex way..

S.

-
Since samples are sets and sets are unordered, I didn't really care about the order. In fact, my typical use case is to resort them according to the original order in the file, since that's the only way that join(1) can be used to select records in other files. –  Steven Huwig Jun 22 '10 at 0:43
Besides this is really Waterman's solution, not mine. ;) –  Steven Huwig Jun 22 '10 at 0:46

Python (2.6+):

from random import randint
from itertools import islice

def random_sample(sample_size, items):
if sample_size == 0:
return []
items = iter(items)
sample = list(islice(items, sample_size))
for num, item in enumerate(items, start=sample_size):
try:
sample[randint(0, num)] = item
except IndexError:
pass
return sample
-
@Beni Cherniavsky-Paskin: thanks for the edit, but this new implementation compares num to sample_size on every iteration, which is unnecessary. –  Steven Huwig Feb 15 '10 at 1:30
you're right, it's a waste to test every iteration if size of items >> sample_size. Restored your version, up to start=sample_size, and iter(items) to work right with an iterable that is not an iterator. –  Beni Cherniavsky-Paskin Sep 4 '11 at 21:31

Groovy:

def randomSample(sampleSize, items) {
def sample = []
if (sampleSize == 0)
return sample
items = items.iterator()
def count = 0;
while (count++ < sampleSize && items.hasNext()) {
sample.push(items.next())
}
items.eachWithIndex { item, i ->
def index = new Random().nextInt(i + sampleSize)
if (index < sampleSize)
sample[index] = item
}
return sample;
}
-

JavaScript Rhino:

function randomSample(sampleSize, items) {
var sample = [];
if (sampleSize == 0)
return sample;
items = Iterator(items);
for each (let [num, item] in items) {
if (num >= sampleSize)
break;
sample.push(item);
}
for each (let [num, item] in items) {
var index = Math.floor(Math.random() * num);
if (index < sampleSize)
sample[index] = item;
}
return sample;
}
-

PLT Scheme with lots of streams:

(require srfi/27)
(require srfi/41)

(define (random-sample size input)
(let ((first-part (stream-take size input))
(second-part (stream-drop size input))
(pool (make-vector size)))
(stream-for-each (match-lambda ((list i val)
(vector-set! pool i val)))
(stream-zip (stream-from 0) first-part))
(stream-for-each (match-lambda ((list i val)
(let ((random-index (random-integer i)))
(when (< random-index size)
(vector-set! pool random-index val)))))
(stream-zip (stream-from size) second-part))
(vector->list pool)))
-

Clojure:

(defn random-sample [sample-size items]
(if (= sample-size 0) []
(let [[sample remaining-items] (split-at sample-size items)]
(second (reduce (fn [[num sample] item]
(let [index (rand-int num)]
(if (< index sample-size)
[(inc num) (assoc sample index item)]
[(inc num) sample])))
[(inc sample-size) (vec sample)]
remaining-items)))))
-