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Streams, sometimes called lazy lists, are a sequential data structure containing elements computed only on demand. A stream is either null or is a pair with a stream in its cdr. Since elements of a stream are computed only when accessed, streams can be infinite. Once computed, the value of a stream element is cached in case it is needed again.
Streams without memoization were first described by Peter Landin in 1965. Memoization became accepted as an essential feature of streams about a decade later. Today, streams are the signature data type of functional programming languages such as Haskell.
This Scheme Request for Implementation describes two libraries for operating on streams: a canonical set of stream primitives and a set of procedures and syntax derived from those primitives that permits convenient expression of stream operations. They rely on facilities provided by R6RS, including libraries, records, and error reporting. To load both stream libraries, say:
(import (streams))
Harold Abelson and Gerald Jay Sussman discuss streams at length, giving a strong justification for their use. The streams they provide are represented as a cons pair with a promise to return a stream in its cdr; for instance, a stream with elements the first three counting numbers is represented conceptually as (cons 1 (delay (cons 2 (delay (cons 3 (delay '())))))). Philip Wadler, Walid Taha and David MacQueen describe such streams as odd because, regardless of their length, the parity of the number of constructors (delay, cons, '()) in the stream is odd.
The streams provided here differ from those of Abelson and Sussman, being represented as promises that contain a cons pair with a stream in its cdr; for instance, the stream with elements the first three counting numbers is represented conceptually as (delay (cons 1 (delay (cons 2 (delay (cons 3 (delay '()))))))); this is an even stream because the parity of the number of constructors in the stream is even.
Even streams are more complex than odd streams in both definition and usage, but they offer a strong benefit: they fix the off-by-one error of odd streams. Wadler, Taha and MacQueen show, for instance, that an expression like (stream->list 4 (stream-map / (stream-from 4 -1))) evaluates to (1/4 1/3 1/2 1) using even streams but fails with a divide-by-zero error using odd streams, because the next element in the stream, which will be 1/0, is evaluated before it is accessed. This extra bit of laziness is not just an interesting oddity; it is vitally critical in many circumstances, as will become apparent below.
When used effectively, the primary benefit of streams is improved modularity. Consider a process that takes a sequence of items, operating on each in turn. If the operation is complex, it may be useful to split it into two or more procedures in which the partially-processed sequence is an intermediate result. If that sequence is stored as a list, the entire intermediate result must reside in memory all at once; however, if the intermediate result is stored as a stream, it can be generated piecemeal, using only as much memory as required by a single item. This leads to a programming style that uses many small operators, each operating on the sequence of items as a whole, similar to a pipeline of unix commands.
In addition to improved modularity, streams permit a clear exposition of backtracking algorithms using the “stream of successes” technique, and they can be used to model generators and co-routines. The implicit memoization of streams makes them useful for building persistent data structures, and the laziness of streams permits some multi-pass algorithms to be executed in a single pass. Savvy programmers use streams to enhance their programs in countless ways.
There is an obvious space/time trade-off between lists and streams; lists take more space, but streams take more time (to see why, look at all the type conversions in the implementation of the stream primitives). Streams are appropriate when the sequence is truly infinite, when the space savings are needed, or when they offer a clearer exposition of the algorithms that operate on the sequence.
α stream
:: (promise stream-null)
| (promise (α stream-pair))
α stream-pair
:: (promise α) × (promise (α stream))
The object stored in the stream-car of a stream-pair is a promise that is forced the first time the stream-car is accessed; its value is cached in case it is needed again. The object may have any type, and different stream elements may have different types. If the stream-car is never accessed, the object stored there is never evaluated. Likewise, the stream-cdr is a promise to return a stream, and is only forced on demand.
This library provides eight operators: constructors for stream-null and stream-pairs, type recognizers for streams and the two kinds of streams, accessors for both fields of a stream-pair, and a lambda that creates procedures that return streams.
constructor: stream-null
Stream-null is a promise that, when forced, is
a single object, distinguishable from all other objects, that represents
the null stream. Stream-null is immutable and unique.
constructor: (stream-cons object stream)
Stream-cons is a macro that accepts an object
and a stream and creates a newly-allocated stream containing a promise that, when forced,
is a stream-pair with the object in its stream-car
and the stream in its stream-cdr. Stream-cons must be syntactic, not procedural,
because neither object nor stream is evaluated when stream-cons
is called. Since stream is not evaluated, when the stream-pair
is created, it is not an error to call stream-cons with a stream that is not of
type stream;
however, doing so will cause an error later when the stream-cdr of the stream-pair is accessed. Once created, a stream-pair
is immutable; there is no stream-set-car! or stream-set-cdr! that modifies an existing stream-pair.
There is no dotted-pair or improper stream as with lists.
recognizer: (stream? object)
Stream? is a procedure that takes an object
and returns #t
if the object is a stream and #f otherwise. If object
is a stream, stream? does not force its promise.
If (stream? obj) is #t, then one of (stream-null?
obj) and (stream-pair?
obj) will be #t
and the other will be #f; if (stream?
obj) is #f, both (stream-null?
obj) and (stream-pair?
obj) will be #f.
recognizer: (stream-null? object)
Stream-null? is a procedure that takes an object
and returns #t
if the object is the distinguished null stream and #f
otherwise. If object is a stream, stream-null? must force its promise in order to
distinguish stream-null from stream-pair.
recognizer: (stream-pair? object)
Stream-pair? is a procedure that takes an object
and returns #t
if the object is a stream-pair constructed by stream-cons and #f otherwise. If object
is a stream, stream-pair? must force its promise in order to
distinguish stream-null from stream-pair.
accessor: (stream-car stream)
Stream-car is a procedure that takes a stream
and returns the object stored in the stream-car of the stream. Stream-car
signals an error if the object passed to it is not a stream-pair. Calling stream-car causes the object stored there to
be evaluated if it has not yet been; the object’s value is cached
in case it is needed again.
accessor: (stream-cdr stream)
Stream-cdr is a procedure that takes a stream
and returns the stream stored in the stream-cdr of the stream. Stream-cdr
signals an error if the object passed to it is not a stream-pair. Calling stream-cdr
does not force the promise containing the stream stored in the
stream-cdr of the stream.
lambda: (stream-lambda args body)
Stream-lambda creates a procedure that returns a
promise to evaluate the body of the procedure. The last
body expression to be evaluated must yield a stream. As with
normal lambda,
args may be a single variable name, in which case all the formal
arguments are collected into a single list, or a list of variable names,
which may be null if there are no arguments, proper if there are an
exact number of arguments, or dotted if a fixed number of arguments
is to be followed by zero or more arguments collected into a list.
Body must contain at least one expression, and may contain internal
definitions preceding any expressions to be evaluated.
(define strm123 (stream-cons 1 (stream-cons 2 (stream-cons 3 stream-null))))
(stream-car strm123) ⇒ 1
(stream-car (stream-cdr strm123) ⇒ 2
(stream-pair? (stream-cdr (stream-cons (/ 1 0) stream-null))) ⇒ #f
(stream? (list 1 2 3)) ⇒ #f
(define iter (stream-lambda (f x) (stream-cons x (iter f (f x)))))
(define nats (iter (lambda (x) (+ x 1)) 0))
(stream-car (stream-cdr nats)) ⇒ 1
(define stream-add (stream-lambda (s1 s2) (stream-cons (+ (stream-car s1) (stream-car s2)) (stream-add (stream-cdr s1) (stream-cdr s2)))))
(define evens (stream-add nats nats))
(stream-car evens) ⇒ 0
(stream-car (stream-cdr evens)) ⇒ 2
(stream-car (stream-cdr (stream-cdr evens))) ⇒ 4
The (streams derived) library provides useful procedures and syntax that depend on the primitives defined above. In the operator templates given below, an ellipsis ... indicates zero or more repetitions of the preceding subexpression and square brackets […] indicate optional elements. In the type annotations given below, square brackets […] refer to lists, curly braces {…} refer to streams, and nat refers to exact non-negative integers.
syntax: (define-stream
(name args) body)
Define-stream creates a procedure that returns a
stream, and may appear anywhere a normal define may appear, including as an internal
definition, and may have internal definitions of its own, including
other define-streams. The defined procedure takes
arguments in the same way as stream-lambda. Define-stream is syntactic sugar on stream-lambda;
see also stream-let, which is also a sugaring of stream-lambda.
A simple version of stream-map that takes only a single input stream calls itself recursively:
(define-stream (stream-map proc strm)
(if (stream-null? strm)
stream-null
(stream-cons
(proc (stream-car strm))
(stream-map proc (stream-cdr strm))))))
procedure: (list->stream list-of-objects)
[α] → {α}
List->stream takes a list of objects and returns
a newly-allocated stream containing in its elements the objects in the
list. Since the objects are given in a list, they are evaluated
when list->stream is called, before the stream is created.
If the list of objects is null, as in (list->stream
'()), the null stream is
returned. See also stream.
(define strm123 (list->stream '(1 2 3)))
; fails with divide-by-zero error
(define s (list->stream (list 1 (/ 1 0) -1)))
procedure: (port->stream
[port])
port → {char}
Port->stream takes a port and returns a
newly-allocated stream containing in its elements the characters on
the port. If port is not given it defaults to the current
input port. The returned stream has finite length and is terminated
by stream-null.
It looks like one use of port->stream would be this:
(define s ;wrong!
(with-input-from-file filename
(lambda () (port->stream))))
But that fails, because with-input-from-file is eager, and closes the input port prematurely, before the first character is read. To read a file into a stream, say:
(define-stream (file->stream filename)
(let ((p (open-input-file filename)))
(stream-let loop ((c (read-char p)))
(if (eof-object? c)
(begin (close-input-port p)
stream-null)
(stream-cons c
(loop (read-char p)))))))
syntax: (stream object ...)
Stream is syntax that takes zero or more
objects and creates a newly-allocated stream containing in its elements
the objects, in order. Since stream is syntactic, the objects are
evaluated when they are accessed, not when the stream is created.
If no objects are given, as in (stream), the null stream is returned.
See also list->stream.
(define strm123 (stream 1 2 3))
; (/ 1 0) not evaluated when stream is created
(define s (stream 1 (/ 1 0) -1))
procedure: (stream->list
[n] stream)
nat × {α} → [α]
Stream->list takes a natural number n and
a stream and returns a newly-allocated list containing in its
elements the first n items in the stream. If the stream
has less than n items all the items in the stream will
be included in the returned list. If n is not given it
defaults to infinity, which means that unless stream is finite stream->list
will never return.
(stream->list 10 (stream-map (lambda (x) (* x x)) (stream-from 0))) ⇒ (0 1 4 9 16 25 36 49 64 81)
procedure:
(stream-append stream ...)
{α} ... → {α}
Stream-append returns a newly-allocated stream containing
in its elements those elements contained in its input streams,
in order of input. If any of the input streams is infinite,
no elements of any of the succeeding input streams will appear
in the output stream; thus, if x is infinite, (stream-append
x y) ≡ x. See also stream-concat.
Quicksort can be used to sort a stream, using stream-append to build the output; the sort is lazy; so if only the beginning of the output stream is needed, the end of the stream is never sorted.
(define-stream (qsort lt? strm)
(if (stream-null? strm)
stream-null
(let ((x (stream-car strm))
(xs (stream-cdr strm)))
(stream-append
(qsort lt?
(stream-filter
(lambda (u) (lt? u x))
xs))
(stream x)
(qsort lt?
(stream-filter
(lambda (u) (not (lt? u x)))
xs))))))
Note also that, when used in tail position as in qsort, stream-append does not suffer the poor performance of append on lists. The list version of append requires re-traversal of all its list arguments except the last each time it is called. But stream-append is different. Each recursive call to stream-append is suspended; when it is later forced, the preceding elements of the result have already been traversed, so tail-recursive loops that produce streams are efficient even when each element is appended to the end of the result stream. This also implies that during traversal of the result only one promise needs to be kept in memory at a time.
procedure: (stream-concat stream)
{{α}} ... → {α}
Stream-concat takes a stream consisting of
one or more streams and returns a newly-allocated stream containing
all the elements of the input streams. If any of the streams in
the input stream is infinite, any remaining streams in the input
stream will never appear in the output stream. See also stream-append.
(stream->list
(stream-concat
(stream
(stream 1 2) (stream) (stream 3 2 1))))
⇒ (1 2 3 2 1)
The permutations of a finite stream can be determined by interleaving each element of the stream in all possible positions within each permutation of the other elements of the stream. Interleave returns a stream of streams with x inserted in each possible position of yy:
(define-stream (interleave x yy)
(stream-match yy
(() (stream (stream x)))
((y . ys)
(stream-append
(stream (stream-cons x yy))
(stream-map
(lambda (z) (stream-cons y z))
(interleave x ys))))))
(define-stream (perms xs)
(if (stream-null? xs)
(stream (stream))
(stream-concat
(stream-map
(lambda (ys)
(interleave (stream-car xs) ys))
(perms (stream-cdr xs))))))
procedure: (stream-constant object ...)
α ... → {α}
Stream-constant takes one or more objects and
returns a newly-allocated stream containing in its elements the objects,
repeating the objects in succession forever.
(stream-constant 1) ⇒ 1 1 1 ...
(stream-constant #t #f) ⇒ #t #f #t #f #t #f ...
procedure: (stream-drop n stream) procedure
nat × {α} → {α}
Stream-drop returns the suffix of the input
stream that starts at the next element after the first n
elements. The output stream shares structure with the input
stream; thus, promises forced in one instance of the stream are
also forced in the other instance of the stream. If the input
stream has less than n elements, stream-drop returns the null stream. See
also stream-take.
(define (stream-split n strm)
(values (stream-take n strm)
(stream-drop n strm)))
procedure: (stream-drop-while pred? stream)
(α → boolean) × {α} → {α}
Stream-drop-while returns the suffix of the input
stream that starts at the first element x for which (pred? x)
is #f.
The output stream shares structure with the input stream.
See also stream-take-while.
Stream-unique creates a new stream that retains only the first of any sub-sequences of repeated elements.
(define-stream (stream-unique eql? strm)
(if (stream-null? strm)
stream-null
(stream-cons (stream-car strm)
(stream-unique eql?
(stream-drop-while
(lambda (x)
(eql? (stream-car strm) x))
strm)))))
procedure:
(stream-filter pred? stream)
(α → boolean) × {α} → {α}
Stream-filter returns a newly-allocated stream that
contains only those elements x of the input stream for
which (pred? x)
is non-#f.
(stream-filter odd? (stream-from 0))
⇒ 1 3 5 7 9 ...
procedure:
(stream-fold proc base stream)
(α × β → α) × α × {β} → α
Stream-fold applies a binary procedure
to base and the first element of stream to compute a new
base, then applies the procedure to the new base and
the next element of stream to compute a succeeding base,
and so on, accumulating a value that is finally returned as the value
of stream-fold
when the end of the stream is reached. Stream must
be finite, or stream-fold will enter an infinite loop.
See also stream-scan, which is similar to stream-fold, but useful for infinite streams.
For readers familiar with other functional languages, this is a left-fold;
there is no corresponding right-fold, since right-fold relies on finite
streams that are fully-evaluated, at which time they may as well be
converted to a list.
Stream-fold is often used to summarize a stream in a single value, for instance, to compute the maximum element of a stream.
(define (stream-maximum lt? strm)
(stream-fold
(lambda (x y) (if (lt? x y) y x))
(stream-car strm)
(stream-cdr strm)))
Sometimes, it is useful to have stream-fold defined only on non-null streams:
(define (stream-fold-one proc strm)
(stream-fold proc
(stream-car strm)
(stream-cdr strm)))
Stream-minimum can then be defined as:
(define (stream-minimum lt? strm)
(stream-fold-one
(lambda (x y) (if (lt? x y) x y))
strm))
Stream-fold can also be used to build a stream:
(define-stream (isort lt? strm)
(define-stream (insert strm x)
(stream-match strm
(() (stream x))
((y . ys)
(if (lt? y x)
(stream-cons y (insert ys x))
(stream-cons x strm)))))
(stream-fold insert stream-null strm))
procedure:
(stream-for-each proc stream ...)
(α × β × ...) × {α} × {β} ...
Stream-for-each applies a procedure element-wise
to corresponding elements of the input streams for its side-effects;
it returns nothing. Stream-for-each stops as soon as any of its input
streams is exhausted.
The following procedure displays the contents of a file:
(define (display-file filename)
(stream-for-each display
(file->stream filename)))
procedure:
(stream-from first
[step])
number × number → {number}
Stream-from creates a newly-allocated stream that
contains first as its first element and increments each succeeding
element by step. If step is not given it defaults
to 1.
First and step may be of any numeric type. Stream-from
is frequently useful as a generator in stream-of expressions. See also stream-range
for a similar procedure that creates finite streams.
Stream-from could be implemented as (stream-iterate (lambda (x) (+ x step)) first).
(define nats (stream-from 0)) ⇒ 0 1 2 ...
(define odds (stream-from 1 2)) ⇒ 1 3 5 ...
procedure:
(stream-iterate proc base)
(α → α) × α → {α}
Stream-iterate creates a newly-allocated stream containing
base in its first element and applies proc to each element
in turn to determine the succeeding element. See also stream-unfold
and stream-unfolds.
(stream-iterate (lambda (x) (+ x 1)) 0)
⇒ 0 1 2 3 4 ...
(stream-iterate (lambda (x) (* x 2)) 1) ⇒ 1 2 4 8 16 ...
Given a seed between 0 and 232, exclusive, the following expression creates a stream of pseudo-random integers between 0 and 232, exclusive, beginning with seed, using the method described by Stephen Park and Keith Miller:
(stream-iterate (lambda (x) (modulo (* x 16807) 2147483647)) seed)
Successive values of the continued fraction shown below approach the value of the “golden ratio” φ ≈ 1.618:
The fractions can be calculated by the stream
(stream-iterate (lambda (x) (+ 1 (/ x))) 1)
procedure:
(stream-length stream)
{α} → nat
Stream-length takes an input stream and returns
the number of elements in the stream; it does not evaluate its
elements. Stream-length may only be used on finite streams;
it enters an infinite loop with infinite streams.
(stream-length strm123) ⇒ 3
syntax:
(stream-let tag
((var expr) ...) body)
Stream-let creates a local scope that binds each
variable to the value of its corresponding expression.
It additionally binds tag to a procedure which takes the bound
variables as arguments and body as its defining expressions,
binding the tag with stream-lambda. Tag is in scope within
body, and may be called recursively. When the expanded expression
defined by the stream-let is evaluated, stream-let evaluates the expressions in its
body in an environment containing the newly-bound variables,
returning the value of the last expression evaluated, which must yield
a stream.
Stream-let provides syntactic sugar on stream-lambda, in the same manner as normal let provides syntactic sugar on normal lambda. However, unlike normal let, the tag is required, not optional, because unnamed stream-let is meaningless.
Stream-member returns the first stream-pair of the input strm with a stream-car x that satisfies (eql? obj x).
(define-stream (stream-member eql? obj strm)
(stream-let loop ((strm strm))
(cond ((stream-null? strm) #f)
((eql? obj (stream-car strm)) strm)
(else (loop (stream-cdr strm))))))
procedure:
(stream-map proc stream ...)
(α × β ... → ω) × {α} × {β} ... → {ω}
Stream-map applies a procedure element-wise
to corresponding elements of the input streams, returning a newly-allocated
stream containing elements that are the results of those procedure
applications. The output stream has as many elements as the minimum-length
input stream, and may be infinite.
(define (square x) (* x x))
(stream-map square (stream 9 3)) ⇒ 81 9
(define (sigma f m n)
(stream-fold + 0
(stream-map f (stream-range m (+ n 1)))))
(sigma square 1 100) ⇒ 338350
In some functional languages, stream-map takes only a single input stream, and stream-zipwith provides a companion function that takes multiple input streams.
syntax:
(stream-match stream clause ...)
Stream-match provides the syntax of pattern-matching
for streams. The input stream is an expression that evaluates
to a stream. Clauses are of the form (pattern
[fender] expr),
consisting of a pattern that matches a stream of a particular
shape, an optional fender that must succeed if the pattern is
to match, and an expression that is evaluated if the pattern
matches. There are four types of patterns:
Each pattern element pati may be either:
The patterns are tested in order, left-to-right, until a matching pattern is found; if fender is present, it must evaluate as non-#f for the match to be successful. Pattern variables are bound in the corresponding fender and expression. Once the matching pattern is found, the corresponding expression is evaluated and returned as the result of the match. An error is signaled if no pattern matches the input stream.
Stream-match is often used to distinguish null streams from non-null streams, binding head and tail:
(define (len strm)
(stream-match strm
(() 0)
((head . tail) (+ 1 (len tail)))))
Fenders can test the common case where two stream elements must be identical; the else pattern is an identifier bound to the entire stream, not a keyword as in cond.
(stream-match strm
((x y . _) (equal? x y) 'ok)
(else 'error))
A more complex example uses two nested matchers to match two different stream arguments; (stream-merge lt? . strms) stably merges two or more streams ordered by the lt? predicate:
(define-stream (stream-merge lt? . strms)
(define-stream (merge xx yy)
(stream-match xx (() yy) ((x . xs)
(stream-match yy (() xx) ((y . ys)
(if (lt? y x)
(stream-cons y (merge xx ys))
(stream-cons x (merge xs yy))))))))
(stream-let loop ((strms strms))
(cond ((null? strms) stream-null)
((null? (cdr strms)) (car strms))
(else (merge (car strms)
(apply stream-merge lt?
(cdr strms)))))))
syntax:
(stream-of expr clause ...)
Stream-of provides the syntax of stream comprehensions,
which generate streams by means of looping expressions. The result
is a stream of objects of the type returned by expr. There
are four types of clauses:
The scope of variables bound in the stream comprehension is the clauses to the right of the binding clause (but not the binding clause itself) plus the result expression.
When two or more generators are present, the loops are processed as if they are nested from left to right; that is, the rightmost generator varies fastest. A consequence of this is that only the first generator may be infinite and all subsequent generators must be finite. If no generators are present, the result of a stream comprehension is a stream containing the result expression; thus, (stream-of 1) produces a finite stream containing only the element 1.
(stream-of (* x x)
(x in (stream-range 0 10))
(even? x))
⇒ 0 4 16 36 64
(stream-of (list a b)
(a in (stream-range 1 4))
(b in (stream-range 1 3)))
⇒ (1 1) (1 2) (2 1) (2 2) (3 1) (3 2)
(stream-of (list i j)
(i in (stream-range 1 5))
(j in (stream-range (+ i 1) 5)))
⇒ (1 2) (1 3) (1 4) (2 3) (2 4) (3 4)
procedure:
(stream-range first past
[step])
number × number × number → {number}
Stream-range creates a newly-allocated stream that
contains first as its first element and increments each succeeding
element by step. The stream is finite and ends before
past, which is not an element of the stream. If step
is not given it defaults to 1 if first is less than past
and -1
otherwise. First, past and step may be of
any numeric type. Stream-range is frequently useful as a generator
in stream-of
expressions. See also stream-from for a similar procedure that creates
infinite streams.
(stream-range 0 10) ⇒ 0 1 2 3 4 5 6 7 8 9
(stream-range 0 10 2) → 0 2 4 6 8
Successive elements of the stream are calculated by adding step to first, so if any of first, past or step are inexact, the length of the output stream may differ from (ceiling (- (/ (- past first) step) 1).
procedure:
(stream-ref stream n)
{α} × nat → α
Stream-ref returns the nth element of
stream, counting from zero. An error is signaled if n
is greater than or equal to the length of stream.
(define (fact n)
(stream-ref
(stream-scan * 1 (stream-from 1))
n))
procedure:
(stream-reverse stream)
{α} → {α}
Stream-reverse returns a newly-allocated stream containing
the elements of the input stream but in reverse order. Stream-reverse
may only be used with finite streams; it enters an infinite loop with
infinite streams. Stream-reverse does not force evaluation of the elements
of the stream.
> (define s (stream 1 (/ 1 0) -1))
> (define r (stream-reverse s))
> (stream-ref r 0)
> (stream-ref r 2)
1
> (stream-ref r 1)
error: division by zero
procedure:
(stream-scan proc base stream)
(α × β → α) × α × {β} → {α}
Stream-scan accumulates the partial folds of an
input stream into a newly-allocated output stream. The
output stream is the base followed by (stream-fold
proc base (stream-take i stream))
for each of the first i elements of stream.
(stream-scan + 0 (stream-from 1))
⇒ (stream 0 1 3 6 10 15 ...)
(stream-scan * 1 (stream-from 1))
⇒ (stream 1 1 2 6 24 120 ...)
procedure:
(stream-take n stream)
nat × {α} → {α}
Stream-take takes a non-negative integer n
and a stream and returns a newly-allocated stream containing
the first n elements of the input stream. If the
input stream has less than n elements, so does the output
stream. See also stream-drop.
Mergesort splits a stream into two equal-length pieces, sorts them recursively and merges the results:
(define-stream (msort lt? strm)
(let* ((n (quotient (stream-length strm) 2))
(ts (stream-take n strm))
(ds (stream-drop n strm)))
(if (zero? n)
strm
(stream-merge lt?
(msort < ts) (msort < ds)))))
procedure:
(stream-take-while pred? stream)
(α → boolean) × {α} → {α}
Stream-take-while takes a predicate and a stream
and returns a newly-allocated stream containing those elements x
that form the maximal prefix of the input stream for which (pred? x)
is non-#f.
See also stream-drop-while.
(stream-car
(stream-reverse
(stream-take-while
(lambda (x) (< x 1000))
primes))) ⇒ 997
procedure:
(stream-unfold map pred? gen base)
(α → β) × (α → boolean) × (α → α) × α → {β}
Stream-unfold is the fundamental recursive stream
constructor. It constructs a stream by repeatedly applying
gen to successive values of base, in the manner of stream-iterate,
then applying map to each of the values so generated, appending
each of the mapped values to the output stream as long as (pred? base)
is non-#f.
See also stream-iterate and stream-unfolds.
The expression below creates the finite stream 0 1 4 9 16 25 36 49 64 81. Initially the base is 0, which is less than 10, so map squares the base and the mapped value becomes the first element of the output stream. Then gen increments the base by 1, so it becomes 1; this is less than 10, so map squares the new base and 1 becomes the second element of the output stream. And so on, until the base becomes 10, when pred? stops the recursion and stream-null ends the output stream.
(stream-unfold
(lambda (x) (expt x 2)) ; map
(lambda (x) (< x 10)) ; pred?
(lambda (x) (+ x 1)) ; gen
0) ; base
procedure:
(stream-unfolds proc seed)
(α → (values α × β ...)) × α → (values {β} ...)
Stream-unfolds returns n newly-allocated streams
containing those elements produced by successive calls to the generator
proc, which takes the current seed as its argument and returns
n+1
values
(proc seed → seed result0 ... resultn-1
where the returned seed is the input seed to the next call to the generator and resulti indicates how to produce the next element of the ith result stream:
It may require multiple calls of proc to produce the next element of any particular result stream. See also stream-iterate and stream-unfold.
Stream-unfolds is especially useful when writing expressions that return multiple streams. For instance, (stream-partition pred? strm) is equivalent to
(values (stream-filter pred? strm) (stream-filter (lambda (x) (not (pred? x))) strm))
but only tests pred? once for each element of strm.
(define (stream-partition pred? strm)
(stream-unfolds
(lambda (s)
(if (stream-null? s)
(values s '() '())
(let ((a (stream-car s))
(d (stream-cdr s)))
(if (pred? a)
(values d (list a) #f)
(values d #f (list a))))))
strm))
(call-with-values (lambda () (stream-partition odd? (stream-range 1 6))) (lambda (odds evens) (list (stream->list odds) (stream->list evens)))) ⇒ ((1 3 5) (2 4))
procedure:
(stream-zip stream ...)
{α} × {β} × ... → {[α β ...]}
Stream-zip takes one or more input streams
and returns a newly-allocated stream in which each element is a list
(not a stream) of the corresponding elements of the input streams.
The output stream is as long as the shortest input stream, if
any of the input streams is finite, or is infinite if all the
input streams are infinite.
A common use of stream-zip is to add an index to a stream, as in (stream-finds eql? obj strm), which returns all the zero-based indices in strm at which obj appears; (stream-find eql? obj strm) returns the first such index, or #f if obj is not in strm.
(define-stream (stream-finds eql? obj strm)
(stream-of (car x)
(x in (stream-zip (stream-from 0) strm))
(eql? obj (cadr x))))
(define (stream-find eql? obj strm)
(stream-car
(stream-append
(stream-finds eql? obj strm)
(stream #f))))
(stream-find char=? #\l
(list->stream
(string->list "hello"))) ⇒ 2
(stream-find char=? #\l
(list->stream
(string->list "goodbye"))) ⇒ #f
Stream-find is not as inefficient as it looks; although it calls stream-finds, which finds all matching indices, the matches are computed lazily, and only the first match is needed for stream-find.
Streams, being the signature structured data type of functional programming languages, find useful expression in conjunction with higher-order functions. Some of these higher-order functions, and their relationship to streams, are described below.
The identity and constant procedures are frequently useful as the recursive base for maps and folds; (identity obj) always returns obj, and (const obj) creates a procedure that takes any number of arguments and always returns the same obj, no matter its arguments:
(define (identity obj) obj)
(define (const obj) (lambda x obj))
Many of the stream procedures take a unary predicate that accepts an element of a stream and returns a boolean. Procedure (negate pred?) takes a unary predicate and returns a new unary predicate that, when called, returns the opposite boolean value as the original predicate.
(define (negate pred?)
(lambda (x) (not (pred? x))))
Negate is useful for procedures like stream-take-while that take a predicate, allowing them to be used in the opposite direction from which they were written; for instance, with the predicate reversed, stream-take-while becomes stream-take-until. Stream-remove is the opposite of stream-filter:
(define-stream (stream-remove pred? strm)
(stream-filter (negate pred?) strm))
A section is a procedure which has been partially applied to some of its arguments; for instance, (double x), which returns twice its argument, is a partial application of the multiply operator to the number 2. Sections come in two kinds: left sections partially apply arguments starting from the left, and right sections partially apply arguments starting from the right. Procedure (lsec proc args ...) takes a procedure and some prefix of its arguments and returns a new procedure in which those arguments are partially applied. Procedure (rsec proc args ...) takes a procedure and some reversed suffix of its arguments and returns a new procedure in which those arguments are partially applied.
(define (lsec proc . args)
(lambda x (apply proc (append args x))))
(define (rsec proc . args)
(lambda x (apply proc (reverse
(append (reverse args) (reverse x))))))
Since most of the stream procedures take a stream as their last (right-most) argument, left sections are particularly useful in conjunction with streams.
(define stream-sum (lsec stream-fold + 0))
Function composition creates a new function by partially applying multiple functions, one after the other. In the simplest case there are only two functions, f and g, composed as ((compose f g) ≡ x)); the composition can be bound to create a new function, as in (define fg (compose f g)). Procedure (compose proc ...) takes one or more procedures and returns a new procedure that performs the same action as the individual procedures would if called in succession.
(define (compose . fns)
(let comp ((fns fns))
(cond
((null? fns) 'error)
((null? (cdr fns)) (car fns))
(else
(lambda args
(call-with-values
(lambda ()
(apply
(comp (cdr fns))
args))
(car fns)))))))
Compose works with sections to create succinct but highly expressive procedure definitions. The expression to compute the squares of the integers from 1 to 10 given above at stream-unfold could be written by composing stream-map, stream-take-while, and stream-iterate:
((compose
(lsec stream-map (rsec expt 2))
(lsec stream-take-while (negate (rsec > 10)))
(lsec stream-iterate (rsec + 1)))
1)
The examples below show a few of the myriad ways streams can be exploited, as well as a few ways they can trip the unwary user. All the examples are drawn from published sources; it is instructive to compare the Scheme versions to the originals in other languages.
As a simple illustration of infinite streams, consider this definition of the natural numbers:
(define nats
(stream-cons 0
(stream-map add1 nats)))
The recursion works because it is offset by one from the initial stream-cons. Another sequence that uses the offset trick is this definition of the fibonacci numbers:
(define fibs
(stream-cons 1
(stream-cons 1
(stream-map +
fibs
(stream-cdr fibs)))))
Yet another sequence that uses the same offset trick is the Hamming numbers, named for the mathematician and computer scientist Richard Hamming, defined as all numbers that have no prime factors greater than 5; in other words, Hamming numbers are all numbers expressible as 2i·3j·5k, where i, j and k are non-negative integers. The Hamming sequence starts with 1 2 3 4 5 6 8 9 10 12 and is computed starting with 1, taking 2, 3 and 5 times all the previous elements with stream-map, then merging sub-streams and eliminating duplicates.
(define hamming
(stream-cons 1
(stream-unique =
(stream-merge <
(stream-map (lsec * 2) hamming)
(stream-map (lsec * 3) hamming)
(stream-map (lsec * 5) hamming)))))
It is possible to have an infinite stream of infinite streams. Consider the definition of power-table:
(define power-table
(stream-of
(stream-of (expt m n)
(m in (stream-from 1)))
(n in (stream-from 2))))
which evaluates to an infinite stream of infinite streams:
But even though it is impossible to display power-table in its entirety, it is possible to select just part of it:
(stream->list 10 (stream-ref power-table 1))
⇒ (1 8 27 64 125 216 343 512 729 1000)
This example clearly shows that the elements of a stream are computed lazily, as they are needed; (stream-ref power-table 0) is not computed, even when its successor is displayed, since computing it would enter an infinite loop.
Chris Reade shows how to calculate the stream of prime numbers according to the sieve of Eratosthenes, using a method that eliminates multiples of the sifting base with addition rather than division:
(define primes (let ()
(define-stream (next base mult strm)
(let ((first (stream-car strm))
(rest (stream-cdr strm)))
(cond ((< first mult)
(stream-cons first
(next base mult rest)))
((< mult first)
(next base (+ base mult) strm))
(else (next base
(+ base mult) rest)))))
(define-stream (sift base strm)
(next base (+ base base) strm))
(define-stream (sieve strm)
(let ((first (stream-car strm))>
(rest (stream-cdr strm)))
(stream-cons first
(sieve (sift first rest)))))
(sieve (stream-from 2))))
A final example of infinite streams is a functional pearl from Jeremy Gibbons, David Lester and Richard Bird that enumerates the positive rational numbers without duplicates:
(define rats
(stream-iterate
(lambda (x)
(let* ((n (floor x)) (y (- x n)))
(/ (- n -1 y))))
1))
Philip Wadler describes the stream of successes technique that uses streams to perform backtracking search. The basic idea is that each procedure returns a stream of possible results, so that its caller can decide which result it wants; an empty stream signals failure, and causes backtracking to a previous choice point. The stream of successes technique is useful because the program is written as if to simply enumerate all possible solutions; no backtracking is explicit in the code.
The Eight Queens puzzle, which asks for a placement of eight queens on a chessboard so that none of them attack any other, is an example of a problem that can be solved using the stream of successes technique. The algorithm is to place a queen in the first column of a chessboard; any column is satisfactory. Then a queen is placed in the second column, in any position not held in check by the queen in the first column. Then a queen is placed in the third column, in any position not held in check by the queens in the first two columns. And so on, until all eight queens have been placed. If at any point there is no legal placement for the next queen, backtrack to a different legal position for the previous queens, and try again.
The chessboard is represented as a stream of length m, where there are queens in the first m columns, each position in the stream representing the rank on which the queen appears in that column. For example, stream 4 6 1 5 2 8 3 7 represents the following chessboard:
Two queens at column i row j and column m row n check each other if their columns i and m are the same, or if their rows j and n are the same, or if they are on the same diagonal with i + j = m + n or i – j = m – n. There is no need to test the columns, because the placement algorithm enforces that they differ, so the check? procedure tests if two queens hold each other in check.
(define (check? i j m n)
(or (= j n)
(= (+ i j) (+ m n))
(= (- i j) (- m n))))
The algorithm walks through the columns, extending position p by adding a new queen in row n with (stream-append p (stream n)). Safe? tests if it is safe to do so, using the utility procedure stream-and.
(define (stream-and strm)
(let loop ((strm strm))
(cond ((stream-null? strm) #t)
((not (stream-car strm)) #f)
(else (loop (stream-cdr strm))))))
(define (safe? p n)
(let* ((len (stream-length p))
(m (+ len 1)))
(stream-and
(stream-of
(not (check? (car ij) (cadr ij) m n))
(ij in (stream-zip
(stream-range 1 m)
p))))))
Procedure (queens m) returns all the ways that queens can safely be placed in the first m columns.
(define (queens m)
(if (zero? m)
(stream (stream))
(stream-of (stream-append p (stream n))
(p in (queens (- m 1)))
(n in (stream-range 1 9))
(safe? p n))))
To see the first solution to the Eight Queens problem, say
(stream->list (stream-car (queens 8)))
To see all 92 solutions, say
(stream->list
(stream-map stream->list
(queens 8)))
There is no explicit backtracking in the code. The stream-of expression in queens returns all possible streams that satisfy safe?; implicit backtracking occurs in the recursive call to queens.
It is possible to model generators and co-routines using streams. Consider the task, due to Carl Hewitt, of determining if two trees have the same sequence of leaves:
(same-fringe? = '(1 (2 3)) '((1 2) 3)) ⇒ #t
(same-fringe? = '(1 2 3) '(1 (3 2))) ⇒ #f
The simplest solution is to flatten both trees into lists and compare them element-by-element:
(define (flatten tree)
(cond ((null? tree) '())
((pair? (car tree))
(append (flatten (car tree))
(flatten (cdr tree))))
(else (cons (car tree)
(flatten (cdr tree))))))
(define (same-fringe? eql? tree1 tree2)
(let loop ((t1 (flatten tree1))
(t2 (flatten tree2)))
(cond ((and (null? t1) (null? t2)) #t)
((or (null? t1) (null? t2)) #f)
((not (eql? (car t1) (car t2))) #f)
(else (loop (cdr t1) (cdr t2))))))
That works, but requires time to flatten both trees and space to store the flattened versions; if the trees are large, that can be a lot of time and space, and if the fringes differ, much of that time and space is wasted.
Hewitt used a generator to flatten the trees one element at a time, storing only the current elements of the trees and the machines needed to continue flattening them, so same-fringe? could stop early if the trees differ. Dorai Sitaram presents both the generator solution and a co-routine solution, which both involve tricky calls to call-with-current-continuation and careful coding to keep them synchronized.
An alternate solution flattens the two trees to streams instead of lists, which accomplishes the same savings of time and space, and involves code that looks little different than the list solution presented above:
(define-stream (flatten tree)
(cond ((null? tree) stream-null)
((pair? (car tree))
(stream-append
(flatten (car tree))
(flatten (cdr tree))))
(else (stream-cons
(car tree)
(flatten (cdr tree))))))
(define (same-fringe? eql? tree1 tree2)
(let loop ((t1 (flatten tree1))
(t2 (flatten tree2)))
(cond ((and (stream-null? t1)
(stream-null? t2)) #t)
((or (stream-null? t1)
(stream-null? t2)) #f)
((not (eql? (stream-car t1)
(stream-car t2))) #f)
(else (loop (stream-cdr t1)
(stream-cdr t2))))))
Note that streams, a data structure, replace generators or co-routines, which are control structures, providing a fine example of how lazy streams enhance modularity.
Another way in which streams promote modularity is enabling the use of many small procedures that are easily composed into larger programs, in the style of unix pipelines, where streams are important because they allow a large dataset to be processed one item at a time. Bird and Wadler provide the example of a text formatter. Their example uses right-folds:
(define (stream-fold-right f base strm)
(if (stream-null? strm)
base
(f (stream-car strm)
(stream-fold-right f base
(stream-cdr strm)))))
(define (stream-fold-right-one f strm)
(stream-match strm
((x) x)
((x . xs)
(f x (stream-fold-right-one f xs)))))
Bird and Wadler define text as a stream of characters, and develop a standard package for operating on text, which they derive mathematically (this assumes the line-separator character is a single #\newline):
(define (breakon a)
(stream-lambda (x xss)
(if (equal? a x)
(stream-append (stream (stream)) xss)
(stream-append
(stream (stream-append
(stream x) (stream-car xss)))
(stream-cdr xss)))))
(define-stream (lines strm)
(stream-fold-right
(breakon #\newline)
(stream (stream))
strm))
(define-stream (words strm)
(stream-filter stream-pair?
(stream-fold-right
(breakon #\space)
(stream (stream))
strm)))
(define-stream (paras strm)
(stream-filter stream-pair?
(stream-fold-right
(breakon stream-null)
(stream (stream))
strm)))
(define (insert a)
(stream-lambda (xs ys)
(stream-append xs (stream a) ys)))
(define unlines
(lsec stream-fold-right-one
(insert #\newline)))
(define unwords
(lsec stream-fold-right-one
(insert #\space)))
(define unparas
(lsec stream-fold-right-one
(insert stream-null)))
These versatile procedures can be composed to count words, lines and paragraphs; the normalize procedure squeezes out multiple spaces and blank lines:
(define countlines
(compose stream-length lines))
(define countwords
(compose stream-length
stream-concat
(lsec stream-map words)
lines))
(define countparas
(compose stream-length paras lines))
(define parse
(compose (lsec stream-map
(lsec stream-map words))
paras
lines))
(define unparse
(compose unlines
unparas
(lsec stream-map
(lsec stream-map unwords))))
(define normalize (compose unparse parse))
More useful than normalization is text-filling, which packs as many words onto each line as will fit.
(define (greedy m ws)
(- (stream-length
(stream-take-while (rsec <= m)
(stream-scan
(lambda (n word)
(+ n (stream-length word) 1))
-1
ws))) 1))
(define-stream (fill m ws)
(if (stream-null? ws)
stream-null
(let* ((n (greedy m ws))
(fstline (stream-take n ws))
(rstwrds (stream-drop n ws)))
(stream-append
(stream fstline)
(fill m rstwrds)))))
(define linewords
(compose stream-concat
(lsec stream-map words)))
(define textparas
(compose (lsec stream-map linewords)
paras
lines))
(define (filltext m strm)
(unparse (stream-map (lsec fill m) (textparas strm))))
To display filename in lines of n characters, say:
(stream-for-each display (filltext n (file->stream filename)))
Though each operator performs only a single task, they can be composed powerfully and expressively. The alternative is to build a single monolithic procedure for each task, which would be harder and involve repetitive code. Streams ensure procedures are called as needed.
Queues are one of the fundamental data structures of computer science. In functional languages, queues are commonly implemented using two lists, with the front half of the queue in one list, where the head of the queue can be accessed easily, and the rear half of the queue in reverse order in another list, where new items can easily be added to the end of a queue. The standard form of such a queue holds that the front list can only be null if the rear list is also null:
(define queue-null (cons '() '())
(define (queue-null? obj)
(and (pair? obj) (null? (car obj))))
(define (queue-check f r)
(if (null? f)
(cons (reverse r) '())
(cons f r)))
(define (queue-snoc q x)
(queue-check (car q) (cons x (cdr q))))
(define (queue-head q)
(if (null? (car q))
(error "empty queue: head")
(car (car q))))
(define (queue-tail q)
(if (null? (car q))
(error "empty-head: tail")
(queue-check (cdr (car q)) (cdr q))))
This queue operates in amortized constant time per operation, with two conses per element, one when it is added to the rear list, and another when the rear list is reversed to become the front list. Queue-snoc and queue-head operate in constant time; queue-tail operates in worst-case linear time when the front list is empty.
Chris Okasaki points out that, if the queue is used persistently, its time-complexity rises from linear to quadratic since each persistent copy of the queue requires its own linear-time access. The problem can be fixed by implementing the front and rear parts of the queue as streams, rather than lists, and rotating one element from rear to front whenever the rear list is larger than the front list:
(define queue-null
(cons stream-null stream-null))
(define (queue-null? x)
(and (pair? x) (stream-null (car x))))
(define (queue-check f r)
(if (< (stream-length r) (stream-length f))
(cons f r)
(cons (stream-append f (stream-reverse r))
stream-null)))
(define (queue-snoc q x)
(queue-check (car q) (stream-cons x (cdr q))))
(define (queue-head q)
(if (stream-null? (car q))
(error "empty queue: head")
(stream-car (car q))))
(define (queue-tail q)
(if (stream-null? (car q))
(error "empty queue: tail")
(queue-check (stream-cdr (car q))
(cdr q))))
Memoization solves the persistence problem; once a queue element has moved from rear to front, it need never be moved again in subsequent traversals of the queue. Thus, the linear time-complexity to access all elements in the queue, persistently, is restored.
The final example is a lazy dictionary, where definitions and uses may occur in any order; in particular, uses may precede their corresponding definitions. This is a common problem. Many programming languages allow procedures to be used before they are defined. Macro processors must collect definitions and emit uses of text in order. An assembler needs to know the address that a linker will subsequently give to variables. The usual method is to make two passes over the data, collecting the definitions on the first pass and emitting the uses on the second pass. But Chris Reade shows how streams allow the dictionary to be built lazily, so that only a single pass is needed. Consider a stream of requests:
(define requests
(stream
'(get 3)
'(put 1 "a") ; use follows definition
'(put 3 "c") ; use precedes definition
'(get 1)
'(get 2)
'(put 2 "b") ; use precedes definition
'(put 4 "d"))) ; unused definition
We want a procedure that will display cab, which is the result of (get 3), (get 1), and (get 2), in order. We first separate the request stream into gets and puts:
(define (get? obj) (eq? (car obj) 'get))
(define-stream (gets strm)
(stream-map cadr (stream-filter get? strm)))
(define-stream (puts strm)
(stream-map cdr (stream-remove get? strm)))
Now, run-dict inserts each element of the puts stream into a lazy dictionary, represented as a stream of key/value pairs (an association stream), then looks up each element of the gets stream with stream-assoc:
(define-stream (run-dict requests)
(let ((dict (build-dict (puts requests))))
(stream-map (rsec stream-assoc dict)
(gets requests))))
(define (stream-assoc key dict)
(cond ((stream-null? dict) #f)
((equal? key (car (stream-car dict)))
(stream-car dict))
(else (stream-assoc key
(stream-cdr dict)))))
Dict is created in the let, but nothing is initially added to it. Each time stream-assoc performs a lookup, enough of dict is built to satisfy the lookup, but no more. We are assuming that each item is defined once and only once. All that is left is to define the procedure that inserts new items into the dictionary, lazily:
(define-stream (build-dict puts)
(if (stream-null? puts)
stream-null
(stream-cons
(stream-car puts)
(build-dict (stream-cdr puts)))))
Now we can run the requests and print the result:
(stream-for-each display
(stream-map cadr (run-dict requests)))
The (put 4 "d") definition is never added to the dictionary because it is never needed.
Programming with streams, or any lazy evaluator, can be tricky, even for programmers experienced in the genre. Programming with streams is even worse in Scheme than in a purely functional language, because, though the streams are lazy, the surrounding Scheme expressions in which they are embedded are eager. The impedance between lazy and eager can occasionally lead to astonishing results. Thirty-two years ago, William Burge warned:
Some care must be taken when a stream is produced to make sure that its elements are not really a list in disguise, in other words, to make sure that the stream elements are not materialized too soon.
For example, a simple version of stream-map that returns a stream built by applying a unary procedure to the elements of an input stream could be defined like this:
(define-stream (stream-map proc strm) ;wrong!
(let loop ((strm strm))
(if (stream-null? strm)
stream-null
(stream-cons
(proc (stream-car strm))
(loop (stream-cdr strm))))))
That looks right. It properly wraps the procedure in stream-lambda, and the two legs of the if both return streams, so it type-checks. But it fails because the named let binds loop to a procedure using normal lambda rather than stream-lambda, so even though the first element of the result stream is lazy, subsequent elements are eager. Stream-map can be written using stream-let:
(define-stream (stream-map proc strm)
(stream-let loop ((strm strm))
(if (stream-null? strm)
stream-null
(stream-cons
(proc (stream-car strm))
(loop (stream-cdr strm))))))
Here, stream-let assures that each element of the result stream is properly delayed, because each is subject to the stream-lambda that is implicit in stream-let, so the result is truly a stream, not a “list in disguise.” Another version of this procedure was given previously at the description of define-stream.
Another common problem occurs when a stream-valued procedure requires the next stream element in its definition. Consider this definition of stream-unique:
(define-stream (stream-unique eql? strm) ;wrong!
(stream-match strm
(() strm)
((_) strm)
((a b . _)
(if (eql? a b)
(stream-unique eql?
(stream-cdr strm))
(stream-cons a
(stream-unique eql?
(stream-cdr strm)))))))
The (a b . _) pattern requires the value of the next stream element after the one being considered. Thus, to compute the nth element of the stream, one must know the n+1st element, and to compute the n+1st element, one must know the n+2nd element, and to compute…. The correct version, given above in the description of stream-drop-while, only needs the current stream element.
A similar problem occurs when the stream expression uses the previous element to compute the current element:
(define (nat n) (stream-ref (stream-let loop ((s (stream 0))) (stream-cons (stream-car s) (loop (stream (add1 (stream-car s)))))) n))
This program traverses the stream of natural numbers, building the stream as it goes. The definition is correct; (nat 15) evaluates to 15. But it needlessly uses unbounded space because each stream element holds the value of the prior stream element in the binding to s.
When traversing a stream, it is easy to write the expression in such a way that evaluation requires unbounded space, even when that is not strictly necessary. During the discussion of SRFI-40, Joe Marshall created this infamous procedure:
(define (times3 n)
(stream-ref
(stream-filter
(lambda (x)
(zero? (modulo x n)))
(stream-from 0))
3))
(times3 5) evaluates to 15 and (times3 #e1e9) evaluates to three billion, though it takes a while. In either case, times3 should operate in bounded space, since each iteration mutates the promise that holds the next value. But it is easy to write times3 so that it does not operate in bounded space, as the follies of SRFI-40 showed. The common problem is that some element of the stream (often the first element) is bound outside the expression that is computing the stream, so it holds the head of the stream, which holds the second element, and so on. In addition to testing the programmer, this procedure tests the stream primitives (it caught several errors during development) and also tests the underlying Scheme system (it found a bug in one implementation).
Laziness is no defense against an infinite loop; for instance, the expression below never returns, because the odd? predicate never finds an odd stream element.
(stream-null?
(stream-filter odd?
(stream-from 0 2)))
Ultimately, streams are defined as promises, which are implemented as thunks (lambda with no arguments). Since a stream is a procedure, comparisons such as eq?, eqv? and equal? are not meaningful when applied to streams. For instance, the expression (define s ((stream-lambda () stream-null))) defines s as the null stream, and (stream-null? s) is #t, but (eq? s stream-null) is #f. To determine if two streams are equal, it is necessary to evaluate the elements in their common prefixes, reporting #f if two elements ever differ and #t if both streams are exhausted at the same time.
(define (stream-equal? eql? xs ys)
(cond ((and (stream-null? xs)
(stream-null? ys)) #t)
((or (stream-null? xs)
(stream-null? ys)) #f)
((not (eql? (stream-car xs)
(stream-car ys))) #f)
(else (stream-equal? eql?
(stream-cdr xs)
(stream-cdr ys)))))
It is generally not a good idea to mix lazy streams with eager side-effects, because the order in which stream elements are evaluated determines the order in which the side-effects occur. For a simple example, consider this side-effecting version of strm123:
(define strm123-with-side-effects
(stream-cons (begin (display "one") 1)
(stream-cons (begin (display "two") 2)
(stream-cons (begin (display "three") 3)
stream-null))))
The stream has elements 1 2 3. But depending on the order in which stream elements are accessed, "one", "two" and "three" could be printed in any order.
Since the performance of streams can be very poor, normal (eager) lists should be preferred to streams unless there is some compelling reason to the contrary. For instance, computing pythagorean triples with streams
(stream-ref
(stream-of (list a b c)
(n in (stream-from 1))
(a in (stream-range 1 n))
(b in (stream-range a n))
(c is (- n a b))
(= (+ (* a a) (* b b)) (* c c)))
50)
is about two orders of magnitude slower than the equivalent expression using loops.
(do ((n 1 (+ n 1))) ((> n 228))
(do ((a 1 (+ a 1))) ((> a n))
(do ((b a (+ b 1))) ((> b n))
(let ((c (- n a b)))
(if (= (+ (* a a) (* b b)) (* c c))
(display (list a b c)))))))
Bird and Wadler describe streams as either null or a pair with a stream in the tail:
α list :: null | α * α list
That works in a purely functional language such as Miranda or Haskell because the entire language is lazy. In an eager language like ML or Scheme, of course, it’s just a normal, eager list.
Using ML, Wadler, Taha and MacQueen give the type of even streams as:
datatype 'a stream_
= Nil_
| Cons_ of 'a * 'a stream
withtype 'a stream
= 'a stream_ susp;
Their susp type is similar to Scheme’s promise type. Since Scheme conflates the notions of record and type (the only way to create a new type disjoint from all other types is to create a record), it is necessary to distribute the suspension through the two constructors of the stream data type:
α stream
:: (promise stream-null)
| (promise (α stream-pair))
α stream-pair
:: α × (α stream)
That type captures the systematic suspension of recursive promises that is the essence of “streamness.” But it doesn’t quite work, because Scheme is eager rather than lazy, and both the car and the cdr of the stream are evaluated too early. So the final type of streams delays both the car and the cdr of the stream-pair:
α stream
:: (promise stream-null)
| (promise (α stream-pair))
α stream-pair
:: (promise α) × (promise (α stream))
The two outer promises, in the stream type, provide streams without memoization. The two inner promises, in the stream-pair type, add the memoization that is characteristic of streams in modern functional languages.
Lists provide seven primitive operations: the two constructors '() and cons, the type predicates list?, null? and pair?, and the accessors car and cdr for pairs. All other list operations can be derived from those primitives.
It would seem that the same set of primitives could apply to streams, but in fact one additional primitive is required. André van Tonder describes the reason in his discussion of the promise data type. The promises of R6RS are inadequate to support iterative algorithms because each time a promise is called iteratively it binds the old promise in the closure that defines the new promise (so the old promise can be forced later, if requested). However, in the case of iteration, the old promise becomes unreachable, so instead of creating a new promise that binds the old promise within, it is better to mutate the promise; that way, no space is wasted by the old promise.
Van Tonder describes this new promise type, and provides a recipe for its use: all constructors are wrapped with delay, all accessors are wrapped with force, and all function bodies are wrapped with lazy. Given the seven primitives above, the first two parts of van Tonder’s recipe are simple: the two constructors stream-null and stream-pair hide delay, and the two accessors stream-car and stream-cdr hide force (stream-null? and stream-pair? also hide force, so they can distinguish the two constructors of the stream type).
Although the new promise type prevents a space leak, it creates a new problem: there is no place to hide the lazy that is the third part of van Tonder’s recipe. SRFI-40 solved this problem by exposing it (actually, it exposed delay, which was incorrect). But that violates good software engineering by preventing the stream data type from being fully abstract. The solution of SRFI-41 is to create a new primitive, stream-lambda, that returns a function that hides lazy.
Besides hiding lazy and making the types work out correctly, stream-lambda is obvious and easy-to-use for competent Scheme programmers, especially when augmented with the syntactic sugar of define-stream and named stream-let. The alternative of exposing stream-lazy would be less clear and harder to use.
One of the hardest tasks when writing any program library is to decide what to include and, more importantly, what to exclude. One important guideline is minimalism, since once an operator enters a library it must remain forever: Il semble que la perfection soit atteinte non quand il n’y a plus rien à ajouter, mais quand il n’y a plus rien à retrancher.
Since streams are substantially slower than lists (the stream primitives require numerous type conversions, and list operations in most Scheme implementations are heavily optimized), most programmers will use streams only when the sequence of elements is truly infinite (such as mathematical series) or when there is some clear advantage of laziness (such as reducing the number of passes though a large data set). Thus, the library is biased toward functions that work with infinite streams left-to-right. In particular, there is no right-fold; if you need to materialize an entire stream, it’s best to use a list.
(library (streams primitive)
(export stream-null stream-cons stream? stream-null? stream-pair?
stream-car stream-cdr stream-lambda)
(import (rnrs) (rnrs mutable-pairs))
(define-record-type (stream-type make-stream stream?)
(fields (mutable box stream-promise stream-promise!)))
(define-syntax stream-lazy
(syntax-rules ()
((stream-lazy expr)
(make-stream
(cons 'lazy (lambda () expr))))))
(define (stream-eager expr) (make-stream (cons 'eager expr)))
(define-syntax stream-delay
(syntax-rules ()
((stream-delay expr)
(stream-lazy (stream-eager expr)))))
(define (stream-force promise)
(let ((content (stream-promise promise)))
(case (car content)
((eager) (cdr content))
((lazy) (let* ((promise* ((cdr content)))
(content (stream-promise promise)))
(if (not (eqv? (car content) 'eager))
(begin (set-car! content (car (stream-promise promise*)))
(set-cdr! content (cdr (stream-promise promise*)))
(stream-promise! promise* content)))
(stream-force promise))))))
(define stream-null (stream-delay (cons 'stream 'null)))
(define-record-type (stream-pare-type make-stream-pare stream-pare?)
(fields (immutable kar stream-kar) (immutable kdr stream-kdr)))
(define (stream-pair? obj) (and (stream? obj) (stream-pare? (stream-force obj))))
(define (stream-null? obj)
(and (stream? obj)
(eqv? (stream-force obj)
(stream-force stream-null))))
(define-syntax stream-cons
(syntax-rules ()
((stream-cons obj strm)
(stream-eager (make-stream-pare (stream-delay obj) (stream-lazy strm))))))
(define (stream-car strm)
(cond ((not (stream? strm)) (error 'stream-car "non-stream"))
((stream-null? strm) (error 'stream-car "null stream"))
(else (stream-force (stream-kar (stream-force strm))))))
(define (stream-cdr strm)
(cond ((not (stream? strm)) (error 'stream-cdr "non-stream"))
((stream-null? strm) (error 'stream-cdr "null stream"))
(else (stream-kdr (stream-force strm)))))
(define-syntax stream-lambda
(syntax-rules ()
((stream-lambda formals body0 body1 ...)
(lambda formals (stream-lazy (let () body0 body1 ...)))))))
(library (streams derived)
(export stream-null stream-cons stream? stream-null? stream-pair? stream-car
stream-cdr stream-lambda define-stream list->stream port->stream stream
stream->list stream-append stream-concat stream-constant stream-drop
stream-drop-while stream-filter stream-fold stream-for-each stream-from
stream-iterate stream-length stream-let stream-map stream-match _
stream-of stream-range stream-ref stream-reverse stream-scan stream-take
stream-take-while stream-unfold stream-unfolds stream-zip)
(import (rnrs) (streams primitive))
(define-syntax define-stream
(syntax-rules ()
((define-stream (name . formal) body0 body1 ...)
(define name (stream-lambda formal body0 body1 ...)))))
(define (list->stream objs)
(define list->stream
(stream-lambda (objs)
(if (null? objs)
stream-null
(stream-cons (car objs) (list->stream (cdr objs))))))
(if (not (list? objs))
(error 'list->stream "non-list argument")
(list->stream objs)))
(define (port->stream . port) (define port->stream (stream-lambda (p) (let ((c (read-char p))) (if (eof-object? c) stream-null (stream-cons c (port->stream p)))))) (let ((p (if (null? port) (current-input-port) (car port)))) (if (not (input-port? p)) (error 'port->stream "non-input-port argument") (port->stream p))))
(define-syntax stream
(syntax-rules ()
((stream) stream-null)
((stream x y ...) (stream-cons x (stream y ...)))))
(define (stream->list . args) (let ((n (if (= 1 (length args)) #f (car args))) (strm (if (= 1 (length args)) (car args) (cadr args)))) (cond ((not (stream? strm)) (error 'stream->list "non-stream argument")) ((and n (not (integer? n))) (error 'stream->list "non-integer count")) ((and n (negative? n)) (error 'stream->list "negative count")) (else (let loop ((n (if n n -1)) (strm strm)) (if (or (zero? n) (stream-null? strm)) '() (cons (stream-car strm) (loop (- n 1) (stream-cdr strm)))))))))
(define (stream-append . strms)
(define stream-append
(stream-lambda (strms)
(cond ((null? (cdr strms)) (car strms))
((stream-null? (car strms)) (stream-append (cdr strms)))
(else (stream-cons (stream-car (car strms))
(stream-append (cons (stream-cdr (car strms)) (cdr strms))))))))
(cond ((null? strms) stream-null)
((exists (lambda (x) (not (stream? x))) strms)
(error 'stream-append "non-stream argument"))
(else (stream-append strms))))
(define (stream-concat strms) (define stream-concat (stream-lambda (strms) (cond ((stream-null? strms) stream-null) ((not (stream? (stream-car strms))) (error 'stream-concat "non-stream object in input stream")) ((stream-null? (stream-car strms)) (stream-concat (stream-cdr strms))) (else (stream-cons (stream-car (stream-car strms)) (stream-concat (stream-cons (stream-cdr (stream-car strms)) (stream-cdr strms)))))))) (if (not (stream? strms)) (error 'stream-concat "non-stream argument") (stream-concat strms)))
(define stream-constant
(stream-lambda objs
(cond ((null? objs) stream-null)
((null? (cdr objs)) (stream-cons (car objs) (stream-constant (car objs))))
(else (stream-cons (car objs)
(apply stream-constant (append (cdr objs) (list (car objs)))))))))
(define (stream-drop n strm)
(define stream-drop
(stream-lambda (n strm)
(if (or (zero? n) (stream-null? strm))
strm
(stream-drop (- n 1) (stream-cdr strm)))))
(cond ((not (integer? n)) (error 'stream-drop "non-integer argument"))
((negative? n) (error 'stream-drop "negative argument"))
((not (stream? strm)) (error 'stream-drop "non-stream argument"))
(else (stream-drop n strm))))
(define (stream-drop-while pred? strm) (define stream-drop-while (stream-lambda (strm) (if (and (stream-pair? strm) (pred? (stream-car strm))) (stream-drop-while (stream-cdr strm)) strm))) (cond ((not (procedure? pred?)) (error 'stream-drop-while "non-procedural argument")) ((not (stream? strm)) (error 'stream-drop-while "non-stream argument")) (else (stream-drop-while strm))))
(define (stream-filter pred? strm)
(define stream-filter
(stream-lambda (strm)
(cond ((stream-null? strm) stream-null)
((pred? (stream-car strm))
(stream-cons (stream-car strm) (stream-filter (stream-cdr strm))))
(else (stream-filter (stream-cdr strm))))))
(cond ((not (procedure? pred?)) (error 'stream-filter "non-procedural argument"))
((not (stream? strm)) (error 'stream-filter "non-stream argument"))
(else (stream-filter strm))))
(define (stream-fold proc base strm)
(cond ((not (procedure? proc)) (error 'stream-fold "non-procedural argument"))
((not (stream? strm)) (error 'stream-fold "non-stream argument"))
(else (let loop ((base base) (strm strm))
(if (stream-null? strm)
base
(loop (proc base (stream-car strm)) (stream-cdr strm)))))))
(define (stream-for-each proc . strms) (define (stream-for-each strms) (if (not (exists stream-null? strms)) (begin (apply proc (map stream-car strms)) (stream-for-each (map stream-cdr strms))))) (cond ((not (procedure? proc)) (error 'stream-for-each "non-procedural argument")) ((null? strms) (error 'stream-for-each "no stream arguments")) ((exists (lambda (x) (not (stream? x))) strms) (error 'stream-for-each "non-stream argument")) (else (stream-for-each strms))))
(define (stream-from first . step)
(define stream-from
(stream-lambda (first delta)
(stream-cons first (stream-from (+ first delta) delta))))
(let ((delta (if (null? step) 1 (car step))))
(cond ((not (number? first)) (error 'stream-from "non-numeric starting number"))
((not (number? delta)) (error 'stream-from "non-numeric step size"))
(else (stream-from first delta)))))
(define (stream-iterate proc base)
(define stream-iterate
(stream-lambda (base)
(stream-cons base (stream-iterate (proc base)))))
(if (not (procedure? proc))
(error 'stream-iterate "non-procedural argument")
(stream-iterate base)))
(define (stream-length strm) (if (not (stream? strm)) (error 'stream-length "non-stream argument") (let loop ((len 0) (strm strm)) (if (stream-null? strm) len (loop (+ len 1) (stream-cdr strm))))))
(define-syntax stream-let
(syntax-rules ()
((stream-let tag ((name val) ...) body1 body2 ...)
((letrec ((tag (stream-lambda (name ...) body1 body2 ...))) tag) val ...))))
(define (stream-map proc . strms)
(define stream-map
(stream-lambda (strms)
(if (exists stream-null? strms)
stream-null
(stream-cons (apply proc (map stream-car strms))
(stream-map (map stream-cdr strms))))))
(cond ((not (procedure? proc)) (error 'stream-map "non-procedural argument"))
((null? strms) (error 'stream-map "no stream arguments"))
((exists (lambda (x) (not (stream? x))) strms)
(error 'stream-map "non-stream argument"))
(else (stream-map strms))))
(define-syntax stream-match (syntax-rules () ((stream-match strm-expr clause ...) (let ((strm strm-expr)) (cond ((not (stream? strm)) (error 'stream-match "non-stream argument")) ((stream-match-test strm clause) => car) ... (else (error 'stream-match "pattern failure")))))))
(define-syntax stream-match-test
(syntax-rules ()
((stream-match-test strm (pattern fender expr))
(stream-match-pattern strm pattern () (and fender (list expr))))
((stream-match-test strm (pattern expr))
(stream-match-pattern strm pattern () (list expr)))))
(define-syntax stream-match-pattern (lambda (x) (define (wildcard? x) (and (identifier? x) (free-identifier=? x (syntax _)))) (syntax-case x () ((stream-match-pattern strm () (binding ...) body) (syntax (and (stream-null? strm) (let (binding ...) body)))) ((stream-match-pattern strm (w? . rest) (binding ...) body) (wildcard? #'w?) (syntax (and (stream-pair? strm) (let ((strm (stream-cdr strm))) (stream-match-pattern strm rest (binding ...) body))))) ((stream-match-pattern strm (var . rest) (binding ...) body) (syntax (and (stream-pair? strm) (let ((temp (stream-car strm)) (strm (stream-cdr strm))) (stream-match-pattern strm rest ((var temp) binding ...) body))))) ((stream-match-pattern strm w? (binding ...) body) (wildcard? #'w?) (syntax (let (binding ...) body))) ((stream-match-pattern strm var (binding ...) body) (syntax (let ((var strm) binding ...) body))))))
(define-syntax stream-of
(syntax-rules ()
((_ expr rest ...)
(stream-of-aux expr stream-null rest ...))))
(define-syntax stream-of-aux
(syntax-rules (in is)
((stream-of-aux expr base)
(stream-cons expr base))
((stream-of-aux expr base (var in stream) rest ...)
(stream-let loop ((strm stream))
(if (stream-null? strm)
base
(let ((var (stream-car strm)))
(stream-of-aux expr (loop (stream-cdr strm)) rest ...)))))
((stream-of-aux expr base (var is exp) rest ...)
(let ((var exp)) (stream-of-aux expr base rest ...)))
((stream-of-aux expr base pred? rest ...)
(if pred? (stream-of-aux expr base rest ...) base))))
(define (stream-range first past . step) (define stream-range (stream-lambda (first past delta lt?) (if (lt? first past) (stream-cons first (stream-range (+ first delta) past delta lt?)) stream-null))) (cond ((not (number? first)) (error 'stream-range "non-numeric starting number")) ((not (number? past)) (error 'stream-range "non-numeric ending number")) (else (let ((delta (cond ((pair? step) (car step)) ((< first past) 1) (else -1)))) (if (not (number? delta)) (error 'stream-range "non-numeric step size") (let ((lt? (if (< 0 delta) < >))) (stream-range first past delta lt?)))))))
(define (stream-ref strm n)
(cond ((not (stream? strm)) (error 'stream-ref "non-stream argument"))
((not (integer? n)) (error 'stream-ref "non-integer argument"))
((negative? n) (error 'stream-ref "negative argument"))
(else (let loop ((strm strm) (n n))
(cond ((stream-null? strm) (error 'stream-ref "beyond end of stream"))
((zero? n) (stream-car strm))
(else (loop (stream-cdr strm) (- n 1))))))))
(define (stream-reverse strm) (define stream-reverse (stream-lambda (strm rev) (if (stream-null? strm) rev (stream-reverse (stream-cdr strm) (stream-cons (stream-car strm) rev))))) (if (not (stream? strm)) (error 'stream-reverse "non-stream argument") (stream-reverse strm stream-null)))
(define (stream-scan proc base strm)
(define stream-scan
(stream-lambda (base strm)
(if (stream-null? strm)
(stream base)
(stream-cons base (stream-scan (proc base (stream-car strm)) (stream-cdr strm))))))
(cond ((not (procedure? proc)) (error 'stream-scan "non-procedural argument"))
((not (stream? strm)) (error 'stream-scan "non-stream argument"))
(else (stream-scan base strm))))
(define (stream-take n strm)
(define stream-take
(stream-lambda (n strm)
(if (or (stream-null? strm) (zero? n))
stream-null
(stream-cons (stream-car strm) (stream-take (- n 1) (stream-cdr strm))))))
(cond ((not (stream? strm)) (error 'stream-take "non-stream argument"))
((not (integer? n)) (error 'stream-take "non-integer argument"))
((negative? n) (error 'stream-take "negative argument"))
(else (stream-take n strm))))
(define (stream-take-while pred? strm)
(define stream-take-while
(stream-lambda (strm)
(cond ((stream-null? strm) stream-null)
((pred? (stream-car strm))
(stream-cons (stream-car strm) (stream-take-while (stream-cdr strm))))
(else stream-null))))
(cond ((not (stream? strm)) (error 'stream-take-while "non-stream argument"))
((not (procedure? pred?)) (error 'stream-take-while "non-procedural argument"))
(else (stream-take-while strm))))
(define (stream-unfold mapper pred? generator base)
(define stream-unfold
(stream-lambda (base)
(if (pred? base)
(stream-cons (mapper base) (stream-unfold (generator base)))
stream-null)))
(cond ((not (procedure? mapper)) (error 'stream-unfold "non-procedural mapper"))
((not (procedure? pred?)) (error 'stream-unfold "non-procedural pred?"))
((not (procedure? generator)) (error 'stream-unfold "non-procedural generator"))
(else (stream-unfold base))))
(define (stream-unfolds gen seed) (define (len-values gen seed) (call-with-values (lambda () (gen seed)) (lambda vs (- (length vs) 1)))) (define unfold-result-stream (stream-lambda (gen seed) (call-with-values (lambda () (gen seed)) (lambda (next . results) (stream-cons results (unfold-result-stream gen next)))))) (define result-stream->output-stream (stream-lambda (result-stream i) (let ((result (list-ref (stream-car result-stream) (- i 1)))) (cond ((pair? result) (stream-cons (car result) (result-stream->output-stream (stream-cdr result-stream) i))) ((not result) (result-stream->output-stream (stream-cdr result-stream) i)) ((null? result) stream-null) (else (error 'stream-unfolds "can't happen")))))) (define (result-stream->output-streams result-stream) (let loop ((i (len-values gen seed)) (outputs '())) (if (zero? i) (apply values outputs) (loop (- i 1) (cons (result-stream->output-stream result-stream i) outputs))))) (if (not (procedure? gen)) (error 'stream-unfolds "non-procedural argument") (result-stream->output-streams (unfold-result-stream gen seed))))
(define (stream-zip . strms) (define stream-zip (stream-lambda (strms) (if (exists stream-null? strms) stream-null (stream-cons (map stream-car strms) (stream-zip (map stream-cdr strms)))))) (cond ((null? strms) (error 'stream-zip "no stream arguments")) ((exists (lambda (x) (not (stream? x))) strms) (error 'stream-zip "non-stream argument")) (else (stream-zip strms)))))
(library (streams)
(export stream-null stream-cons stream? stream-null? stream-pair? stream-car
stream-cdr stream-lambda define-stream list->stream port->stream stream
stream->list stream-append stream-concat stream-constant stream-drop
stream-drop-while stream-filter stream-fold stream-for-each stream-from
stream-iterate stream-length stream-let stream-map stream-match _
stream-of stream-range stream-ref stream-reverse stream-scan stream-take
stream-take-while stream-unfold stream-unfolds stream-zip)
(import (streams primitive) (streams derived)))
Jos Koot sharpened my thinking during many e-mail discussions, suggested several discussion points in the text, and contributed the final version of stream-match. Michael Sperber and Abdulaziz Ghuloum gave advice on R6RS.
Harold Abelson and Gerald Jay Sussman with Julie Sussman. Structure and Interpretation of Computer Programs. MIT Press, Cambridge, Massachusetts. Second edition, 1996. mitpress.mit.edu/sicp. The classic text on computer science. Section 3.5 includes extensive discussion of odd streams.
Anne L. Bewig. “Golden Ratio” (personal communication). Homework for the high school course Calculus. Teaching my daughter how to calculate the 200th element of a continued fraction was a moment of sheer joy in the development of the stream libraries.
Philip L. Bewig. Scheme Request for Implementation 40: A Library of Streams. August, 2004. srfi.schemers.org/srfi-40. Describes an implementation of the stream data type.
Richard Bird and Philip Wadler. Introduction to Functional Programming. Prentice Hall, 1988. The classic text on functional programming. Even streams are discussed in the context of purely functional programming.
William H. Burge. Recursive Programming Techniques. Addison-Wesley, 1975. An early text on functional programming, and still one of the best, though the terminology is dated. Discusses even streams in Section 3.10.
Jeremy Gibbons,
David Lester and Richard Bird, “Functional Pearl: Enumerating the
Rationals,” under consideration for publication in Journal of Functional
Programming. http://web.comlab.ox.ac.uk
Carl Hewitt.
“Viewing control structures as patterns of passing messages,” in
Journal of Artificial Intelligence, Volume 8, Number 3 (June, 1977),
pp 323-364. Also published as Artificial Intelligence Memo 410
by the Massachusetts Institute of Technology, ftp://publications.ai.mit.edu
Peter J. Landin. “A correspondence between ALGOL 60 and Church’s lambda-notation: Part I,” Communications of the ACM, Volume 8, Number 2, February 1965., pages 89–101. The seminal description of streams.
Joe Marshall.
“Stream problem redux”, from Usenet
comp.lang.scheme, June 28, 2002. groups.google.com/group/comp
Chris Okasaki.
Purely Functional Data Structures. Cambridge University Press,
2003. Revised version of Okasaki’s thesis Purely Functional
Data Structures, Carnegie-Mellon University, 1996, www.cs.cmu.edu/~rwh/theses
Stephen K. Park and Keith W. Miller. “Random number generators: good ones are hard to find,” Communications of the ACM, Volume 31, Issue 10 (October 1988), pages 1192–1201. Describes a minimal standard random number generator.
Simon Peyton-Jones, et al, editors. Haskell 98: Haskell 98 Language and Libraries: The Revised Report. December 2002. www.haskell.org/onlinereport. Haskell is the prototypical purely functional language, and includes even streams, which it calls lists, as its fundamental structured data type.
Chris Reade. Elements of Functional Programming. Addison-Wesley, April 1989. A textbook on functional programming.
Antoine de Saint-Exupéry. Chapter III “L’Avion” of Terre des Hommes. 1939. “Perfection is achieved, not when there is nothing more to add, but when there is nothing left to take away.”
Dorai Sitaram.
Teach Yourself Scheme in Fixnum Days. www.ccs.neu.edu/home/dorai/t-y
Michael Sperber, R. Kent Dybvig, Matthew Flatt, and Anton von Straaten, editors. Revised6 Report on the Algorithmic Language Scheme. September 26, 2007. www.r6rs.org. The standard definition of the Scheme programming language.
André van Tonder. Scheme Request for Implementation 45: Primitives for Expressing Iterative Lazy Algorithms. srfi.schemers.org/srfi-45. April, 2004. Describes the problems inherent in the promise data type of R5RS (also present in R6RS), and provides the alternate promise data type used in the stream primitives.
Philip Wadler. “How to replace failure by a list of successes,” in Proceedings of the conference on functional programming languages and computer architecture, Nancy, France, 1985, pages 113–128. Describes the “list of successes” technique for implementing backtracking algorithms using streams.
Philip Wadler,
Walid Taha, and David MacQueen, “How to add laziness to a strict language
without even being odd.” 1998 ACM SIGPLAN Workshop on ML, pp. 24ff. homepages.inf.ed.ac.uk/wadler
All cited web pages visited during September 2007.
Copyright (C) Philip L. Bewig (2007). All Rights Reserved.
Permission is hereby granted, free of charge, to any person obtaining a copy of this software and associated documentation files (the "Software"), to deal in the Software without restriction, including without limitation the rights to use, copy, modify, merge, publish, distribute, sublicense, and/or sell copies of the Software, and to permit persons to whom the Software is furnished to do so, subject to the following conditions:
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Several files related to this document are available from srfi.schemers.org/srfi-41: A version of this document suitable for printing is available at streams.pdf. The complete source corresponding to the three Appendices is available in files streams.ss, primitive.ss, and derived.ss. Samples from the text are available at samples.ss, and a test suite is available at r6rs-test.ss. Source code and tests for R5RS are available at r5rs.ss, and r5rs-test.ss.