# Partitioning a list in Racket

In an application I'm working on in Racket I need to take a list of numbers and partition the list into sub-lists of consecutive numbers: (In the actual application, I'll actually be partitioning pairs consisting of a number and some data, but the principle is the same.)

i.e. if my procedure is called `chunkify` then:

``````(chunkify '(1 2 3  5 6 7  9 10 11)) -> '((1 2 3) (5 6 7) (9 10 11))
(chunkify '(1 2 3)) ->  '((1 2 3))
(chunkify '(1  3 4 5  7  9 10 11 13)) -> '((1) (3 4 5) (7) (9 10 11) (13))
(chunkify '(1)) -> '((1))
(chunkify '()) -> '(())
``````

etc.

I've come up with the following in Racket:

``````#lang racket
(define (chunkify lst)
(call-with-values
(lambda ()
(for/fold ([chunk '()] [tail '()]) ([cell  (reverse lst)])
(cond
[(empty? chunk)                     (values (cons cell chunk) tail)]
[(equal? (add1 cell) (first chunk)) (values (cons cell chunk) tail)]
[else (values   (list cell) (cons  chunk tail))])))
cons))
``````

This works just fine, but I'm wondering given the expressiveness of Racket if there isn't a more straightforward simpler way of doing this, some way to get rid of the "call-with-values" and the need to reverse the list in the procedure etc., perhaps some way comepletely different.

My first attempt was based very loosely on a pattern with a collector in "The Little Schemer" and that was even less straightforward than the above:

``````(define (chunkify-list lst)
(define (lambda-to-chunkify-list chunk) (list chunk))

(let chunkify1 ([list-of-chunks '()]
[lst lst]
[collector lambda-to-chunkify-list])
(cond
[(empty? (rest lst)) (append list-of-chunks (collector (list (first lst))))]
[(equal? (add1 (first lst)) (second lst))
(chunkify1 list-of-chunks (rest lst)
(lambda (chunk) (collector (cons (first lst) chunk))))]
[else
(chunkify1 (append list-of-chunks
(collector (list (first lst)))) (rest lst) list)])))
``````

What I'm looking for is something simple, concise and straightforward.

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This is more of a "please review my code", not "what is wrong with my code", so this I think would belong on www.codereview.stackexchange.com –  Outlaw Lemur May 6 '12 at 4:18

Here's how I'd do it:

``````;; chunkify : (listof number) -> (listof (non-empty-listof number))
;; Split list into maximal contiguous segments.
(define (chunkify lst)
(cond [(null? lst) null]
[else (chunkify/chunk (cdr lst) (list (car lst)))]))

;; chunkify/chunk : (listof number) (non-empty-listof number)
;;               -> (listof (non-empty-listof number)
;; Continues chunkifying a list, given a partial chunk.
;; rchunk is the prefix of the current chunk seen so far, reversed
(define (chunkify/chunk lst rchunk)
(cond [(and (pair? lst)
(= (car lst) (add1 (car rchunk))))
(chunkify/chunk (cdr lst)
(cons (car lst) rchunk))]
[else (cons (reverse rchunk) (chunkify lst))]))
``````

It disagrees with your final test case, though:

``````(chunkify '()) -> '()  ;; not '(()), as you have
``````

I consider my answer more natural; if you really want the answer to be `'(())`, then I'd rename `chunkify` and write a wrapper that handles the empty case specially.

If you prefer to avoid the mutual recursion, you could make the auxiliary function return the leftover list as a second value instead of calling `chunkify` on it, like so:

``````;; chunkify : (listof number) -> (listof (non-empty-listof number))
;; Split list into maximal contiguous segments.
(define (chunkify lst)
(cond [(null? lst) null]
[else
(let-values ([(chunk tail) (get-chunk (cdr lst) (list (car lst)))])
(cons chunk (chunkify tail)))]))

;; get-chunk : (listof number) (non-empty-listof number)
;;          -> (values (non-empty-listof number) (listof number))
;; Consumes a single chunk, returns chunk and unused tail.
;; rchunk is the prefix of the current chunk seen so far, reversed
(define (get-chunk lst rchunk)
(cond [(and (pair? lst)
(= (car lst) (add1 (car rchunk))))
(get-chunk (cdr lst)
(cons (car lst) rchunk))]
[else (values (reverse rchunk) lst)]))
``````
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Thanks Ryan. The final test case is irrelevant so either '() or '(()) is fine. I just put that in because I tested it just to see that I didn't get something strange for it. –  Harry Spier Apr 30 '12 at 0:00
Thanks again. The mutual recursion is the pattern I was looking for but couldn't quite figure out. One recursion to create the chunks and another to cons them to the list of chunks. –  Harry Spier Apr 30 '12 at 1:55
+1 for the `non-empty-listof`. –  Will Ness Mar 16 '13 at 16:15

I can think of a simple, straightforward solution using a single procedure with only primitive list operations and tail recursion (no `values`, `let-values`, `call-with-values`) - and it's pretty efficient. It works with all of your test cases, at the cost of adding a couple of `if` expressions during initialization for handling the empty list case. It's up to you to decide if this is concise:

``````(define (chunkify lst)
(let ((lst (reverse lst))) ; it's easier if we reverse the input list first
(let loop ((lst (if (null? lst) '() (cdr lst)))        ; list to chunkify
(cur (if (null? lst) '() (list (car lst)))) ; current sub-list
(cond ((null? lst)                    ; is the input list empty?
(cons cur acc))
((= (add1 (car lst)) (car cur)) ; is this a consecutive number?
(loop (cdr lst) (cons (car lst) cur) acc))
(else                           ; time to create a new sub-list
(loop (cdr lst) (list (car lst)) (cons cur acc)))))))
``````
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Thanks Oscar, that was very fast (something like 40 minutes from my post). Its a little humbling when I think how long it took me to come up with my solution :-) Cheers. –  Harry Spier Apr 30 '12 at 0:09
+1 for tail recursive version! –  Will Ness Mar 16 '13 at 16:36

Yet another way to do it.

``````#lang racket

(define (split-between pred xs)
(let loop ([xs xs]
[ys '()]
[xss '()])
(match xs
[(list)                 (reverse (cons (reverse ys) xss))]
[(list x)               (reverse (cons (reverse (cons x ys)) xss))]
[(list x1 x2 more ...)  (if (pred x1 x2)
(loop more (list x2) (cons (reverse (cons x1 ys)) xss))
(loop (cons x2 more) (cons x1 ys) xss))])))

(define (consecutive? x y)
(= (+ x 1) y))

(define (group-consecutives xs)
(split-between (λ (x y) (not (consecutive? x y)))
xs))

(group-consecutives '(1 2 3 5 6 7 9 10 11))
(group-consecutives '(1 2 3))
(group-consecutives '(1 3 4 5 7 9 10 11 13))
(group-consecutives '(1))
(group-consecutives '())
``````
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Thanks soegaard, particularly for showing the use of pattern matching. –  Harry Spier Apr 30 '12 at 0:02

I want to play.

At the core this isn't really anything that's much different from what's been offered but it does put it in terms of the for/fold loop. I've grown to like the for loops as I think they make for much more "viewable" (not necessarily readable) code. However, (IMO -- oops) during the early stages of getting comfortable with racket/scheme I think it's best to stick to recursive expressions.

``````(define (chunkify lst)
(define-syntax-rule (consecutive? n chunk)
(if (null? lst)
'special-case:no-chunks
(reverse
(map reverse
(for/fold  ([store    `((,(car lst)))])
([n         (cdr lst)])
(let*([chunk   (car store)])
(cond
[(consecutive? n chunk)
(cons  (cons n chunk)  (cdr store))]
[else
(cons  (list n)  (cons chunk (cdr store)))])))))))

(for-each
(ƛ (lst)
(printf "input   :  ~s~n" lst)
(printf "output  :  ~s~n~n" (chunkify lst)))
'((1 2 3 5 6 7 9 10 11)
(1 2 3)
(1 3 4 5 7 9 10 11 13)
(1)
()))
``````
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Many thanks dlm. Using Racket there are so many different ways to do things. I've gone with Ryan's solution but I pass "consecutive?" as a first class function. Since I use "Chunkify" with several different kinds of lists of lists in the application. –  Harry Spier May 7 '12 at 3:05

Here's my version:

``````(define (chunkify lst)
(let loop ([lst lst] [last #f] [resint '()] [resall '()])
(if (empty? lst)
(append resall (list (reverse resint)))
(begin
(let ([ca (car lst)] [cd (cdr lst)])
(if (or (not last) (= last (sub1 ca)))
(loop cd ca (cons ca resint) resall)
(loop cd ca (list ca) (append resall (list (reverse resint))))))))))
``````

It also works for the last test case.

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