Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have no problem combining the lists but sorting them in ascending order is where i am struggling.

 (define (combineASC l1 l2)
   (cond 
     ((null? l1) l2)
     (#t (cons (car l1) (combineASC (cdr l1) l2)))
     (sort l2 #'<))) ; I found this part in an online source

This is the output i get:

(combineASC '(2 4 6) '(1 4 5))

(2 4 6 1 4 5)

Does anyone have any suggestions for me?

share|improve this question
    
are the lists sorted? –  elyashiv Oct 4 '12 at 18:10
    
ya they are also sorted in ascending order –  cougar Oct 4 '12 at 18:11

3 Answers 3

up vote 4 down vote accepted

So you're combining two input lists, each already sorted in ascending order. You want to "weave" them into one, also in ascending order.

For that, you just take both head elements (each from each input list) and compare; then you take the smallest out from its list, and combine further what you're left with - using same function.

There will be no sorting involved. The resulting list will be already sorted, by virtues of the process that defines it.

This operation is commonly called "merge". It preserves duplicates. Its duplicates-removing counterpart, merging two ordered lists into one as well, is known a "union". That is because these ordered (non-descending, or strictly ascending) lists can be seen as representation of sets.


Another subtlety to take note of is, what to do when the two head elements are equal. We've already decided to preserve the duplicates, yes, but which of the two to take out first?

Normally, it's the left one. Then when such defined merge operation is used as part of merge sort, the sort will be stable (of course the partitioning has to be defined properly for that too). Stable means, the original order of elements is preserved.

For example, if the sort is stable, when sorting by the first element of pairs, (3,1) (1,2) (3,3) is guaranteed to be sorted as (1,2) (3,1) (3,3) and not as (1,2) (3,3) (3,1).

So, following the skeleton of your code, we get

;; combine two non-decreasing lists into one non-decreasing list,
;; preserving the duplicates
(define (combineNONDECR l1 l2)
   (cond 
     ((null? l1) l2)
     ((null? l2) l1)
     ((<= (car l1) (car l2))
      (cons (car l1) (combineNONDECR (cdr l1) l2)))
     (t
      (cons (car l2) (combineNONDECR l1 (cdr l2))))))

But if you really need the result to be in ascending order, as opposed to non-decreasing, then you'd have to tweak this a little bit - make the = case separate, and handle it separately, to stop the duplicates from creeping in (there are no duplicates in each of the ascending-order lists, but the lists might contain some duplicates between the two of them).

share|improve this answer

Because tail recursive :)

(define (merge-sorted . lists)
  (define (%merge-sorted head tails)
    (cond
     ((null? tails) head)
     ((null? (car tails))
      (%merge-sorted head (cdr tails)))
     (else (let ((sorted
                  (sort tails
                        (lambda (a b)
                          (<= (car a) (car b))))))
             (%merge-sorted (cons (caar sorted) head)
                            (cons (cdar sorted) (cdr sorted)))))))
  (reverse (%merge-sorted '() lists)))

(merge-sorted '(1 2 3) '(4 5 6 7 8 9) '(2 4 6) '(1 3 5 7))
  • it scales better :P

I think this is what Will was talking about:

(define (merge-sorted . lists)
  (define (%swap-if-greater lists)
    (define (%do-swap head next built tails)
      (cond
       ((null? tails)
        (append (reverse built)
                (cond
                 ((null? next) (list head))
                 ((> (car head) (car next))
                    (list next head))
                 (else (list head next)))))
       ((> (car head) (car next))
        (%do-swap head (car tails)
                  (cons next built) (cdr tails)))
       (else (append (reverse built)
                     (list head) (list next) tails))))
    (%do-swap (car lists)
              (if (null? (cdr lists)) '() (cadr lists))
              '() (if (null? (cdr lists)) '() (cddr lists))))
  (define (%merge-sorted head tails)
    (cond
     ((null? tails) head)
     ((null? (car tails))
      (%merge-sorted head (cdr tails)))
     (else (let ((sorted (%swap-if-greater tails)))
             (%merge-sorted (cons (caar sorted) head)
                            (cons (cdar sorted)
                                  (cdr sorted)))))))
  (reverse
   (%merge-sorted
    '() (sort lists (lambda (a b) (<= (car a) (car b)))))))

Especially given Schemes... interesting position on booleans, I wouldn't be very enthusiastic about this one.

share|improve this answer
    
(append (list x) y) == ... :) –  Will Ness Oct 5 '12 at 21:17
    
sort on each "yield" is a bit overkill too (even if on short list). better done just once at the start, and then - change that form with cons to (insert-by-head (cdar sorted) (cdr sorted))... :) –  Will Ness Oct 5 '12 at 22:22
    
I thought if we sort just once, at the start; and then go into the loop; then we start with the lists sorted, take out the first element from the first list, and then if we insert that tail of the first list into the rest of lists, we get again the sorted list of lists. –  Will Ness Oct 5 '12 at 22:59
    
... I thought more along the lines of (else (%merge-sorted (cons (caar tails) head) (%insert (cons (cdar tails) (cdr tails))))) with (define (%insert a b) (if (<= (car a)(caar b))(cons a b) (cons (car b) (%insert a (cdr b))))) (plus corner cases). –  Will Ness Oct 8 '12 at 23:37
    
I guess so, yes. I'd just enforce "tails is sorted" constraint in a little bit different order: tails is already sorted on 1st entry to %merge-sorted so I'd re-establish their order on exit, with (%insert...). And then %insert receives its two arguments directly, which lets it to be a little bit shorter, like so (define (%insert a b) (if (null? a) b (let loop ((r ()) (b b)) (cond ((null? b) (reverse (cons a r))) ((<= (car a) (caar b)) (append (reverse r) (cons a b))) (else (loop (cons (car b) r) (cdr b))))))). Named let is the Scheme way to encode loops. Nice idea w/ dotted arg! :) –  Will Ness Oct 9 '12 at 9:46
(defun merge (l1 l2)
 (if (not (and (eql nil l1) (eql l2 nil))
  (if (> (car l1) (car l2))
     (cons (car l1) (merge (cdr l1) l2))
    (cons (car l2) (merge (cdr l2) l1)))
  ;;;append the not-nil string to the rest.
  )

that should work (you still need to complete the code, but the idea is clear)

note this code is in common-lisp.

look up merge sort for more info about the technique

share|improve this answer
    
append? really? :) –  Will Ness Oct 4 '12 at 18:18
    
what the problem? that's how i learned lisp. –  elyashiv Oct 4 '12 at 18:19
    
[1]> (append 1 (list 2 3)) *** - APPEND: 1 is not a list The following restarts are available: ABORT :R1 ABORT –  Will Ness Oct 4 '12 at 18:20
    
@WillNess oops. fixed, but if you have a better suggestion, I well love to see. (I don't really know lisp) –  elyashiv Oct 4 '12 at 18:22
4  
What Will is pointing out is this: if you know you're adding an element to the head of a list, use cons, not append. That is, the pattern (append (list X) Y) is much more naturally expressed as (cons X Y). –  dyoo Oct 4 '12 at 18:24

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.