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I've been trying to do a function that returns the Cartesian Product of n sets,in Dr Scheme,the sets are given as a list of lists,I've been stuck at this all day,I would like a few guidelines as where to start.

----LATER EDIT -----

Here is the solution I came up with,I'm sure that it's not by far the most efficent or neat but I'm only studing Scheme for 3 weeks so be easy on me.

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Is this homework? –  Barry Brown Mar 20 '10 at 23:54
    
Similar: stackoverflow.com/questions/1658229/… –  Yuval Adam Mar 20 '10 at 23:55
    
yes ,it's part of homework,I don't necessarily need the code,I want some guidelines –  John Retallack Mar 21 '10 at 0:08

4 Answers 4

;compute the list of the (x,y) for y in l
(define (pairs x l)
  (define (aux accu x l)
    (if (null? l)
        accu
        (let ((y (car l))
              (tail (cdr l)))
          (aux (cons (cons x y) accu) x tail))))
  (aux '() x l))

(define (cartesian-product l m)   
  (define (aux accu l)
    (if (null? l) 
        accu
        (let ((x (car l)) 
              (tail (cdr l)))
          (aux (append (pairs x m) accu) tail))))
  (aux '() l))

Source: http://stackoverflow.com/questions/1658229/scheme-lisp-nested-loops-and-recursion/1658894#1658894

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1  
how is this supposed to help ?This is the Cartesian Product of 2 sets,my question was for n sets,I know how to compute it for two sets,I don't know how to make it for n –  John Retallack Mar 21 '10 at 0:03
1  
Combine the 2-set version with fold to get an n-set version. In general for associative operations, you can define an n argument version in terms of the 2 argument version with fold. –  soegaard Mar 1 '12 at 9:50

Here's a concise implementation that is also designed to minimize the size of the resulting structure in memory, by sharing the tails of the component lists. It uses SRFI-1.

(define (cartesian-product . lists)
  (fold-right (lambda (xs ys)
                (append-map (lambda (x)
                              (map (lambda (y)
                                     (cons x y))
                                   ys))
                            xs))
              '(())
              lists))
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Here is my first solution (suboptimal):

#lang scheme
(define (cartesian-product . lofl)
  (define (cartOf2 l1 l2)
    (foldl 
     (lambda (x res) 
       (append 
        (foldl 
         (lambda (y acc) (cons (cons x y) acc)) 
         '() l2) res))
     '() l1))
  (foldl cartOf2 (first lofl) (rest lofl)))

(cartesian-product '(1 2) '(3 4) '(5 6))

Basically you want to produce the product of the product of the lists.

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Also if you look at the question that Yuval posted Paul Hollingsworth posted a well documented version, albeit not working in plt-scheme. stackoverflow.com/questions/1658229/… –  Jake Mar 21 '10 at 3:44
    
Regarding the Cipher's solution, what can you do in order to get the list of lists undotted? –  anna-k Mar 21 '10 at 18:49
1  
I think what you mean is that you don't want the result to be a list of improper lists (or nested pairs), rather you want a list of lists. If so, the easiest/simplest/worst way to accomplish this would be to change (cons x y) to (cons x (if (list? y) y (list y))). I don't like this. But its not my homework... ;) –  Jake Mar 21 '10 at 20:50
up vote 2 down vote accepted
  ;returs a list wich looks like ((nr l[0]) (nr l[1])......)
  (define cart-1(λ(l nr)
      (if (null? l) 
             l 
             (append (list (list nr (car l))) (cart-1 (cdr l) nr)))))

;Cartesian product for 2 lists
(define cart-2(λ(l1 l2)
                (if(null? l2) 
             '() 
             (append (cart-1 l1 (car l2)) (cart-2 l1 (cdr l2))))))

 ;flattens a list containg sublists
(define flatten
(λ(from)
 (cond [(null? from) from]
      [(list? (car from)) (append (flatten (car from)) (flatten (cdr from)))]
      [else (cons (car from) (flatten (cdr from)))])}) 

;applys flatten to every element of l
(define flat
(λ(l)
(if(null? l)
l
(cons (flatten (car l)) (flat (cdr l))))))

;computes Cartesian product for a list of lists by applying cart-2
(define cart
(lambda (liste aux)
 (if (null? liste)
  aux
  (cart (cdr liste) (cart-2 (car liste) aux)))))


(define (cart-n l) (flat (cart (cdr l ) (car l))))
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