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This is not homework. I'm learning Standard ML on my own. I know a bit of Scheme, too, so this question ought to be answerable in either language.

My self-imposed assignment is to write a function that constructs a list of integers from 1 to n. For example, list(7) should return [1,2,3,4,5,6,7]. An O(n) solution would be ideal.

It's easy to construct a list in reverse (i.e., [n,n-1,..,1]) in linear time:

fun list 1 = 1::nil
|   list n = n::list(n-1);

My attempt to construct a list going forward is O(n^2) because the append operation is linear.

fun list 1 = 1::nil
|   list n = list(n-1) @ n::nil;

My next attempt was to build a list from the end to the front (right to left) by starting with the nil, attaching n to the front, and recursing backwards to 1. But it didn't work at all.

fun list n = (if n = 1
              then 1
              else list(n-1) :: n) :: nil;

Something makes me think I need a helper function that builds un-terminated lists to be used in the recursion, but I'm stumped.

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6 Answers 6

up vote 4 down vote accepted

Using the Basis Library,

fun list n = List.tabulate (n, fn x => x + 1)

With a simple accumulator,

val list =
    let fun list' k 0 = k
          | list' k n = list' (n::k) (n-1)
    in list' nil end

This builds a list starting from the tail end. If you think of the reductions,

   list 5
=> list' nil 5
=> list' (5::nil) 4
=> list' (4::5::nil) 3
=> list' (3::4::5::nil) 2
=> list' (2::3::4::5::nil) 1
=> list' (1::2::3::4::5::nil) 0
=> [1, 2, 3, 4, 5]

Alternatively,

Something makes me think I need a helper function that builds un-terminated lists to be used in the recursion, but I'm stumped.

A representation of an unterminated list is a function which takes a list and returns a list: for example, to represent 10::_, you could use fn x => 10::x.

fun list n =
    let fun list' m k = if m > n then k nil else
                        list' (m+1) (fn x => k (m::x))
    in list' 1 (fn x => x) end

Once again, if you think of the reductions,

   list 5
=> list' 1 (fn x => x)
=> list' 2 (fn x => (fn x => x) (1::x))
=> list' 3 (fn x => (fn x => (fn x => x) (1::x)) (2::x))
=> list' 4 (fn x => (fn x => (fn x => (fn x => x) (1::x)) (2::x)) (3::x))
=> list' 5 (fn x => (fn x => (fn x => (fn x => (fn x => x) (1::x)) (2::x)) (3::x)) (4::x))
=> list' 6 (fn x => (fn x => (fn x => (fn x => (fn x => (fn x => x) (1::x)) (2::x)) (3::x)) (4::x)) (5::x))
=> (fn x => (fn x => (fn x => (fn x => (fn x => (fn x => x) (1::x)) (2::x)) (3::x)) (4::x)) (5::x)) nil
=> (fn x => (fn x => (fn x => (fn x => (fn x => x) (1::x)) (2::x)) (3::x)) (4::x)) (5::nil)
=> (fn x => (fn x => (fn x => (fn x => x) (1::x)) (2::x)) (3::x)) (4::5::nil)
=> (fn x => (fn x => (fn x => x) (1::x)) (2::x)) (3::4::5::nil)
=> (fn x => (fn x => x) (1::x)) (2::3::4::5::nil)
=> (fn x => x) (1::2::3::4::5::nil)
=> [1, 2, 3, 4, 5]

In this case, the algorithm can be structured such that an ordinary data structure suffices for the accumulator, but using a continuation as an accumulator is a very powerful and useful technique that should not be overlooked.

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You'll notice that both methods here are tail-recursive. That's another thing that accumulators are useful for. Think about how an optimizing compiler might use an accumulator to make non-tail-recursive functions into tail-recursive functions, and see if you can structure your algorithms to lend themselves towards this goal. –  ephemient May 6 '09 at 18:40

One classic approach is to build it in reverse order, then reverse it. That's two times O(n), which is of course just as O(n).

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Had to look up how to do a linear-time reverse. Once I got that to work, the rest was easy. –  Barry Brown May 6 '09 at 9:44

Here's a solution:

fun list n =
  let
    fun f 1 m = m::nil
    |   f n m = m::f (n-1) (m+1)
  in
    f n 1
  end;
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I think you meant m::f (n-1) (m+1) instead of m::list (n-1) (m+1) –  Chris Conway May 6 '09 at 12:30
1  
Maybe it's just me, but I cringe whenever I see a non-tail-recursive function that can be easily rewritten to be tail-recursive. –  ephemient May 6 '09 at 18:42
    
I just wanted to show the most obvious solution based on what Barry already had. I suppose I should've noted that a tail recursive solution is possible, but Chris Conway already did that. –  TrayMan May 6 '09 at 21:18
    
It's only a tiny cringe ;) If this weren't for educational purposes, I would suggest fun list n = List.tabulate (n, fn x => x + 1) as the best implementation. Actually, maybe I'll still do that... –  ephemient May 6 '09 at 22:07

Here's a version using a helper function and a tail-recursion-enabling accumulator:

fun list n =
  let
    fun aux i acc = 
      if i > 0
      then aux (i-1) (i::acc)
      else acc
  in
    aux n nil
  end;
share|improve this answer
    
Wont that be the result in reverse? –  leppie May 6 '09 at 14:51
    
Nope. Try it out. –  Chris Conway May 6 '09 at 15:22
    
This is nearly identical to my first answer, although I flipped the argument order of the helper so that partial evaluation worked out nicely. If I had realized that earlier, I probably wouldn't have written mine :) –  ephemient May 6 '09 at 18:32

With list problems like these, it is often easier to solve a more general problem.

How do I build a list containing the integers i such that n <= i <= m, in order?

The solution has a base case and an induction step:

  • If n > m, the list is empty.

  • If n <= m, the solution is to write n followed by the solution to the problem n+1 <= i <= m.

This view leads quickly to clear, concise ML code (tested):

fun range n m = if n > m then [] else n :: range (n+1) m
fun list n = range 1 n
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That's exactly where I was going with this problem. I figured if I could get it to work for 1..n, I could eventually get it working for m..n. As it is, with ephemient's help, I've created a function that creates a list from the first, second, and last element, similar to one of the ways Haskell allows users to construct lists. –  Barry Brown May 7 '09 at 8:44
    
You could even take advantage of partial evaluation and write val list = range 1 :) –  ephemient May 7 '09 at 14:05
    
@ephemient: Sweet. (But I think you mean partial application.) –  Norman Ramsey May 7 '09 at 21:11
(define (iota n)
  (let f ((i n)(a '())
    (if (zero? i)
        (reverse a)
        (f (- i 1) (cons i a)))))
share|improve this answer
    
Using SRFI-1's unfold-right: (define (iota n) (unfold-right zero? 1- 1- n)) (where 1- is defined the usual way: (define (1- x) (- x 1))) –  Chris Jester-Young May 7 '09 at 16:50
    
Build in reverse order then reverse: (define (iota n) (reverse (unfold zero? 1- 1- n))) –  Chris Jester-Young May 7 '09 at 16:53

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