# Sml recursive very slow in large input data

I'm trying to create a solution to a problem given a sorted list you have to eliminate the first or the last element until no element is x*2>y and x < y/2.For example a list [2,4,4,5,7,8,9] must be done [4,4,5,7,8]. Removed 2 because it is smaller/2 by 4 numbers and 9 because it is bigger/2 by 2 remaining numbers(the 4,4).The program returns the length of the final list and the elements removed from the right.So answer would be (5,1).for large lists it's very slow . We prefer to keep an element to the right than left.For example given a list [1,3,11] solution [11],elements removed from right=0.The code is( where n is 0 at the beginnig,is how many elements are removed from the right): NOTE that i have to use division because if I multiply with big ints it throws an overflow exception..

``````fun round n =
if n mod 2=0 then n
else (n+1);

fun p1 (x, y) = if (round y) div 2 > x then 1 else 0

fun p2 (x, y) = if (round x) div 2 > y then 1 else 0

fun findlarger [] = 0
| findlarger (x::xs) = foldl (fn (a,b) => b + p1(x, a)) 0 xs

fun findsmaller [] = 0
| findsmaller (x::xs) = foldl (fn (a,b) => b + p2(x, a)) 0 xs

fun solve2 (n, lst) =
let
val remove = ref n
in
if ((findlarger (lst)) = 0) then (length(lst), !remove)
else
if (findlarger (lst)) < (findsmaller (rev(lst))) then
(remove := !remove + 1;
solve2 (!remove, rev (tl(rev(lst)))))
else
solve2 (!remove, tl (lst))
end;
``````

Other Solution here below, where I don't call any function more times than needed but for large inputs it's also slow. Any help would be welcome because it is an assignment and i can't understand why in ml this solution runs so slowly.

`````` fun solve (n, sizelist) =
let
val list= ref (sizelist)
val remove= ref 0
val flag= ref 1
val temp1= ref (findlarger (!list))
val temp2= ref (findsmaller (rev(!list)))
in
while (!flag > 0) do
(if ( !temp1 =0) then (flag := !flag-1)
else
(
if !temp1 < !temp2 then
(
temp1 := !temp1-1;
remove := !remove + 1;
list := rev (tl(rev(!list)));
temp2 :=(findsmaller (rev(!list)))
)
else
( temp2 := !temp2-1;
list := tl (!list);
temp1 :=(findlarger (!list))
)
)
);
(length (!list),!remove)
end;
``````
-
The round function doesn't exactly round but rounds up an element because the list is consisted of ints.For example 9 div 2= 4 in ml where I want it to be 4.5=5.So i use the round for the comparison in findlarger and findsmaller functions. –  user2271058 Apr 26 '13 at 11:46
As I pointed out in your other question, you should avoid the combination of length and filter function, as that will give you two full list traversals in the worst case. As you do this for both findsmaller and findlarger that will be four traversals, as opposed to just 2 if you had used the fold functions. Note that division is inherently slow compared to multiplication. In your solve2 function you find the length of the list again after having called findlarger. –  Jesper.Reenberg Apr 26 '13 at 12:20
You should save/cache such information, specifically since if your findlarger is not equal to zero, then you call findlarger again, just to compare with the result of findsmaller. There is no need to use references, you could just as well reference the the variable n directly and add +1 the appropriate places. Also note that you can't compare the speed of SML/NJ with the speed fo C. If you wan't to compare, you should compile your code with MLton first. –  Jesper.Reenberg Apr 26 '13 at 12:22
Can you show it in my code because i don't understand exactly..Thanks for the quick responses. –  user2271058 Apr 26 '13 at 12:24
No wonder it is slow for large inputs. Besides the fact that you have implemented it "purely" in an imperative manner using references and loops, then you are reversing the list repeatedly. Take for example when you wan't to remove the last element of the list, then you have this code `rev (tl(rev(!list)));` instead of using the `List.take` function as I hinted you in your previous question. –  Jesper.Reenberg Apr 26 '13 at 20:49