Reversing a part of an array (or any other data structure )

I want to reverse an array (or any other data structure) but because this operation is going to be done on the array for n times , im looking for the best solution possible, I have the sorted array , which is gotten in O(nlgn) time , i start looking for first element in the sorted array , inside the unsorted array ( which is equal to finding the smallest key in the unsorted array ) then I reverse the array from the beginning to the index of that value , then i do the same for the rest , find the second smallest value's index , and reverse the array again , from the second index to the end of the array and so on :
for example , consider this array :

``````*‫2 6 (*1*) 5 4 *3‬  // array is reversed from its 0th index to the 3rd index (0 based)
1 *5* 4 3 6 (*2*)  // array is reversed from its 1st index (0 based ) to the 5th index
1 2 *6* *3* 4 5    // and ...
1 2 3 *6* *4* 5
1 2 3 4 *6* *5*
1 2 3 4 5 6
``````

well i have to sort the array in order to have the values im looking for in the unsorted array , it'll take o(nlgn) time , and doing the algorithm above , will take o(n^2) ,any idea to make it more quick , to be done in o(nlgn) time ? so the question is reversing a sub array of the array in the least time Order , cause it's done for many times in large sized arrays. ( I can get the indices i and j ( which are the first and last index of the sub array ) in O (n) time cause i have the sorted array and i'll just look up the numbers in the unsorted array ) so im looking for the best time order for reversing an array from it's ith index to it's jth index .

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Can't you just sort it in a different way? It should take O(n*logn), i.e. with a different `Comparator` –  Jes Dec 1 '11 at 9:43
@Jes : yes I can sort in another way , but I have something to do with this algorithm, just asked like this so i might find another way to make it faster.(cause I want to do other things with this , but it does the sort too , i asked my question relying on the sort part :) ) –  user633784 Dec 1 '11 at 9:45
So long story short, are you looking for a way to reverse an array in less than O(n) time, e.g. O(log n)? –  jornb87 Dec 1 '11 at 10:23
@jornb87 : yes ! but a part of it , say a Sub-array of the main array ! –  user633784 Dec 1 '11 at 12:28

Here comes an O(`n`) solution (i think, reading your description was hard). It's a data structure wich allows 1) reversing a sub-array in O(1), 2) Getting a value from the array in O(`r`), where `r` is the number of reversings that is done, 3) find the index of an element in O(`n`), where `n` is the length of the list.

Just store our array as usual, and have a list of `ReversedRange(imin, imax)` elements. Reversing part of the array is as easy as inserting another element in this list.

Whenever you need to get a value from the modified array at index `i`, you look through all the `ReversedRange` for which `imin <= i <= imax`, and calculate the index `j` which corresponds to the original array index. You need to check `r` reversings, so it is O(`r`).

To get the index `i` of a value `v`, look through the original array and find the index `j`. Done in O(`n`) time. Do the same traversing of the `ReversedRange`s, only in the oppsite direction to calculate `i`. Done in O(`r`) time, total O(`n`+`r`) which is O(`n`).

Example

Consider the following list: `0 1 2 3 4 5 6 7 8 9`. Now say we reverse the list form indexes `1` through `6`, and then from `0` through `5`. So we have:

``````I    0 1 2 3 4 5 6 7 8 9
|         |
II   0 6 5 4 3 2 1 7 8 9
|         |
III  2 3 4 5 6 0 1 7 8 9
``````

No let us map the index `i = 2` to the original array. From the graph we see that we should end up with `III(2) = 4`

``````1) since i = 2 is in [0, 5] we calculate
i <- 5 - (i - 0) = 5 - 2 = 3
2) since i = 3 is in [1, 6] we calculate
i <- 6 - (i - 1) = 6 - 2 = 4
3) there are no more ranges, we are done with result 4!
``````
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Thanks for your answer , seems to work out but I need alittle more explanation on that ReversedRange list u talked about. –  user633784 Dec 2 '11 at 12:19
let me tell u alittle more about what i want to do .. we have an array , what we want to do is , find the smallest value's index in the array , reverse the array from 0th element to the found index , now find the second smallest , and again reverse the array , this time from 1st element to the found index ( for the second smallest one ) and go on with this ( this algorithm will finally sort the array but what i want to do is print the indices found for each smallest value that we look up in each stage and then reverse to that point , and print them :) that's all to what i want to do ) –  user633784 Dec 2 '11 at 12:22
here's an example : input : 3 4 5 1 6 2 output : 4 6 4 5 6 6 it's kinda obvious , 4 is the index of 1 in the input array . then we reverse the first array like how i said to be : 1 5 4 3 6 2 now the next number in output , 6 , is the index of second smallest value , which is (2) , and so on .. :) –  user633784 Dec 2 '11 at 12:25
@SpiXel Updated with an example :) –  jornb87 Dec 2 '11 at 15:32

(Possibly) memory heavy...

Why don't you maintain two Collections. Traverse the original collection until you have found your reverse point. Then traverse backwards from there with an iterator or indexing if you have it (ArrayList) adding each element to a new collection. Then merge the two collections (The reversed portion and the previous untouched portion). Repeat this until finished.

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Well this will take O(n^2) which is not what im looking for , Im looking for a n*lgn solution. –  user633784 Dec 1 '11 at 10:04

Seems like a very simple answer to a complicated question so maybe I'm missing something. If you are looking for an efficient way to reverse part of an array then something like the following should work. You could easily make it generic of course.

``````// endIndex and startIndex are inclusive here
int half = startIndex + ((endIndex + 1) - startIndex) / 2;
int endCount = endIndex;
for (int startCount = startIndex; startCount < half; startCount++) {
int store = array[startCount];
array[startCount] = array[endCount];
array[endCount] = store;
endCount--;
}
``````

Seems like the rest of your code would be much more complex than this. Not sure what the O() is here because it is not doing comparisons which are traditionally the measure but this is doing 1.5 x N assignments to reverse the array. I don't see any way that this can be done faster.

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