# Space complexity question [duplicate]

Possible Duplicate:
Regarding in-place merge in an array

I have an array, where the first and second half of the array is sorted, e.g.

``````A[] = "2 4 7 1 5 20"
``````

No how do I sort the whole array in O(1) space complexity?

Regards, Mithun

-

## marked as duplicate by deinst, Andrey, Steve Jessop, Moron, GravitonSep 7 '10 at 1:01

Take a look at this list, and take your pick from any of the algorithms that have '`1`' in the 'Memory' column. The fact that the array has some sort of order already is irrelevant if your only requirement is constant auxiliary space, with no other efficiency requirements.

-

This screams merge sort (for time efficiency) to me which I don't think has a nice in-place algorithm (O(1) space). You could see this question for an in-place merge sort.

I agree with Ani, if you really need O(1) space it will probably be easier to just use something like quicksort.

-
Quicksort requires O(log N) auxiliary storage. –  Jerry Coffin Sep 6 '10 at 21:23
Yes, I wasn't taking the recursive calls into account. If you really can't spare O(log n) I'd probably just keep it simple and use insertion sort. –  Greg Sexton Sep 6 '10 at 21:30

Using pseudo code, here is an in-place two stack merge.

``````i <- 0
mid <- A.size/2
while i < mid:
if A[i] > A[i+mid] then
swap A[i] and A[i+mid]
i <- i + 1
``````

It works (is supposed to work) by maintaining the follow invariant: A[1..mid] and A[mid..n] are sorted, and A[1..i] contains elements strictly less than those contained in A[mid..n]. I might have botched the details, but that is the basic idea.

-

I could (of course) be wrong, but I'd guess anything that takes only O(1) space will also have O(N2) complexity. Nonetheless, I think you can do a (little) bit better than just applying a normal insertion sort.

``````template <class T, class inIter>
void insert(T t, inIter point, inIter end) {
inIter right = point;
++right;
while (right != end && *right < t)
*point++ = *right++;
*point = t;
}

void ipmerge(std::vector<int> &A) {
size_t right = A.size()/2;
for (size_t left = 0; left < A.size()/2;++left) {
if (A[right] < A[left]) {
int t = A[left];
A[left] = A[right];
insert(t, A.begin()+right, A.end());
}
if (left+1 == right)
++right;
}
}
``````
-