# Sort and keep track of elements

Just to know, I'm talking C++ now.

Suppose I have an array `A = {4, 1, 5, 2, 3}` and sort it in `A_sorted = {1, 2, 3, 4, 5}`. I would like to keep the following information: where is now element `e` (from array A) in the sorted array A_sorted? e.g.: element with index 2 in A (`5`) has now index 4 in A_sorted.

The question is more like: can one use STL to achieve this?

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Many answers are about finding an element in an original array. I think this question is about looking for position in sorted array. I don't get it. – Basilevs Nov 27 '12 at 12:15

There's no off-the-shelf functionality to achieve this, but there are work-arounds. You can, for example, keep an array of user-defined structs that also contain the original position:

``````A = { {4,0}, {1,1}, {5,2}, {2,3}, {3,4}}
``````

And then sort this using a custom comparator function that sorts by the value and not the original index.

``````A_sorted = {{1,1}, {2,3}, {3,4}, {4,0}, {5,2}}
``````
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Seems to me that this is the fastest solution of all, as it is the only solution that does not increase the number of comparisons. Is this correct? – Zane Nov 6 '12 at 11:20
@Zane no it doesn't. – Luchian Grigore Nov 6 '12 at 11:34
Then again, given a position 2 in the original array how do you find position of value 5 (5) in the sorted one without full scan? – Basilevs Nov 27 '12 at 12:13
I propose updating copy of A with actual indices of A_sorted by scanning it once after the sort: for(int i = 0; i < sizeof(A_sorted); ++i) A[A_sorted[i].second].second = i; – Basilevs Nov 27 '12 at 12:21
This is the basis of the correct answer but it doesn't answer the question fully. – CashCow Nov 27 '12 at 15:32
``````template<class T>
struct ValueWithIndex
{
T Value;
int index;
};
template<class T>
bool operator < (const ValueWithIndex<T>& v1, const ValueWithIndex<T>& v2)
{
return v1.value < v2.value;
}
template<class T> ValueWithIndex<T>
MakeValueWithIndex(const T& value, int index)
{
ValueWithIndex<T> ret;
ret.value = value;
ret.index = index;
return ret;
}
``````

Now sort your container of `ValueWithIndex`. The information about original indexes will not be lost.

``````int main()
{
std::vector<ValueWithIndex<int>> v;
for(int i = 0; i < n; ++i)
{
int value;
std::cin >> value;
v.push_back(MakeValueWithIndex(value, i));
}

std::sort(v.begin(), v.end());
}
``````
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I am not sure this answers the question. This is how you make an index to find the place in the original collection but I think he is asking to find where the item is from the collection in the index. – CashCow Nov 6 '12 at 9:53

You can use `find` to search for the element:

``````int *p1 = std::find(&A[0], &A[5], 5);
int *p2 = std::find(&A_sorted[0], &A_sorted[5], 5);
``````

and use the distance to show the index:

``````int i1 = p1 - A;
int i2 = p2 - A_sorted;
``````

i1 and i2 now show the index in the corresponding array.

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brute force approach, if A is large O(N²) – CashCow Nov 27 '12 at 15:47

Try this out: If you want to convert to vector:

`````` int A[] = {4, 1, 5, 2, 3};
int A_sorted [] = {1, 2, 3, 4, 5};
std::vector<int> v(A_sorted, A_sorted + 5);

for (int i=0; i<5; i++)
{
std::vector<int>::iterator low = lower_bound (v.begin(), v.end(), A[i]);
std::cout << "Element: " << A[i] << " is at: " << distance(v.begin(), low)  << std::endl;
}
``````

If you want to work on raw array:

`````` int A[] = {4, 1, 5, 2, 3};
int A_sorted [] = {1, 2, 3, 4, 5};

for (int i=0; i<5; i++)
{
int* low = std::lower_bound (&A_sorted[0], &A_sorted[5], A[i]);
cout << "Element: " << A[i] << " is at: " << distance(&A_sorted[0], low)  << endl;
}
``````
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yes this will work, will be O(log N) for each item to find its place. – CashCow Nov 6 '12 at 9:54
Why O(logN)? Does `lower_bound` knows that the array is sorted? – Shashwat Jul 4 '14 at 18:49

If you cannot modify what's stored in `A`, you could create an index array and sort it with a special predicate:

``````int A[] = {4, 1, 5, 2, 3};

size_t indices[] = {0, 1, 2, 3, 4};

bool sortBefore(size_t i, size_t j) {
return A[i] < A[j];
}

std::sort(indices, indices + 5, sortBefore);
``````

Then, either access `sorted_A[i]` as `A[indices[i]]`, or re-arrange `A` according to indices. New position of i-th element of `A` is `std::find(indices, indices+5, i) - indices`.

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Ok, an index normally tells you what the nth sorted element of a vector is. But this is going to do the reverse, thus it will tell you that the nth element in your vector is the mth in sorted order.

This is being done by creating a vector of indices on your non-sorted vector. You can still create a sorted copy or an index, of course.

We start off with a predicate for which a < b if v[a] < v[b]

``````template< typename T >
class PredByIndex
{
private:
std::vector< T > const & theColl;
public:
PredByIndex( std::vector<T> const& coll ) : theColl( coll )
{
}

bool operator()( size_t i, size_t j ) const
{
return theColl[i] < theColl[j];
}
};

template< typename T >
void makeOrdered( std::vector< T > const& input, std::vector< size_t > & order )
{
order.clear();
size_t len = input.size();
order.reserve( len );
for( size_t i = 0; i < len; ++i )
{
order.push_back( i );
}
PredByIndex<T> pred( input );
std::sort( order.begin(), order.end(), pred );
}
``````

And now "order" will have the ordinal position in the ordered collection.

Of course in C++11 the predicate could be written as a lambda expression rather than having to create the class PredByIndex.

We are not done yet though. We now have an index, not a "find me in the sorted vector". However we can `transpose` our index as follows:

``````void transpose_index( std::vector< size_t > const & index,
std::vector< size_t > & trans )
{
// for this to work, index must contain each value from 0 to N-1 exactly once.
size_t size = index.size();
trans.resize( index.size() );
for( size_t i = 0; i < size; ++i )
{
assert( index[i] < size );
// for further assert, you could initialize all values of trans to size
// then as we go along, ensure they still hold that value before
// assigning
trans[ index[i] ] = i;
}
``````

}

Now our transposed index gives you what you want, and the transpose itself is `O(N)`

In a slightly different example of data, if the inputs are `[ 5, 3, 11, 7, 2 ]`

The "sorted" order is `[ 2, 3, 5, 7, 11 ]`

The "index" order is `[4, 1, 0, 3, 2]` i.e. element 4 is the smallest, then element 1 etc.

The "transpose" order, as we fill it in

`````` [ _, _, _, _, _ ]
[ _, _, _, _, 0 ]
[ _, 1, _, _, 0 ]
[ 2, 1, _, _, 0 ]
[ 2, 1, _, 3, 0 ]
[ 2, 1, 4, 3, 0 ]
``````

This looks like what we want. Our original data 5 is position 2, 3 is position 1, 11 is position 4 etc in the sorted data.

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@Basilevs Yes, I forgot to complete it. You have to create the index first. Then apply my "transpose" function to it. – CashCow Nov 27 '12 at 15:46