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Given a list of Numbers along with an index i and integer k , I wish the find the index of the number that is farthest (towards the left) from the number at index i and is less than k.

eg
if the array is
Index :0 1 2 3 4 5 6 7 .....
Array :3 4 1 5 5 4 3 7 .....
Assuming i = 7 and k = 4 , the answer would be 0

I have been trying to implement this using Red Black Trees, but I couldnt go any lower than O(n) . Is there any way I can reduce the complexity to O(logn) by using a different Data Structure ?

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2 Answers 2

up vote 2 down vote accepted

Actually, if the array is static and you want to make multiple queries for O(log n) each, you don't need that complicated data structures.

What you're actually asking for - "the number that is farthest (towards the left) from the number at index i and is less than k." - can be transformed to "the leftmost number before i that is less than k". Then you can see this as the following:

  • find the leftmost number that is less than K - say it's at position j;
  • if j < i, j is the answer to the question
  • otherwise, there is no such number - all the entries before position i are larger than or equal to k.

To answer the first of these questions, all you need to know is: for position i, what is the smallest number on positions 0..i - let's call this min(i). Notice that min is a monotonically decreasing function of i - if the min(5) = 10, there is no way that min(6) = 15, since min(6) is the smallest number on positions 0 to 6, and that necessarily includes the smallest number on positions 0 to 5, which we know to be 10. (min is fairly trivial to construct - if we call the array a, then: min(0) = a[0], and min(i) = minimum(min(i - 1), a[i]) for i > 0.)

With this information, you can perform a binary search for the leftmost index i such that min(i) < k. Then, by the construction of min, we know that all numbers on positions from 0 to i - 1 are greater than or equal to k. So i must be the answer of the question.

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One way is to build an array mp containing, for every 0 <= j < n, the index of the minimum of the first j elements:

int minPos = 0;
for (int i = 0; i < n; ++i) {
    if (a[i] < a[minPos]) minPos = i;
    mp[i] = minPos;
}

This will take O(n) time obviously.

The elements in mp will refer to elements in the input array a that have decreasing values. Given a query (i, k), you can now binary search mp for k in the range [0, i - 1], using indirection to get the actual minimum value from the minimum index:

int find(int i, int k) {
    int start = 0;
    int end = i - 1;

    if (a[mp[end]] >= k) return -1;    // Not found.
    if (a[mp[start]] < k) return mp[start];    // The first element is smaller.

    // We maintain the invariant that a[mp[start]] is >= k and a[mp[end]] is < k.
    while (end - start > 1) {
        int mid = (start + end) / 2;
        if (a[mp[mid]] < k) {
            end = mid;
        } else {
            start = mid;
        }
    }

    return mp[end];
}
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