# How to find 3 numbers in increasing order and increasing indices in an array in linear time

I came across this question on a website. As mentioned there, it was asked in amazon interview. I couldn't figure out a proper solution in given constraint. Please help.

Given an array of n integers, find 3 elements such that a[i] < a[j] < a[k] and i < j < k in 0(n) time.

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So, what have you tried? –  Henk Holterman Apr 4 '12 at 9:12
@HenkHolterman My thinking took me to similar direction as of twall's approach below. But finally I ended up with finding out bugs in my own solution... :( –  rajneesh2k10 Apr 4 '12 at 15:57

So here is how you can solve the problem. You need to iterate over the array twice. On the first iteration mark all the values that have an element greater then them on the right and on the second iteration mark all the element smaller then them on their left. Now your answer would be with an element that has both:

``````int greater_on_right[SIZE];
int smaller_on_left[SIZE];
memset(greater_on_rigth, -1, sizeof(greater_on_right));
memset(smaller_on_left, -1, sizeof(greater_on_right));

int n; // number of elements;
int a[n]; // actual elements;
int greatest_value_so_far = a[n- 1];
int greatest_index = n- 1;
for (int i = n -2; i >= 0; --i) {
if (greatest_value_so_far > a[i]) {
greater_on_rigth[i] = greatest_index;
} else {
greatest_value_so_far = a[i];
greatest_index = i;
}
}

// Do the same on the left with smaller values

for (int i =0;i<n;++i) {
if (greater_on_rigth[i] != -1 && smaller_on_left[i] != -1) {
cout << "Indices:" << smaller_on_left[i] << ", " << i << ", " << greater_on_rigth[i] << endl;
}
}
``````

This solution iterates 3 times over the whole array and is therefor linear. I have not provided the whole solution so that you can train yourself on the left to see if you get my idea. I am sorry not to give just some tips but couldn't figure out how to give a tip without showing the actual solution.

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Great thinking! My way of doing it had to many flaws, I admit, I should have thought in a broader sense: linear doesn't at all mean in one iteration, even though I am quite sure it would be doable. I'll try to find a solution later! –  devsnd Apr 4 '12 at 9:47
Awesom and perfect!! –  rajneesh2k10 Apr 5 '12 at 2:23
Correct me if I am wrong, but if the input is {1,2,3,4} you are not finding all the triplets, which are [1,2,3][1,2,4][1,3,4][2,3,4] –  daniele Sep 26 '13 at 10:24
@daniele you are only required to find one triplet, not all of them. You can not expect to be able to print all triplets in linear time as their number may be cubic. –  Ivaylo Strandjev Sep 26 '13 at 10:46

I posted another approach to resolve it here.

``````#include<stdio.h>

// A function to fund a sorted subsequence of size 3
void find3Numbers(int arr[], int n)
{
int max = n-1; //Index of maximum element from right side
int min = 0; //Index of minimum element from left side
int i;

// Create an array that will store index of a smaller
// element on left side. If there is no smaller element
// on left side, then smaller[i] will be -1.
int *smaller = new int[n];
smaller[0] = -1;  // first entry will always be -1
for (i = 1; i < n; i++)
{
if (arr[i] < arr[min])
{
min = i;
smaller[i] = -1;
}
else
smaller[i] = min;
}

// Create another array that will store index of a
// greater element on right side. If there is no greater
// element on right side, then greater[i] will be -1.
int *greater = new int[n];
greater[n-1] = -1;  // last entry will always be -1
for (i = n-2; i >= 0; i--)
{
if (arr[i] > arr[max])
{
max = i;
greater[i] = -1;
}
else
greater[i] = max;
}

// Now find a number which has both a greater number on
// right side and smaller number on left side
for (i = 0; i < n; i++)
{
if (smaller[i] != -1 && greater[i] != -1)
{
printf("%d %d %d", arr[smaller[i]],
arr[i], arr[greater[i]]);
return;
}
}

// If we reach number, then there are no such 3 numbers
printf("No such triplet found");
return;
}

// Driver program to test above function
int main()
{
int arr[] = {12, 11, 10, 5, 6, 2, 30};
int n = sizeof(arr)/sizeof(arr[0]);
find3Numbers(arr, n);
return 0;
}
``````
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exactly same as the solution given by @Ivaylo Strandjev. –  Trying Aug 1 '13 at 2:51

Try to create two variables:

``````1. index_sequence_length_1 = index i such
a[i] is minimal number
2. index_sequence_length_2 = index j such
There is index i < j such that a[i] < a[j] and a[j] is minimal
``````

Iterate over whole array and update this variables in each iteration.

If you iterate over element that is greater than a[index_sequence_length_2], than you found your sequence.

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I think the description is incomplete! Lots of cases have not been considered and the approach is not leading to to a correct solution. –  rajneesh2k10 Apr 14 '12 at 13:46

Sorry, i couldn't resist but to solve the puzzle... Here is my solution.

``````//array indices
int i, j, k = -1;
//values at those indices
int iv, jv, kv = 0;
for(int l=0; l<a.length(); l++){
//if there is a value greater than the biggest value
//shift all values from k to i
if(a[l]>kv || j == -1 || i == -1){
i = j;
iv = jv;
j = k;
jv = kv
kv = a[l]
k = l
}
if(iv < jv && jv < kv && i < j && j < k){
break;
}
}
``````
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+1. Nice. :) I wouldn't have used iv, jv, and kv though, but I guess it's more efficient that way so I can't complain. How would you know you've found it? Check if `i != j && j != k`. –  Neil Apr 4 '12 at 9:19
What is this supposed to do? For the input "100, 1,2,3" you will only set kv = 100 and that is it, while there is a valid set of three numbers. –  Ivaylo Strandjev Apr 4 '12 at 9:23
@izomorphius, good point. I would add if(a[l]>kv || k < 2) –  Neil Apr 4 '12 at 9:27
I updated my answer, thanks for the input, izomorphius & Neil –  devsnd Apr 4 '12 at 9:29
OK and now what would you do for the input "1001,100,200,1,2,3"? I do not think your approach is in the correct direction. –  Ivaylo Strandjev Apr 4 '12 at 9:31

Iterate once and done:

``````public static int[] orderedHash(int[] A){
int low=0, mid=1, high=2;
for(int i=3; i<A.length; i++){
if(A[high]>A[mid] && A[mid]>A[low])
break;

if(A[low]>A[i])
low=mid=high=i;
else if(low == mid && mid == high)
mid = high = i;
else if(mid == high){
if(A[high]<A[i])
high = i;
else
mid = high = i;
}
else if(A[mid]<A[i])
high = i;
else if( A[high]<A[i]){
mid = high;
high =i;
}
else
mid=high=i;
}
return new int[]{A[low],A[mid],A[high]};
}//
``````

Then test with main:

``````public static void main(String[] args) {
int[][] D = {{1, 5, 5, 3, 2, 10},
{1, 5, 5, 6, 2, 10},
{1, 10, 5, 3, 2, 6, 12},
{1, 10, 5, 6, 8, 12, 1},
{1, 10, 5, 12, 1, 2, 3, 40},
{10, 10, 10, 3, 4, 5, 7, 9}};
for (int[] E : D) {
System.out.format("%s GIVES %s%n", Arrays.toString(E), Arrays.toString(orderedHash(E)));
}
}
``````
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Thanks for reply, but its always good to write algorithm for better understanding of others rather than just bombarding your code. Even if you are doing so, it should be well commented. :) Codes are welcome in case the idea can not be expressed well in algorithms... –  rajneesh2k10 Apr 12 '12 at 9:20
This is just a for loop and a few if-else so I figured this was easy to follow. Any specifics you don't understand? I will be happy to help. –  kasavbere Apr 12 '12 at 18:47
Now I looked at your code and I'm afraid its not producing correct result! Try this test case: 3,10,5,1,11 –  rajneesh2k10 Apr 14 '12 at 2:51

What if you build a max-heap O(n) and then do Extract-Max O(1) 3 times?

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It doesn't fulfil the constraints mentioned!! Moreover you need to check the complexities you mentioned... :) –  rajneesh2k10 Apr 12 '12 at 16:46

Start creating a binary Search Tree , each Node will contain a integer count to track no of right childs.

each we are inserting a right child we increment the count of its parent.

If count of any node reaches 2 , then that node and its nodes in the right subtree will give you the result

Complexity of this sollution nlog(n)

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