# Better Solution for Finding out Maximums for Consecutive Array Subsequences

Suppose, given an integer array A, I want to find out another COUNT array using A.

e.g., int A[] = {34, 10, 15, 14, 30, 27, 21, 32, 50}

For above example, COUNT[] should be: {0, 0, 1, 0, 3, 0, 0, 6, 8}

Here, COUNT[i] corresponds to A[i] and COUNT[i] represents the number of consecutive previous elements of A which are less than A[i].

e.g., A[1] = 10, COUNT[1] = 0, because there's no previous element in A which is less than A[1].

A[7] = 32, COUNT[7] = 6, because 32 is greater than previous 6 continuous elements (e.g., 10, 15, 14, 30, 27, 21).

Can we have O(n) solution for this problem?

EDIT:

As per @user1990169's algorithm, I implemented it in Java as following, but it's not giving expected output as algorithm doesn't count those indices which are not present on stack (already popped out in earlier iteration).

``````public static void main(String[] args) throws Exception {

Stack<Integer> stack = new Stack<Integer>();

// int a[] = new int[] { 53, 2, 7, 5, 15, 12, 10, 38, 72 };
int a[] = new int[] { 34, 10, 15, 14, 30, 27, 21, 32, 50 };

int N = a.length;

int[] count = new int[N];

int tos = 0;
int poppedElemIdx = 0;
int popCount = 0;

boolean counted = false;

stack.clear();

for (int i = 0; i < N; i++) {

popCount = 0;
counted = false;
while (!stack.isEmpty()) {

tos = stack.peek();

if (a[tos] > a[i]) {

stack.push(i);
count[i] = count[poppedElemIdx] + popCount;
counted = true;
break;

}

poppedElemIdx = stack.pop();
popCount++;
// popCount += (count[poppedElemIdx] + 1);

}

if (counted) {
continue;
}

stack.push(i);
count[i] = popCount;

}

// Print count array
for (int i = 0; i < N; i++) {
System.out.print(count[i] + " ");
}

}
``````
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O(N) Space and O(N) Time complexity algorithm.

Traverse the array from left to right. Maintain an external stack of elements.

``````A[0] = 34, push 34 onto stack. Count[0] = 0.
A[1] = 10,
Now keep popping out from stack till either it is empty
or you encounter a number greater than the current element (10).
Here 34 is > 10, hence we push 10 onto stack and make Count[1] = 0.

A[2] = 15.
So we pop out 10 from the stack, push 15 onto stack,
and make Count[2] = Count[ last popped out index ] + Number of indices popped out
= 0 + 1 = 1.
A[3] = 14.
So we push 14 onto stack and make Count[3] = 0.
A[4] = 30.
So we pop out 14 and 15 from the array, push 30 onto the array
and make Count[4] = Count[ index of 15 ] + Number of indices popped out(2)
= 1 + 2 = 3.
``````

Do this till you reach the end of array.

Since each item is pushed exactly once and popped out exactly once from the stack, the time complexity is O( 2*N) = O(N).

EDIT: As suggested, it will be better if you store the indices in the stack, instead of values.

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+1 very good solution. You can push indices instead of values in the stack. Also I understand what you mean by `Count[ last popped out index ] + Number of indices popped out` but a bit more details for the other readers will be of help. –  Ivaylo Strandjev Jul 16 at 11:49
@IvayloStrandjev Thanks. Elaborated my algorithm to make it clearer. –  user1990169 Jul 16 at 11:51
Thanks a lot, @user1990169. U just solved Stock Profit Maximization problem (unknowingly) :D –  Hitesh Dholaria Jul 16 at 12:06
@HiteshDholaria then mark it as answer –  bytefire Jul 16 at 13:04
@user1990169, There seems some bug in your mentioned algorithm or I didn't understand it properly, could u please tell me what's wrong with my code (see EDIT part of question)? –  Hitesh Dholaria Jul 16 at 17:33

Working program after small modifications into original algorithm:

``````public static void main(String[] args) throws Exception {

Stack<Integer> stack = new Stack<Integer>();

int a[] = new int[] { 53, 2, 7, 5, 15, 12, 10, 38, 72 };
// int a[] = new int[] { 34, 10, 15, 14, 30, 27, 21, 32, 50 };

int N = a.length;

int[] count = new int[N];

int tos = 0;
int poppedElemIdx = 0;
int popCount = 0;

boolean counted = false;

stack.clear();

for (int i = 0; i < N; i++) {

popCount = 0;
counted = false;
while (!stack.isEmpty()) {

tos = stack.peek();

if (a[tos] > a[i]) {

stack.push(i);
count[i] = popCount;
counted = true;
break;

}

poppedElemIdx = stack.pop();
popCount += (count[poppedElemIdx] + 1);

}

if (counted) {
continue;
}

stack.push(i);
count[i] = popCount;

}

// Print count array
for (int i = 0; i < N; i++) {
System.out.print(count[i] + " ");
}

}
``````
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