# Improvements in Algo/code for following HackerRank problem

I'm aware, SO is not a place for homework and hence, being very specific to the scope of question.

I was trying to solve this problem on HackerRank: Array Manipulation - Crush. The problem statement is quite simple and I implemented following code:

``````function arrayManipulation(n, queries) {
const arr = new Array(n).fill(0)
for (let j = 0; j < queries.length; j++) {
const query = queries[j];
const i = query[0] - 1;
const limit = query[1];
const value = query[2];
while (i < limit) {
arr[i++] += value;
}
}
return Math.max.apply(null, arr);
}
``````

Now, it works fine for half the test-cases but breaks with following message: Terminated due to timeout for test-cases 7 - 13 as the time limit is 1 sec.

So the question is, what are the areas where I can improve this code. In my understanding, with current algo, there is not much scope (I may be wrong), so how can I improve algo?

Note: Not looking for alternates using array functions like `.map` or `.reduce` as `for` is faster. Also, using `Math.max.apply(context, array)` as it is faster that having custom loop. Attaching references for them.

References:

• If you look at the constraints of the problem - you can see `n` can be upto 10^7. If you analysis the time complexity of your code - It is O(m * n) in worst case. Imagine there are 10^5 query, all are asking you to perform operation from 1 to 10^7 index. Total number of instruction would be 10^5 * 10^7, which is 10^12. Normally we assume it takes 1 sec to execute 10^7 instruction. Now you can do the math why is it failing. You need a different approach, more specifically a better data structure for updating the array. – Arnab Roy Feb 11 at 11:20
• @ArnabRoy Exactly my point. That's the question. I saw one of the solution that was implemented using C++ where, OP was calculating grand total first and the subtracting value if not in range. That would be like O( 2n * (l-r)) where l is the length of array and r is the range length. In my understanding this should fail, but it passes. Hence was looking for alternate algos – Rajesh Feb 11 at 11:26
• There are two approach that I can think of now. So you need range update. You can use Binary Indexed Tree or Segmented Tree. I would prefer BIT here, as it's easy to write. – Arnab Roy Feb 11 at 11:29
• Please include the problem description and example in the body of the question. Links can expire. – גלעד ברקן Feb 11 at 12:25
• @vivek_23 Pham Trung proposed an answer that could still solve the problem when N is arbitrarily large. – גלעד ברקן Feb 11 at 14:23

## 4 Answers

We could make some observations for this problem

• Let's keep a running sum representing the current value when we iterate from start to end of the array.
• If we break each operation into two other operation (a b k) -> (a k) and (b -k) with (a k) means adding k into the running sum at position `a` and (b -k) means subtracting k from the sum at position `b`.
• We could sort all of these operations by first their position, then their operator (addition preceding subtraction) we could see that we could always obtain the correct result.

Time complexty O (q log q) with q is the amount of queries.

Example:

``````a b k
1 5 3
4 8 7
6 9 1
``````

we will break it into

``````(1 3) (5 -3) (4 7) (8 -7) (6 1) (9 -1)
``````

Sort them:

``````(1 3) (4 7) (5 -3) (6 1) (8 -7) (9 -1)
``````

Then go through one by one:

``````Start sum = 0
-> (1 3)  -> sum = 3
-> (4 7)  -> sum = 10
-> (5 -3) -> sum = 7
-> (6 1)  -> sum = 8
-> (8 -7) -> sum = 1
-> (9 -1) -> sum = 0
``````

The max sum is 10 -> answer for the problem.

My Java code which passed all tests https://ideone.com/jNbKHa

This algorithm will help.

https://www.geeksforgeeks.org/difference-array-range-update-query-o1/

Using this algorithm you can solve the problen in `O(n+q)` where `n = size of the array` and `q = no of queries`.

• @PhamTrung time complexity here is O(n + q). – גלעד ברקן Feb 11 at 14:11
• Nice, looks like Delta encoding could also be used in this case. – Pham Trung Feb 11 at 15:31

I think the trick is not to actually perform the manipulations on arrays.

You can simply track the changes in index-intervals.

Keep a sorted list of intervals ( sorted by begin-index).

``````e.g. Input:       Internal representation
5 3               NOTHING TO DO
1 2 100           [1 2  value 100]
2 5 100           [1 1  value 100][2 2 value 200(100+100)][3 5  value 100]
3 4 100           [1 1  value 100][2 2 value 200(100+100)][3 4  value 200(100+100)][5 5  value 100]
as an optimization you could merge intervals with same value
->  [1 1  value 100][2 4  value 200][5 5  value 100]
``````

In the last step you iterate through your intervals and take the highest value.

• Issue in this trick is if there are mid ranges, it will yield incorrect output. Eg: 1st range `2 3 100`. 2nd range ` 4 6 50`. Now the max is `100` but this algo would return `150` as our group is `2-5` – Rajesh Feb 11 at 11:31

A slight modification of my answer to another problem will work here: Find the maximally intersecting subset of ranges.

It requires sorting, so is O(q log q) for q queries.

The modification is to note the amounts, instead of assuming all increments & decrements are exactly 1.