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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:

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    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
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    Please include the problem description and example in the body of the question. Links can expire. – גלעד ברקן Feb 11 at 12:25
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    @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
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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

1

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.

  • 1
    @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
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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
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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.

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