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Given a sequence of n positive integers we need to count consecutive sub-sequences whose sum is divisible by k.

Constraints : N is up to 10^6 and each element up to 10^9 and K is up to 100

EXAMPLE : Let N=5 and K=3 and array be 1 2 3 4 1

Here answer is 4

Explanation : there exists, 4 sub-sequences whose sum is divisible by 3, they are

3
1 2
1 2 3
2 3 4

My Attempt :

long long int count=0;
for(int i=0;i<n;i++){
    long long int sum=0;
    for(int j=i;j<n;j++)
    {
        sum=sum+arr[j];
        if(sum%k==0)
        {
            count++;
        }
    }
}

But obviously its poor approach. Can their be better approach for this question? Please help.

Complete Question: https://www.hackerrank.com/contests/w6/challenges/consecutive-subsequences

share|improve this question
    
Do you want sub-sequences or subarrays –  Jerky Jul 1 '14 at 20:28
    
@AyushJain Consecutive Subsequences,As mentioned –  user3786422 Jul 1 '14 at 20:29
    
@Ben Yeah consecutive ones –  user3786422 Jul 1 '14 at 20:30
1  
Suppose your array is [1,4,3,2,1], then what output do you expect. Can you tell? –  Jerky Jul 1 '14 at 20:31
1  
you can simplify your calculations if you take %K of all input numbers and will work with rests. So, you will work with numbers below 100, that will help you to avoid overflow. –  Arkady Jul 1 '14 at 20:40

2 Answers 2

up vote 6 down vote accepted

Here is a fast O(n + k) solution:

1)Lets compute prefix sums pref[i](for 0 <= i < n).

2)Now we can compute count[i] - the number of prefixes with sum i modulo k(0 <= i < k). This can be done by iterating over all the prefixes and making count[pref[i] % k]++. Initially, count[0] = 1(an empty prefix has sum 0) and 0 for i != 0.

3)The answer is sum count[i] * (count[i] - 1) / 2 for all i.

4)It is better to compute prefix sums modulo k to avoid overflow.

Why does it work? Let's take a closer a look at a subarray divisible by k. Let's say that it starts in L position and ends in R position. It is divisible by k if and only if pref[L - 1] == pref[R] (modulo k) because their differnce is zero modulo k(by definition of divisibility). So for each fixed modulo, we can pick any two prefixes with this prefix sum modulo k(and there are exactly count[i] * (count[i] - 1) / 2 ways to do it).

Here is my code:

long long get_count(const vector<int>& vec, int k) {
  //Initialize count array.
  vector<int> cnt_mod(k, 0);
  cnt_mod[0] = 1;
  int pref_sum = 0;
  //Iterate over the input sequence.
  for (int elem : vec) {
    pref_sum += elem;
    pref_sum %= k;
    cnt_mod[pref_sum]++;
  }
  //Compute the answer.
  long long res = 0;
  for (int mod = 0; mod < k; mod++)
    res += (long long)cnt_mod[mod] * (cnt_mod[mod] - 1) / 2;
  return res;
}
share|improve this answer
2  
why count[pref[i] % k]++.? –  user3786422 Jul 1 '14 at 20:46
    
By defenition of count[i] - the number of prefixes with sum i modulo k. –  kraskevich Jul 1 '14 at 20:47
    
Nice solution -- I think you mean count[i] * (count[i] - 1) / 2 in step 3? –  p_a_c Jul 1 '14 at 20:49
1  
Hrm...I must be confused, can you run it on the example? A={1,2,3,4,1}, pref={1,3,6,10,11}, perf%3={1,0,0,1,2},count={2,2,1}, sum count[i]*(count[i]-1)/2=1+1+0=2 != 4. –  IdeaHat Jul 1 '14 at 21:02
1  
count[0] is initially one for an empty prefix. count={3,2,1} and the sum is 4. –  kraskevich Jul 1 '14 at 21:11

That have to make your calculations easier:

//Now we will move all numbers to [0..K-1]
long long int count=0;
for(int i=0;i<n;i++){
    arr[i] = arr[i]%K;
}

//Now we will calculate cout of all shortest subsequences.
long long int sum=0; 
int first(0); 
std::vector<int> beg;
std::vector<int> end;
for(int i=0;i<n;i++){
    if (arr[i] == 0)
    {
        count++; 
        continue;
    }
    sum += arr[i];
    if (sum == K)
    {
        beg.push_back(first);
        end.push_back(i);
        count++;
    }
    else
    {
        while (sum > K)
        {
            sum -= arr[first];
            first++;     
        }
        if (sum == K)
        {
            beg.push_back(first);
            end.push_back(i);
            count++;
        }
    }        
}

//this way we found all short subsequences. And we need to calculate all subsequences that consist of some short subsequencies.
int party(0);
for (int i = 0; i < beg.size() - 1; ++i)
{
    if (end[i] == beg[i+1])
    {
        count += party + 1;
        party++;
    }
    else
    {
        party = 0;
    } 
}

So, with max array size = 10^6 and max size of rest = 99, you will not have overflow even if you will need to summ all numbers in simple int32.

And time you will spend will be around O(n+n)

share|improve this answer
    
Your solution is still O(N^2) –  Luchian Grigore Jul 1 '14 at 20:43
    
@Ben nope, note the inner loop uses arr. –  Luchian Grigore Jul 1 '14 at 20:45
    
It's just idea to optimize overflow problem. I didn't find way to have less n^n yet. –  Arkady Jul 1 '14 at 20:47
    
A DP algorithm exists, but this suggestion is better suited as a comment than an answer. –  Luchian Grigore Jul 1 '14 at 20:49
    
Oh, of course. Nevermind :X –  Ben Jul 1 '14 at 20:52

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