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Can someone give me an idea of an efficient algorithm for large n (say 10^10) to find the sum of above series?

Mycode is getting klilled for n= 100000 and m=200000

#include<stdio.h>

int main() {
    int n,m,i,j,sum,t;
    scanf("%d%d",&n,&m);
    sum=0;
    for(i=1;i<=n;i++) {
    	t=1;
    	for(j=1;j<=i;j++)
    		t=((long long)t*i)%m;
    	sum=(sum+t)%m;
    }
    printf("%d\n",sum);

}
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can u use java? –  vpram86 Oct 1 '09 at 10:06
8  
Aviator: Efficient algorithms are usually independent of the language. Shouldn't really matter whether this is Java or C (except maybe a linear factor in runtime). –  Joey Oct 1 '09 at 10:08
    
@Johannes: I understand. I thought of suggesting BigInteger. Thats why asked –  vpram86 Oct 1 '09 at 10:09
    
You say you want something fast for big n (10^10), but you don't say whether m is similarly big, or if it stays around 200k. It might matter, because if m is small then you can try pre-calculating/caching some terms. If you already know a^m and a^a for all a less than m, then when you come to calculate (m+2)^(m+2) then it's just 2^(m+2) = 2^m*2^2. Then (m+3)^(m+3) = 3^m*3^3 and so on. You can probably arrange things so that you always access your stored values sequentially, not sure. –  Steve Jessop Oct 1 '09 at 11:59
    
Thinking about it, you might also want to cache 1^2m ... (m-1)^2m as well, while you're calculating the 2m+1 ... 3m-1 terms. Then use these values to calculate 1^3m ... (m-1)^3m, and replace the stored value with the new value for use in calculating 1^4m ... (m-1)^4m. Without writing the code I've no idea whether this will actually be faster than Mehrdad's solutino, but unless I've missed something fatal, it's O(n) instead of O(n log n). Obviously requires O(m) memory though. –  Steve Jessop Oct 1 '09 at 12:04

7 Answers 7

up vote 19 down vote accepted

Two notes:

(a + b + c) % m

is equivalent to

(a % m + b % m + c % m) % m

and

(a * b * c) % m

is equivalent to

((a % m) * (b % m) * (c % m)) % m

As a result, you can calculate each term using a recursive function in O(log p):

int expmod(int n, int p, int m) {
   if (p == 0) return 1;
   int nm = n % m;
   long long r = expmod(nm, p / 2, m);
   r = (r * r) % m;
   if (p % 2 == 0) return r;
   return (r * nm) % m;
}

And sum elements using a for loop:

long long r = 0;
for (int i = 1; i <= n; ++i)
    r = (r + expmod(i, i, m)) % m;

This algorithm is O(n log n).

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For small numbers I am doing the same thing. But it is getting killed for n = 1000000 and m =200000 . I have included the code –  rahul Oct 1 '09 at 10:01
3  
I believe you need one more 'mod' in those equations: '(a % m + b % m + c % m) % m', and '(a % m) * (b % m) * (c % m) % m'. –  Groo Oct 1 '09 at 10:06
    
Groo: Yep, did that in code, missed in equations. Thanks. Fixed. –  Mehrdad Afshari Oct 1 '09 at 10:08
4  
@rahul: Your inner j-loop runs in O(i). Mehrdad's function runs in O(log i). Replace your inner loop by a call to Mehrdad's function and you will get a big speed-up. –  dave4420 Oct 1 '09 at 10:10
    
@rahul. In case of n=1000 and m=2000, result 1000^1000%2000 to (1000^2%2000)^500%2000. –  user172818 Oct 1 '09 at 10:11

I think you can use Euler's theorem to avoid some exponentation, as phi(200000)=80000. Chinese remainder theorem might also help as it reduces the modulo.

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This does ring some bells, but I'm afraid you'll have to explain. Also, iirc, computing phi isn't trivial. –  Kobi Oct 1 '09 at 10:26
1  
You need to compute phi only once. Euler's theorem says that a^phi(b)=1 mod b if (a,b)=1. Then you can simplify a^c mod b to the form a^c' mod b where c'<phi(b). –  Jaska Oct 1 '09 at 10:35
    
Jaska: It's irrelevant here. What if (a,b) != 1? –  Mehrdad Afshari Oct 1 '09 at 10:43
    
It's not irrelevant as we can reduce some of the terms. Is (a,b)>1 then you should do the whole exponentiation. It is easy to check is a number is divisible by 2 or 5. –  Jaska Oct 1 '09 at 10:49
1  
Tip - try to edit your answer. Elaborate. Describe and explain your suggested algorithm. Try to post some code. Link to Wikipedia. Also, isn't the Chinese remainder theorem used for a set of equations? –  Kobi Oct 1 '09 at 11:04

You may have a look at my answer to this post. The implementation there is slightly buggy, but the idea is there. The key strategy is to find x such that n^(x-1)<m and n^x>m and repeatedly reduce n^n%m to (n^x%m)^(n/x)*n^(n%x)%m. I am sure this strategy works.

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Are you getting killed here:

for(j=1;j<=i;j++)
    t=((long long)t*i)%m;

Exponentials mod m could be implemented using the sum of squares method.

n = 10000;
m = 20000;
sqr = n;
bit = n;
sum = 0;

while(bit > 0)
{
    if(bit % 2 == 1)
    {
        sum += sqr;
    }
    sqr = (sqr * sqr) % m;
    bit >>= 2;
}
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How about

n*(n+1)*(2*n+1)/6 (mod m)

This is the formula for the sum of squares.

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3  
@tom10, this isn't a sum of squares, it's a sum of n^ns. –  DivineWolfwood Oct 1 '09 at 16:40
    
Oops... thanks. I was wondering why no one just wrote out the formula. –  tom10 Oct 1 '09 at 20:09

I encountered similar question recently: my 'n' is 1435, 'm' is 10^10. Here is my solution (C#):

ulong n = 1435, s = 0, mod = 0;
mod = ulong.Parse(Math.Pow(10, 10).ToString());
for (ulong i = 1; i <= n; 
{
     ulong summand = i;
     for (ulong j = 2; j <= i; j++)
     {
         summand *= i;
         summand = summand % mod;
     }
     s += summand;
     s = s % mod;
}

At the end 's' is equal to required number.

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I can't add comment, but for the Chinese remainder theorem, see http://mathworld.wolfram.com/ChineseRemainderTheorem.html formulas (4)-(6).

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2  
I cannot see how this helps –  fortran Oct 1 '09 at 22:53

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