# Optimise arithmetic operations on very large numbers

I want to compute the function H(n) where

``````H(0)=0;
H(i)=H(i-1)×A+Ci mod B;

10<=A,B<=10^15;
``````

C is an array of n elements

The following code takes too much time...any better way of doing this?

``````public BigInteger H(int no) {
if(no>0) {
bi=H(no-1);
bi=bi.multiply(BigInteger.valueOf(A));
bi=bi.remainder(BigInteger.valueOf(B));
return bi;
}

return BigInteger.ZERO;
``````

}

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What is the nature of Ci; what is its length, is it effectively random, does it contain a lot of zeroes, similar values, or similar patterns? If so, a change of algorithm may speed up things. – mvds Aug 8 '10 at 17:07
It seems there are some parentheses missing in the formula. – starblue Aug 9 '10 at 9:16

Try using a dynamic programming approach. Rather than using recursion, loop starting at the initial case H(0) and moving up from there. Example:

``````public static BigInteger H(BigInteger[] c, int no, BigInteger A, BigInteger B) {

if (c.length < no - 1) {
throw new IllegalArgumentException("no is too large");
}

BigInteger bi = BigInteger.ZERO;  // Initial case H(0) = 0

for (int i = 1; i <= no; i++) {   // From H(1) -> H(no)
}

return bi;
}
``````
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Try not using the remainder every iteration, it uses division which is VERY slow.

You should also not use BigInteger.valueOf() every iteration. Only create A and B as BigIntegers one time and save them, there is no need for doing it more times.

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Yeah, welcome to the world of BigIntegers.

One thing I remember is that you can do two paths for this:

1) A slow path with BigIntegers 2) A fast path with double primitive types when both the arguments are less than Max Double.

That should pump up the speed a little bit.

Tell us here how it went and post times if you can. This is really interesting.

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