# Need an efficient implementation of the following formula?

I have been trying to implement the following formula

the formula is as follows

summation(from i = 1 to i = K) (M choose i) * i! * StirlingNumberOfSeconfType(N,i)

for the constraints

1 ≤ N ≤ 1000 1 ≤ M ≤ 1000000 1 ≤ K ≤ 1000

but I am failing to get results for large inputs can anyone provide me an efficient implementation of the formula ?

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What does your code look like now? –  Brendan Long Nov 5 '11 at 6:15
I hope you do realize that there will be an impressive amount of integer overflow. Especially since everything inside that summation has factorials all over the place... –  Mysticial Nov 5 '11 at 6:19

You can try using a double (or a "long double" if you use C or C++ on gcc) to avoid failing for the larger results.

EDIT: Read the question more carefully

Efficient stirling 2nd numbers calculation (question title is misleading I know but read it): http://mathoverflow.net/questions/34151/simple-efficient-representation-of-stirling-numbers-of-the-first-kind

Use http://gmplib.org/ to avoid the overflows.

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I recently implemented this using BigInteger. I have the methods as static as it is part of a utility class for my project, change them as you will.

explanations from here:

Stirling Numbers of the second kind

Binomial Coefficient

Rounding is carried out to remove inaccuracies from limitations of variables.

note: BigInteger should only be used if necessary. I am having to calculate the number of combinations possible in arrays of possible maximum long possible, hence I believe BigInteger is required for accuracies in my calculations. If you do not need this accuracy, switch to long.

``````/**
* calculates the sterling number of {n k}
*
* @param n
* @param k
* @return
*/
public static BigDecimal SterlingNumber(int n, int k) {
//return 1 or 0 for special cases
if(n == k){
return BigDecimal.ONE;
} else if(k == 0){
return BigDecimal.ZERO;
}
//calculate first coefficient
BigDecimal bdCoefficient = BigDecimal.ONE.divide(new BigDecimal(UtilityMath.factorial(k)), MathContext.DECIMAL64);

//define summation
BigInteger summation = BigInteger.ZERO;
for (int i = 0; i <= k; i++) {
//combination amount = binomial coefficient
BigInteger biCombinationAmount = UtilityMath.getCombinationAmount(k, i, false, false);
//biN = i^n
BigInteger biN = BigInteger.valueOf(i).pow(n);

//plus this calculation onto previous calculation. 1/k! * E(-1^(k-j) * (k, j) j^n)
}

return bdCoefficient.multiply(new BigDecimal(summation)).setScale(0, RoundingMode.UP);
}

/**
* get combinations amount where repetition(1:1) is not allowed; and Order
* does not matter (both 1:2 and 2:1 are the same). Otherwise known as
* Bionomial coefficient [1] .
*
* @param iPossibleObservations number of possible observations.
* @param iPatternLength length of each pattern (number of outcomes we are
* selecting. According to [1], if patternLength is 0 or the same as
* iPossibleObservations, this method will return 1
* @return the combination amount where repetition is not allowed and order
* is not taken into consideration.
* @see [1]http://en.wikipedia.org/wiki/Binomial_coefficient
*/
public static BigInteger getCombinationAmountNoRepNoOrder(int iPossibleObservations, int iPatternLength) {
if (iPatternLength == 0 || iPatternLength == iPossibleObservations) {
return BigInteger.ONE;
}

BigInteger biNumOfCombinations;

BigInteger biPossibleObservationsFactorial = factorial(iPossibleObservations);
BigInteger biPatternLengthFactorial = factorial(iPatternLength);

BigInteger biLastFactorial = factorial(iPossibleObservations - iPatternLength);

biNumOfCombinations = biPossibleObservationsFactorial.divide(biPatternLengthFactorial.multiply(biLastFactorial));

return biNumOfCombinations;
}
``````

From this main

``````public static void main(String[] args) {
System.out.print("\t" + " ");
for (int i = 0; i <= 10; i++) {
System.out.print("\t" + i);
}
System.out.print("\n");
for (int i = 0; i <= 10; i++) {
System.out.print("\t" + i);
for (int j = 0; j <= 10; j++) {
int n = i;
int k = j;
if (k > i) {
System.out.print("\t0");
continue;
}
BigDecimal biSterling = UtilityMath.SterlingNumber(n, k);
System.out.print("\t" + biSterling.toPlainString());
}
System.out.print("\n");
}
}
``````

I have output:

``````         0     1     2     3     4     5     6     7     8     9     10

0        1     0     0     0     0     0     0     0     0     0     0
1        0     1     0     0     0     0     0     0     0     0     0
2        0     1     1     0     0     0     0     0     0     0     0
3        0     1     3     1     0     0     0     0     0     0     0
4        0     1     7     7     1     0     0     0     0     0     0
5        0     1     5     26    11    1     0     0     0     0     0
6        0     1     31    91    66    15    1     0     0     0     0
7        0     1     63    302   351   140   22    1     0     0     0
8        0     1     127   967   1702  1050  267   28    1     0     0
9        0     1     255   3026  7771  6951  2647  462   36    1     0
10       0     1     511   9331  34106 42525 22828 5880  750   451   1
``````
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