Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have written a function to work on prime numbers using the sieve of Eratosthenes method. The function works fine using integers but I am now trying to implement support for long so that I can work with large numbers.

I cannot seem to get the function working with longs and can't see an obvious reason why.

Errors refer to the typical precision warning from typecasting etc but I cannot work out what's causing them:

   ./com/wkilgour/lang/Maths.java:21: error: possible loss of precision
        boolean[] isPrime = new boolean[n + 1];
                                          ^
  required: int
  found:    long
./com/wkilgour/lang/Maths.java:24: error: possible loss of precision
            isPrime[i] = true;
                    ^
  required: int
  found:    long
./com/wkilgour/lang/Maths.java:27: error: possible loss of precision
            if (isPrime[i])
                        ^
  required: int
  found:    long
./com/wkilgour/lang/Maths.java:29: error: possible loss of precision
                    isPrime[i * j] = false;
                              ^
  required: int
  found:    long
4 errors

Here is the function:

public static boolean[] primeSieve(long n)
{
    boolean[] isPrime = new boolean[n + 1];

    for (long i = 2L; i <= n; i++)
        isPrime[i] = true;

    for (long i = 2L; i*i <= n; i++)
        if (isPrime[i])
            for (long j = i; i*j <= n; j++)
                isPrime[i * j] = false;

    return isPrime;
}

Any help would be greatly appreciated!

share|improve this question
1  
Isn't your error message a bit longer? –  Eel Lee Nov 4 '13 at 0:02
    
Yes there's a few errors relating to the precision. I've added the full error now –  Wesk Nov 4 '13 at 0:04
    
Have you thought about how much memory you'll need, to know the primeness of numbers up to long values? –  David Wallace Nov 4 '13 at 0:09
    
Use a segmented sieve, where you split the sieve into smaller parts. stackoverflow.com/questions/10249378/… –  starblue Nov 4 '13 at 7:13

2 Answers 2

up vote 2 down vote accepted

Array size is maximum 2^31-1, in theory, which is an integer. Your n+1 is a long. So that doesn't match. You will need to cast the n+1 to an integer:

boolean[] isPrime = new boolean[(int) (n + 1)];

Now, you know the theory, you should realize that implementing a sieve for longs like this isn't going to work, since you will not have enough memory and Java simply doesn't allow you to make arrays of sizes bigger than 2^31-1. So, just change everything in your method to int. This would look like this:

public static boolean[] primeSieve(int n)
{
    boolean[] isPrime = new boolean[n + 1];

    for (int i = 2; i <= n; i++)
        isPrime[i] = true;

    for (int i = 2; i*i <= n; i++)
        if (isPrime[i])
            for (int j = i; i*j <= n; j++)
                isPrime[i * j] = false;

    return isPrime;
}

And to optimize the memory usage for big sieves, I'd recommend using a java.util.BitSet:

public static BitSet primeSieve(int n)
{
    BitSet isPrime = new BitSet(n+1);

    for (int i = 2; i <= n; i++)
        isPrime.set(i);

    for (int i = 2; i*i <= n; i++)
        if (isPrime.get(i))
            for (int j = i; i*j <= n; j++)
                isPrime.set(i * j, false);

    return isPrime;
}
share|improve this answer
    
This is the code that I had originally which worked perfectly. I'm trying to use much larger numbers than integers though which is why I wanted to add long support –  Wesk Nov 4 '13 at 0:09
    
Your best bet is to use BitSet, but this still won't allow you to implement the algo for longs, because even BitSet accepts only 2^31-1 bits. Creating a BitSet with 2^31-1 bits would use 2 GiB of ram. While doing the same with a boolean[] array, it would take 16 GiB of ram. –  Martijn Courteaux Nov 4 '13 at 0:11

I think the problem is simple: you should use an integer value for an array index (i.e. the values within square brackets).

public static boolean[] primeSieve(long n)
{
    boolean[] isPrime = new boolean[(int) (n + 1)];

    for (long i = 2L; i <= n; i++)
        isPrime[(int) i] = true;

    for (long i = 2L; i*i <= n; i++)
        if (isPrime[(int) i])
            for (long j = i; i*j <= n; j++)
                isPrime[(int) (i * j)] = false;

    return isPrime;
}
share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.