You can't. A Java array can have *at most* `2^31 - 1`

elements because the `size`

of an array has to fit in a signed 32-bit integer.

This applies whether you run on a 32 bit or 64 bit JVM.

I suspect that you are missing something in your homework. Is the requirement to be able to find all primes less than `2^32`

or something? If that is the case, they expect you to treat each `int`

of the `int[]`

as an array of 32 bits. And you need an array of only `2^25`

ints to do that ... if my arithmetic is right.

A `BitSet`

is another good alternative.

A `LinkedList<Integer>`

is a poor alternative. It uses roughly 8 times the memory that an array of the same size would, and the performance of `get(int)`

is going to be horribly slow for a long list ... assuming that you use it in the obvious fashion.

If you want something that can efficiently use as much memory as you can configure your JVM to use, then you should use an `int[][]`

i.e. an array of arrays of integers, with the `int[]`

instances being as large as you can make them.

I need to find Factor numbers from 2 to 2^63-1 using Sieve and sieve must have information that P[n]= is smallest prime with divide n. I know that with sieve i can Factorise number to 2^52. But how do that exercises with holding on to the content.

I'm not really sure I understand you. To factorize a number in the region of 2^64, you only need prime numbers up to 2^32 ... not 2^52. (The square root of 2^64 is 2^32 and a non-prime number must have a prime factor that is less than or equal to its square root.)

It sounds like you are trying to sieve more numbers than you need to.