7

what will be the best way to find a prime number so that the time complexity is much reduced.

7
  • 5
    Are you looking for prime numbers, or are you looking to test if a number you have is prime?
    – fbrereto
    Sep 15, 2009 at 18:10
  • 28
    "2". Now you're done for all time. Sep 15, 2009 at 18:11
  • 5
    Unless, you had some, you know, "requirements" or "specifications". Sep 15, 2009 at 18:12
  • 4
    there are approximately 1000 duplicates of your question along with an answer at SO, and millions more to find via google
    – DaClown
    Sep 15, 2009 at 18:28
  • 1
    Build a list of primes first. Then you can use this list for future references. Sep 15, 2009 at 19:11

9 Answers 9

45

When it comes to finding prime numbers, the Sieve of Eratosthenes and the Sieve of Atkin are two possible solutions. The Sieve of Eratosthenes has a complexity of O((n log n)(log log n)). The Sieve of Atkin has a complexity of O(N / log log n).

If you have a number and you want to find out if it's prime, that is called performing a primality test. The naive approach is to check all numbers m from 2 to sqrt(n) and verify that n % m is not 0. If you want to expand this slightly, you can throw out all even numbers (except 2). There are also some other enhancements to this naive approach that might improve performance, along with other, more advanced techniques.

6
  • 5
    +1, I've never heard of sieve of Atkins before. Thanks.
    – avakar
    Sep 15, 2009 at 18:16
  • 2
    Throw out the even number apart from 2... Sep 15, 2009 at 21:11
  • Jonathan - Thanks for pointing that out. I edited the post to reflect that. Sep 15, 2009 at 21:51
  • @ThomasOwens What is reason for checking from 2 to sqrt(n) in the naive approach ?
    – Geek
    Aug 14, 2012 at 4:55
  • 1
    The usually implemented basic versions of the algorithms are at asymptotic computation complexities of O(n log log n) and O(n) for the Sieve of Eratosthenes and the Sieve of Atkin, respectively. The SoE figure used in this answer doesn't apply to the same algorithm but rather to some sort of incremental algorithm using perhaps a Priority Queue. The SoA figure is often quoted for an esoteric theoretical modification of the basic SoA algorithm that I don't believe has ever been implemented, even by its authors (Their reference primegen SoA implementation has a theoretical O(n) performance). Apr 3, 2015 at 6:20
17

Use sieve of Eratosthenes is if you want to enumerate primes. If you want to generate a large prime, generate a random odd number and check for primality.

4
  • Wikipedia points to the Sieve of Atkin as being more efficient than the Sieve of Eratosthenes... Sep 15, 2009 at 18:14
  • Thomas, I've removed the claim of optimality. Thanks.
    – avakar
    Sep 15, 2009 at 18:17
  • +1. The Sieve of Eratosthenes is supposed to be fairly easy to implement, although I've never done so...perhaps I will, just to see. It might not be the best performer, but from what I can tell, it's usually good enough. Sep 15, 2009 at 18:23
  • 1
    @ThomasOwens, the WP article indicates that the Sieve of Atkin is more efficient based on asymptotic computation complexity of O(n log log n) for the Sieve of Eratosthenes and O(n) for the SoA. In fact, the new edited articles show that although the basic SoA uses a constant about 0.258717... times the range operations, for many ranges up to extremely high practical limits, a maximally wheel factorized SoE actually has less operations and the operations are simpler. Thus, a maximally wheel factorized and optimized SoE for equivalent complexity as the SoA is likely never slower than SoA. Apr 3, 2015 at 6:12
13

If it's below a certain range, best way would be to look it up in a precomputed list. There's plenty of them, up to very high numbers.

Example, all the primes up to 10,000,000,000 at http://www.prime-numbers.org/

10

Inspired by xkcd:

int findPrimeNumber() {
    return 2; // guaranteed to be prime
}
6
  • 3
    If you're going to post a purely humorous answer to a serious question, at least make it community wiki. Sep 15, 2009 at 18:29
  • 2
    I would come back with the smart-alecky response that this IS a serious answer... but really I just didn't know you could make answers community wiki (and that I honestly did not expect any upvotes for such a ridiculous answer).
    – Dan Tao
    Sep 15, 2009 at 18:33
  • 1
    ahh crap you beat me to it. lol
    – Neil N
    Sep 15, 2009 at 18:49
  • 3
    To be honest, it does satisfy the OP's request. However, my finely honed sense of telepathy, gained by trying to get requirements out of users without violating the Hague and Geneva Conventions, suggests that this isn't all the OP wants. Sep 15, 2009 at 18:51
  • huh, would you look at that, you can make answers CW now! How long have I been blind to that feature?
    – Matt
    Sep 15, 2009 at 20:06
3

If you want to generate primes from 1 to whatever, then the fastest way is probably a wheeled Sieve as implemented here, which can typically test more than 3,000,000 candidate primes a second on an average laptop (and that's using an unoptimized language like VB.net), and factor the non-primes to boot. In c++ it could be easily 5 to 20 times faster.

6
  • Although I'm not a fan of VB.NET, the "5-20" times faster seems a little over the top. But... +1 for the link Sep 15, 2009 at 18:37
  • Granted it's hard to say: but my understanding is that VB.net does no loop, etc. code-type optimizations and this program/algorithm is exactly the kind of algorithm can go gangbusters on. OTOH, if it were making heavy use of non-replaceable .NET calls, then the difference would be a lot less. Sep 15, 2009 at 18:40
  • (wish I was more proficient in VC++, I'd just re-code it and see what the difference was). Sep 15, 2009 at 18:43
  • OTOH .NET uses jit which for a repetetive task like this should be able to optimize quite a bit. Sep 15, 2009 at 19:16
  • 1
    RBarryYoung, see "Is Managed Code Slower Than Unmanaged Code?" grimes.demon.co.uk/dotnet/man_unman.htm Dec 5, 2009 at 4:23
1

Although there are more efficient algorithms, the Miller-Rabin primality test is one of the simplest tests to implement.

1

There are two different questions:

1) How to find if a number is a prime number? If you discover an efficient algorithm for this one, you will be famous for the next 2000 years ;)

2) How to find the prime numbers up to a limit N?

probably this is what you are asking about. Sieve of Atkin is the most efficient one If your range or limit N is really big number. In reasonable ranges, you could implement an optimized variation of Sieve of Eratosthenes. I found these two sites to be more than useful:

EDIT: @avakar

While I am more than beginner on the subject, I don't think AKS is the waited algorithm! From the same source:

However, some composite numbers also satisfy the equivalence. The proof of correctness for AKS consists of showing that there exists a suitably small r and suitably small set of integers A such that if the equivalence holds for all such a in A then n must be prime.

6
  • There is an efficient (as in polynomial) algorithm: en.wikipedia.org/wiki/AKS_primality_test
    – avakar
    Sep 15, 2009 at 19:08
  • -1: There already are extremely efficient algorithms for this. Sub-linear, for serial tests. Sep 16, 2009 at 2:06
  • What is described in the "Black Key Sieve" is just a primitive version of a wheeled sieve. Sep 16, 2009 at 2:09
  • (took the -1 back, considering there is some explanation of the differences) Sep 16, 2009 at 2:10
  • 1
    The Sieve of Atkin is not the best algorithm for finding a sequence of primes for a very big range - there is no practical proof it is: 1) It can be shown as per the new WP Sieve of Eratosthenes article that a maximally wheel factorized SoE has less operations than the SoA for any practical range using a "one huge memory array" model, and 2) Atkin and Bernstein's reference "primegen" implementation of the SoA gets very slow for large ranges as compared to a maximally wheel factorized (and optimized) SoE primesieve due to inefficiencies in "prime squares free" as spans exceed buffer range.. Apr 3, 2015 at 6:31
0

Take a look at existing libraries e.g. OpenSSL and GNU MP.

-2

I found a way.But may its lengthy, but its perfect ..no flaws in it.

package javaapplication4;
import java.io.*;
import java.util.*;

public class Main
{ 
    static Vector vprime = new Vector();
    static Vector vnotprime = new Vector();
    static Vector newVect = new Vector(new LinkedHashSet());
    static TreeSet<Integer> st = new TreeSet<Integer>();
    static int n = 0;
    static int starr[];    

    void prime()
    {
        Scanner sc = new Scanner(System.in);
        System.out.println("Enter number to begin");
        int beg = sc.nextInt();
        System.out.println("Enter number to end");
        int end = sc.nextInt();
        try
        {
            for (int i = beg; i <= end; i++)
            {
                if (i == 1)
                {
                    vnotprime.add(i);
                    st.add(i);
                }
                if (i == 2)
                {
                    vprime.add(i);
                }
                if (i%2 != 0 && i%(Math.sqrt(i)) != 0)
                {
                    vprime.add(i);
                }
                if (i%2 == 0 && i != 2)
                {
                    vnotprime.add(i);
                    st.add(i);
                }
                if (i%(Math.sqrt(i)) == 0)
                {
                    vnotprime.add(i);
                    st.add(i);   
                }
                /*if (i%(Math.sqrt(i)) == 0 && i != 1)
                {
                    vnotprime.add(i);
                }*/
            }
        }
        catch(Exception ex)
        {
            System.out.println("Enter proper value");
        }   
    }

    void showprime()
    {
        System.out.println("Prime Numbers are");
        Iterator it = vprime.iterator();
        while (it.hasNext())
        {
            System.out.println(it.next());
            for (int i : st)
            {    
            }
        }
    }

    void shownonprime()
    {
        System.out.println("these are non-Prime Numbers are");
        Iterator it = st.iterator();
        int len = st.size(), k = 0;
        starr = new int[len];
        while (it.hasNext())
        {
            System.out.println(it.next());
        }
        for (int i:st)
        {
            starr[k++] = i;
        }
    }

    public static void main(String[] args) throws IOException, Exception
    {
        Main m = new Main();
        m.prime();
        m.showprime();
        m.shownonprime();
        for(int i = 0; i < starr.length; i++)
        {
            System.out.println("I got it " + starr[i]);
        }            
    }
}
1
  • 2
    Your code is unreadable, please format it better!
    – Kleist
    Nov 28, 2010 at 11:54

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