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I want to generate all possible strings of length n with alphabets a,b, and c .. I am getting this error java.lang.OutOfMemoryError: Java heap space. my heap size is 512m . Can you suggst me alternatives for this ..

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Is this homework? –  home Dec 20 '11 at 17:42
Is this for hacking? –  Marcelo Dec 20 '11 at 17:43
What is the length you try to find all permutations of? –  Martijn Courteaux Dec 20 '11 at 17:44
max length is 30 –  Dinesh Kukreja Dec 20 '11 at 17:48
Why are you using BigInteger everywhere? How big do your numbers get? –  Hot Licks Dec 20 '11 at 17:48

4 Answers 4

up vote 1 down vote accepted

Counting Strings not containing substring "ABC" can be solved with dynamic programming.

First, lets name the number of all strings of length n as S(n). Note that S(n) is easy to compute. S(n) = pow(size_of_the_alphabet,n)

Let's name the number all strings containing "ABC" of length n as A(n) and let's name the number of all strings having first ocurrence of "ABC" on k-th position as A(n,k)

Now note that: A(n,k) = (S(k-1) - A(k-1)) * S(n - k - 3) (since k is the first position where "ABC" occurs, each of these strings has a substring without "ABC" before this position and any substring after the first "ABC").

Note that A(n) = sum A(n,k) for k in [0..n-3]

So now we can calculate A(n) computing each value of A(n) starting from 0.

Base case is simple, as A(n) = 0 for n = 0,1,2

A(3) = (S(0) - A(0))*S(0) = 1 (namely "ABC")


Once you have A(n) you can get the number you're looking for using the formula S(n) - A(n).

Pseudojava pseudocode:

public class Counter {

    public int count(int aSize, int n) {
        long[] a = new long[n+1]; // n + 1 elements since a[i] contains # of strings containing "ABC"
        a[0] = 0;
        a[1] = 0;
        a[2] = 0;

        for (int i = 3; i <= n; ++i){
            long sum = 0;
            for (int k = 0; k <= i-3; ++k) {
                sum += (pow(aSize, k) - a[k]) * pow(aSize, i - k - 3);
            a[i] = sum;
        return a[n];


    public static void main(String... args) {
        int aSize = 3; //size of the alphabet
        int n = 30; // length of the strings

        //final result
        long result = pow(aSize, n) - count(aSize, n);


Running time is O(n^2), assuming pow is O(1). If it's not then you can save some time precalculating S(i).

Space requirement is O(n).

Note that this computes number of all strings with length == n. If you want length <= n then the modification is obvious (you just sum all elements in a).

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Thanks a lot. I wasnt able to figure out how to use dynamic programming . thanks for the help . –  Dinesh Kukreja Dec 21 '11 at 7:07
@DineshKukreja no problem. just watch out for overflows. it probably should be long instead of int (or even BigDecimal). I'll edit the answer. –  soulcheck Dec 21 '11 at 8:43

The number of strings you are currently computing is

3^30 =                205 891 132 094 649

Which is quite a lot...

Knowing that each String contains three bytes:

3^30 * 3 =            617 673 396 283 947

Plus the 32-bit or 64-bit pointers of the two dimensional array.

3^30 * (3 + 4) =    1 441 237 924 662 540  // 32-bit Java VM
3^30 * (3 + 8) =    2 264 802 453 041 140  // 64-bit Java VM

Which is

2 109 261 GB = 2059 TB     // 64-bit JVM

I guess that is the problem.

With your limit of 500 MB you can solve this equation:

  3^x * (3 + 8) = 524 288 000
            3^x = 47662545
              x = log(47662545) / log(3)
              x = 7 / 0.477121254719662
              x = 14.67

So, if I forgot nothing, your tests should work for n <= 14. Of course, it won't work until you delete this code:

List<String> result = new ArrayList<String>();
for (char[] permutation : table) {
    result.add(new String(permutation));

This code duplicates all the data! Which means that you need twice the amount of memory. Try to print it immediately.

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So, -Xmx2109261G on the command line should fix it? –  Pedantic Dec 20 '11 at 21:56
@Chris: Exactly. (I like this comment :D) –  Martijn Courteaux Dec 20 '11 at 21:58
@MartijnCourteaux this proves how dumb u are ? –  Dinesh Kukreja Dec 22 '11 at 13:28
@DineshKukreja: I guess your comment proves how dump you are. Never though this might be humour? Why do you think Chris his comment got 3 upvotes? –  Martijn Courteaux Dec 22 '11 at 18:34

I noted in your comment you have a different question. You want to find all the strings of length 30 with a-z which don't contains a-c. This is the count of all the string of length 30 which are d-z. The count is (26-3)^30.

System.out.printf("%,d%n", BigInteger.valueOf(26-3).pow(30));



Instead of remembering every string, you can encode every possible String as a number. In your case you can use a long.

public static void main(String... args) {
    String letters = "abc";
    int len = 30;
    long combinations = (long) Math.pow(letters.length(), len);
    System.out.printf("There are %,d strings%n", combinations);
    for (long i = 0; i < 10; i++)
        System.out.println(fromLong(i, letters, len));
    System.out.println("... some numbers skipped ...");
    for (long i = combinations-10; i < combinations; i++)
        System.out.println(fromLong(i, letters, len));

public static String fromLong(long n, String letters, int len) {
    StringBuilder sb = new StringBuilder();
    for (int i = 0; i < len; i++) {
        sb.append(letters.charAt((int) (n % letters.length())));
        n /= letters.length();
    return sb.reverse().toString();


There are 205,891,132,094,649 strings
... some numbers skipped ...

This can print every possible String from 0 to 3^30-1. You don't need to store all the encoded values because you know all the possible values are in a continuous range.

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Wow, does it work? main(String... args). I didn't know we can use varargs for the main method. Nice. However, +1. –  Martijn Courteaux Dec 20 '11 at 19:21
It even works in C++ from what I remember. ;) –  Peter Lawrey Dec 20 '11 at 19:23

Are you trying to compute the strings or count the strings?

EDIT: I see from the later comment that you know how many Strings you're talking about: If you are only counting, that's a standard permutation closed form: 26^n = 26 raised to the nth power (assuming that you're only using lower case alphabet from 'a' to 'z').

If you are truly trying to enumerate every string, I strongly recommend that you ensure that you do not retain a reference to each String. If you end up with a dangling reference to each of those Strings, you're going to run out of memory after about six characters.

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