Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

Given a string s, what is the fastest method to generate a set of all its unique substrings?

Example: for str = "aba" we would get substrs={"a", "b", "ab", "ba", "aba"}.

The naive algorithm would be to traverse the entire string generating substrings in length 1..n in each iteration, yielding an O(n^2) upper bound.

Is a better bound possible?

(this is technically homework, so pointers-only are welcome as well)

share|improve this question
@Yuval..Did you get the efficient algo? Please share it if you have. TIA. –  sans481 Jan 2 '12 at 15:21
I don't really remember what happened. But most likely I ended up implementing some sort of suffix tree. Don't have the code anymore, sorry. –  Yuval Adam Jan 2 '12 at 18:32

8 Answers 8

up vote 20 down vote accepted

As other posters have said, there are potentially O(n^2) substrings for a given string, so printing them out cannot be done faster than that. However there exists an efficient representation of the set that can be constructed in linear time: the suffix tree.

share|improve this answer
This is O(n+L) where L is number of unique substrings, I believe. So it is optimal. –  Aryabhatta Apr 1 '10 at 20:48

There is no way to do this faster than O(n2) because there are a total of O(n2) substrings in a string, so if you have to generate them all, their number will be n(n + 1) / 2 in the worst case, hence the upper lower bound of O(n2) Ω(n2).

share|improve this answer
We could hope for an output-sensitive algorithm that ran in O(# of unique strings)... –  user287792 Apr 1 '10 at 15:24
You mean a lower bound of Ω(n^2). :) –  kennytm Apr 1 '10 at 15:33
Suffix trees do it in O(n + L) time, where L is the number of unique substrings. For strings like 'aaaaa....aaaaa', L = O(n). So statement about Omega(n^2) is incorrect. –  Aryabhatta Apr 1 '10 at 20:47
@Moron - I'm curious how suffix trees can solve this in O(n + L). Mind posting an algorithm? –  IVlad Apr 1 '10 at 21:30
@IVlad: Just walk the whole suffix tree and print the paths/sub-paths as you go along. Wouldn't that be O(L)? Of course this assumes that printing a string is O(1) (for instance, we print only the begin and end indices). If we consider printing string x to take O(|x|) time, then yes, it is Omega(n^2). That you have considered that is not clear from your post, and I would guess your post actually implies an Omega(n^3) lower bound for that case. –  Aryabhatta Apr 2 '10 at 2:05

For big oh ... Best you could do would be O(n^2)

No need to reinvent the wheel, its not based on a strings, but on a sets, so you will have to take the concepts and apply them to your own situation.


Really Good White Paper from MS

In depth PowerPoint

Blog on string perms

share|improve this answer
Err, what? O(a^n)? What is a and where did you pull that result from? –  IVlad Apr 1 '10 at 13:03
sorry that notation defines growth over time... i switched back –  Nix Apr 1 '10 at 13:07
Using LCP(longest common suffix) the best time could be pulled down to O(NLog N) –  Sumit Kumar Saha Aug 27 '14 at 14:40

First one is brute force which has complexity O(N^3) which could be brought down to O(N^2 log(N)) Second One using HashSet which has Complexity O(N^2) Third One using LCP by initially finding all the suffix of a given string which has the worst case O(N^2) and best case O(N Log(N)).

First Solution:-

import java.util.Scanner;

public class DistinctSubString {
  public static void main(String[] args) {
    Scanner in = new Scanner(System.in);
    System.out.print("Enter The string");
    String s = in.nextLine();
    long startTime = System.currentTimeMillis();
    int L = s.length();
    int N = L * (L + 1) / 2;
    String[] Comb = new String[N];
    for (int i = 0, p = 0; i < L; ++i) {
      for (int j = 0; j < (L - i); ++j) {
        Comb[p++] = s.substring(j, i + j + 1);
     * for(int j=0;j<N;++j) { System.out.println(Comb[j]); }
    boolean[] val = new boolean[N];
    for (int i = 0; i < N; ++i)
      val[i] = true;
    int counter = N;
    int p = 0, start = 0;
    for (int i = 0, j; i < L; ++i) {
      p = L - i;
      for (j = start; j < (start + p); ++j) {
        if (val[j]) {
          for (int k = j + 1; k < start + p; ++k) {
            if (Comb[j].equals(Comb[k])) {
              val[k] = false;


      start = j;
    System.out.println("Substrings are " + N
        + " of which unique substrings are " + counter);
    long endTime = System.currentTimeMillis();
    System.out.println("It took " + (endTime - startTime) + " milliseconds");

Second Solution:-

import java.util.*;

public class DistictSubstrings_usingHashTable {

  public static void main(String args[]) {
    // create a hash set

    Scanner in = new Scanner(System.in);
    System.out.print("Enter The string");
    String s = in.nextLine();
    int L = s.length();
    long startTime = System.currentTimeMillis();
    Set<String> hs = new HashSet<String>();
    // add elements to the hash set
    for (int i = 0; i < L; ++i) {
      for (int j = 0; j < (L - i); ++j) {
        hs.add(s.substring(j, i + j + 1));
    long endTime = System.currentTimeMillis();
    System.out.println("It took " + (endTime - startTime) + " milliseconds");

Third Solution:-

import java.io.BufferedReader;
import java.io.IOException;
import java.io.InputStreamReader;
import java.util.Arrays;

public class LCPsolnFroDistinctSubString {

  public static void main(String[] args) throws IOException {

    BufferedReader br = new BufferedReader(new InputStreamReader(System.in));
    System.out.println("Enter Desired String ");
    String string = br.readLine();
    int length = string.length();
    String[] arrayString = new String[length];
    for (int i = 0; i < length; ++i) {
      arrayString[i] = string.substring(length - 1 - i, length);

    for (int i = 0; i < length; ++i)

    long num_substring = arrayString[0].length();

    for (int i = 0; i < length - 1; ++i) {
      int j = 0;
      for (; j < arrayString[i].length(); ++j) {
        if (!((arrayString[i].substring(0, j + 1)).equals((arrayString)[i + 1]
            .substring(0, j + 1)))) {
      num_substring += arrayString[i + 1].length() - j;
    System.out.println("unique substrings = " + num_substring);

share|improve this answer
Good work :) Thank u... –  Vishal Santharam Sep 7 '13 at 3:46
How is the best case in third solution is O(nlogn) –  Walt Jan 11 at 18:09
Okay. You've counted all unique substrings. Great. But how would you "Generate all unique substrings for given string" with a suffix array/longest common prefix array? –  keyboardSmasher Jul 10 at 6:55

well, since there is potentially n*(n+1)/2 different substrings (+1 for the empty substring), I doubt you can be better than O(n*2) (worst case). the easiest thing is to generate them and use some nice O(1) lookup table (such as a hashmap) for excluding duplicates right when you find them.

share|improve this answer
It's n(n+1)/2. "abc" has 3*4/2 = 6 substrings ("a", "b", "c", "ab", "bc", "abc") not 3*2/2 = 3 substrings. –  IVlad Apr 1 '10 at 12:53
Note that hash tables use hashcodes and equals which are O(n) for the length of the string. –  fgb Apr 1 '10 at 12:59
oh, yes, sorry ... will fix that ... :) –  back2dos Apr 1 '10 at 12:59
@fgb using a rolling hash for example you can get O(1) lookup. –  IVlad Apr 1 '10 at 13:03

It can only be done in o(n^2) time as total number of unique substrings of a string would be n(n+1)/2.


string s = "abcd"

pass 0: (all the strings are of length 1)

a, b, c, d = 4 strings

pass 1: (all the strings are of length 2)

ab, bc, cd = 3 strings

pass 2: (all the strings are of length 3)

abc, bcd = 2 strings

pass 3: (all the strings are of length 4)

abcd = 1 strings

Using this analogy, we can write solution with o(n^2) time complexity and constant space complexity.

The source code is as below:


void print(char arr[], int start, int end)
    int i;

void substrings(char arr[], int n)
    int pass,j,start,end;
    int no_of_strings = n-1;

        start = 0;
        end = start+pass;
            print(arr,start, end);
            end = start+pass;


int main()
    char str[] = "abcd";
    return 0;
share|improve this answer

Here is my code in Python. It generates all possible substrings of any given string.

def find_substring(str_in):
    substrs = []
    if len(str_in) <= 1:
        return [str_in]

    s1 = find_substring(str_in[:1])
    s2 = find_substring(str_in[1:])

    for s11 in s1:
        for s21 in s2:            
            substrs.append("%s%s" %(s11, s21))

    for s21 in s2:

    return set(substrs)

If you pass str_ = "abcdef" to the function, it generates the following results:

a, ab, abc, abcd, abcde, abcdef, abcdf, abce, abcef, abcf, abd, abde, abdef, abdf, abe, abef, abf, ac, acd, acde, acdef, acdf, ace, acef, acf, ad, ade, adef, adf, ae, aef, af, b, bc, bcd, bcde, bcdef, bcdf, bce, bcef, bcf, bd, bde, bdef, bdf, be, bef, bf, c, cd, cde, cdef, cdf, ce, cef, cf, d, de, def, df, e, ef, f

share|improve this answer

Your programs are not giving unique sbstrins.

Please test with input abab and output should be aba,ba,bab,abab.

share|improve this answer

Your Answer


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.