Generate all unique substrings for given string

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)

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@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

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.

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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).

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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.

Algorithms

Really Good White Paper from MS

In depth PowerPoint

Blog on string perms

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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]) {
//System.out.println(Comb[j]);
for (int k = j + 1; k < start + p; ++k) {
if (Comb[j].equals(Comb[k])) {
counter--;
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));
}
}
System.out.println(hs.size());
long endTime = System.currentTimeMillis();
System.out.println("It took " + (endTime - startTime) + " milliseconds");
}
}
``````

Third Solution:-

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

public class LCPsolnFroDistinctSubString {

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

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

Arrays.sort(arrayString);
for (int i = 0; i < length; ++i)
System.out.println(arrayString[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)))) {
break;
}
}
num_substring += arrayString[i + 1].length() - j;
}
System.out.println("unique substrings = " + num_substring);
}

}
``````
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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.

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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.

Example:

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:

``````#include<stdio.h>

void print(char arr[], int start, int end)
{
int i;
for(i=start;i<=end;i++)
{
printf("%c",arr[i]);
}
printf("\n");
}

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

for(pass=0;pass<n;pass++)
{
start = 0;
end = start+pass;
for(j=no_of_strings;j>=0;j--)
{
print(arr,start, end);
start++;
end = start+pass;
}
no_of_strings--;
}

}

int main()
{
char str[] = "abcd";
substrings(str,4);
return 0;
}
``````
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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:])

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

for s21 in s2:
substrs.append(s21)

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

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Your programs are not giving unique sbstrins.

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

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