# Finding shortest repeating cycle in word?

I'm about to write a function which, would return me a shortest period of group of letters which would eventually create the given word.

For example word abkebabkebabkeb is created by repeated abkeb word. I would like to know, how efficiently analyze input word, to get the shortest period of characters creating input word.

• @Tony The Tiger, the result (shortest period) does not have to be a real word. May 16 '11 at 18:03

Here is a correct O(n) algorithm. The first for loop is the table building portion of KMP. There are various proofs that it always runs in linear time.

Since this question has 4 previous answers, none of which are O(n) and correct, I heavily tested this solution for both correctness and runtime.

``````def pattern(inputv):
if not inputv:
return inputv

nxt = *len(inputv)
for i in range(1, len(nxt)):
k = nxt[i - 1]
while True:
if inputv[i] == inputv[k]:
nxt[i] = k + 1
break
elif k == 0:
nxt[i] = 0
break
else:
k = nxt[k - 1]

smallPieceLen = len(inputv) - nxt[-1]
if len(inputv) % smallPieceLen != 0:
return inputv

return inputv[0:smallPieceLen]
``````
• So is this a solution you have come up with or is this a known algorithm? Nov 25 '15 at 23:53
• Well KMP is a known algorithm. This question was very similar to a homework problem I had, and this is the answer I came up with for the homework. The instructor's solution was a bit different, but also used KMP.
– Buge
Nov 27 '15 at 7:24
• Hi Buge, love your solution, and vote up. but confused by this line `smallPieceLen = len(inputv) - nxt[-1]`, and `nxt[-1]` means if the whole string does not match, what index we will be used to compare next. `smallPieceLen` represents the differences total length of string and `nxt[-1]`, how it could be represented as shortest repetitive string? Oct 27 '16 at 22:38
• @LinMa: (Buge wasn't active lately) `nxt[-1] means if the whole string does not match, what index we will be used to compare next` no (contorted grammar, btw.). It is the index to compare next when all of the pattern matched and you want to find its next occurrence in a longer text. `nxt[i] = p` means `pattern[i+1-p:i+1]` equals `pattern[0:p]` (& != for `p+1`). `nxt[-1]` is the index to compare next if the "first" mismatch was "at `len`+1". (In many a presentation/implementation of KMP, there is a special value of -1 at index 0, with the n values as above "shifted to an index higher by one".) Oct 28 '16 at 9:37
• @LinMa: (`both` are notified, anyway) Let me call `len(inputv)` len and `nxt[-1]` matchLen. If matchLen < smallPieceLen, the only chance for smallPieceLen to divide len is to be equal to it. If smallPieceLenmatchLen, `inputv[0:smallPieceLen]` equals `inputv[smallPieceLen:2*smallPieceLen]`, and `k` never got reset (again): inputv is made up of repetitions of `inputv[0:smallPieceLen]` - the divisibility check just ensures that it ends with a full repetition. Oct 31 '16 at 8:37

This is an example for PHP:

``````<?php
function getrepeatedstring(\$string) {
if (strlen(\$string)<2) return \$string;
for(\$i = 1; \$i<strlen(\$string); \$i++) {
if (substr(str_repeat(substr(\$string, 0, \$i),strlen(\$string)/\$i+1), 0, strlen(\$string))==\$string)
return substr(\$string, 0, \$i);
}
return \$string;
}
?>
``````
• This returns 'abkeb' which should be correct but I'm not sure in what way the OP is asking for 'kebab' rather than 'abkeb'. May 16 '11 at 18:12
• This is what I'm looking for. But it runs in O(n). Any ideas if this can be speeded up? May 16 '11 at 18:18
• @jack44: You can't know if you have the shortest cycle until you've examined the entire string. Unless you have other knowledge, like what the largest possible cycle might be. It might be that the last character in the string throws the whole cycle off, you don't know. May 16 '11 at 18:27
• I don't know PHP, but this looks like it's O(n^2).
– dfb
May 16 '11 at 18:29
• @Richard86 - String comparison is going to O(n), though, isn't it?
– dfb
May 16 '11 at 21:04

O(n) solution. Assumes that the entire string must be covered. The key observation is that we generate the pattern and test it, but if we find something along the way that doesn't match, we must include the entire string that we already tested, so we don't have to reobserve those characters.

``````def pattern(inputv):
pattern_end =0
for j in range(pattern_end+1,len(inputv)):

pattern_dex = j%(pattern_end+1)
if(inputv[pattern_dex] != inputv[j]):

pattern_end = j;
continue

if(j == len(inputv)-1):
print pattern_end
return inputv[0:pattern_end+1];
return inputv;
``````
• Is `for pattern_end in range(len(inputv)/2)` necessary? I don't think it is. May 16 '11 at 18:55
• @Ishtar - sorry I'm not following. Do you mean the look of the len()/2 part
– dfb
May 16 '11 at 18:56
• I mean, replacing that line with `pattern_end = 0`. May 16 '11 at 18:59
• I'm afraid the algorithm is incorrect. Please consider the input: "BCBDBCBCBDBC". The smallest repeating pattern is "BCBDBC", but the algorithm above will miss it. Also, I think it doesn't deal correctly with the case "HELLOHELL" (where it returns "HELLO" instead of the complete string). Feb 3 '13 at 11:03
• @Boris: The problem is finding the smallest sub-sequence of S such that K>=1 repetitions of it would result in S itself. The input "HELLOHELL" has no repeating subsequence with K>1, so "HELLOHELL" should be returned. Feb 10 '19 at 23:01

I believe there is a very elegant recursive solution. Many of the proposed solutions solve the extra complexity where the string ends with part of the pattern, like `abcabca`. But I do not think that is asked for.

My solution for the simple version of the problem in clojure:

`````` (defn find-shortest-repeating [pattern string]
(if (empty? (str/replace string pattern ""))
pattern
(find-shortest-repeating (str pattern (nth string (count pattern))) string)))

(find-shortest-repeating "" "abcabcabc") ;; "abc"
``````

But be aware that this will not find patterns that are uncomplete at the end.

I found a solution based on your post, that could take an incomplete pattern:

``````(defn find-shortest-repeating [pattern string]
(if (or (empty? (clojure.string/split string (re-pattern pattern)))
(empty? (second (clojure.string/split string (re-pattern pattern)))))
pattern
(find-shortest-repeating (str pattern (nth string (count pattern))) string)))
``````
• @ward `(defn find-pattern-string [string] (let [pattern "" working-str string] (reduce #(if (not (or (empty? (clojure.string/split string (re-pattern %1))) (empty? (second (clojure.string/split string (re-pattern %1)))))) (str %1 %2) %1) pattern working-str)))` Oct 12 '17 at 14:53

My Solution: The idea is to find a substring from the position zero such that it becomes equal to the adjacent substring of same length, when such a substring is found return the substring. Please note if no repeating substring is found I am printing the entire input String.

``````public static void repeatingSubstring(String input){
for(int i=0;i<input.length();i++){
if(i==input.length()-1){
System.out.println("There is no repetition "+input);
}
else if(input.length()%(i+1)==0){
int size = i+1;
if(input.substring(0, i+1).equals(input.substring(i+1, i+1+size))){
System.out.println("The subString which repeats itself is "+input.substring(0, i+1));
break;
}
}
}
}
``````
• I think this would fail for the string "ababcababc"
– J.R.
Jul 23 '20 at 0:46

This is a solution I came up with using the queue, it passed all the test cases of a similar problem in codeforces. Problem No is `745A`.

``````#include<bits/stdc++.h>
using namespace std;
typedef long long ll;

int main()
{
ios_base::sync_with_stdio(false);
cin.tie(NULL);

string s, s1, s2; cin >> s; queue<char> qu; qu.push(s); bool flag = true; int ind = -1;
s1 = s.substr(0, s.size() / 2);
s2 = s.substr(s.size() / 2);
if(s1 == s2)
{
for(int i=0; i<s1.size(); i++)
{
s += s1[i];
}
}
//cout << s1 << " " << s2 << " " << s << "\n";
for(int i=1; i<s.size(); i++)
{
if(qu.front() == s[i]) {qu.pop();}
qu.push(s[i]);
}
int cycle = qu.size();

/*queue<char> qu2 = qu; string str = "";
while(!qu2.empty())
{
cout << qu2.front() << " ";
str += qu2.front();
qu2.pop();
}*/

while(!qu.empty())
{
if(s[++ind] != qu.front()) {flag = false; break;}
qu.pop();
}
flag == true ? cout << cycle : cout << s.size();
return 0;
}

``````

Most easiest one in python:

``````def pattern(self, s):
ans=(s+s).find(s,1,-1)
return len(pat) if ans == -1 else ans
``````
• It will be helpful if you explain what you did Aug 27 '20 at 7:10

Simpler answer which I can come up in an interview is just a O(n^2) solution, which tries out all combinations of substring starting from 0.

``````int findSmallestUnit(string str){
for(int i=1;i<str.length();i++){
int j=0;
for(;j<str.length();j++){
if(str[j%i] != str[j]){
break;
}
}
if(j==str.length()) return str.substr(0,i);
}
return str;
}
``````

Now if someone is interested in O(n) solution to this problem in c++:

``````  int findSmallestUnit(string str){
vector<int> lps(str.length(),0);
int i=1;
int len=0;

while(i<str.length()){
if(str[i] == str[len]){
len++;
lps[i] = len;
i++;
}
else{
if(len == 0) i++;
else{
len = lps[len-1];
}
}
}
int n=str.length();
int x = lps[n-1];
if(n%(n-x) == 0){
return str.substr(0,n-x);
}
return str;
}
``````

# Regex solution:

Use the following regex replacement to find the shortest repeating substring, and only keeping that substring:

``````^(.+?)\1*\$
\$1
``````

Explanation:

``````^(.+?)\1*\$
^        \$   # Start and end, to match the entire input-string
(   )       # Capture group 1:
.+         #  One or more characters,
?        #  with a reluctant instead of greedy match†
\1*    # Followed by the first capture group repeated zero or more times

\$1           # Replace the entire input-string with the first capture group match,
# removing all other duplicated substrings
``````

Greedy vs reluctant would in this case mean: greedy = consumes as many characters as it can; reluctant = consumes as few characters as it can. Since we want the shortest repeating substring, we would want a reluctant match in our regex.

Example input: `"abkebabkebabkeb"`
Example output: `"abkeb"`

Try it online in Retina.

Here an example implementation in Java.

• @Socowi Very good point. It's a pretty old answer of mine, so I'm not sure why I added that delimiter back then. I've just modified it based on your suggestion, thanks. Sep 23 at 8:08
• @Socowi Thanks for the feedback! I've clarified this difference between a greedy vs reluctant match, and how the `?` will give our intended result. Sep 23 at 11:07

Super delayed answer, but I got the question in an interview, here was my answer (probably not the most optimal but it works for strange test cases as well).

``````private void run(String[] args) throws IOException {
File file = new File(args);
String line;
while ((line = buffer.readLine()) != null) {
ArrayList<String> subs = new ArrayList<>();
String t = line.trim();
String out = null;
for (int i = 0; i < t.length(); i++) {
if (t.substring(0, t.length() - (i + 1)).equals(t.substring(i + 1, t.length()))) {
subs.add(t.substring(0, t.length() - (i + 1)));
}
}
for (int j = subs.size() - 2; j >= 0; j--) {
String match = subs.get(j);
int mLength = match.length();
if (j != 0 && mLength <= t.length() / 2) {
if (t.substring(mLength, mLength * 2).equals(match)) {
out = match;
break;
}
} else {
out = match;
}
}
System.out.println(out);
}
}
``````

Testcases:

abcabcabcabc
bcbcbcbcbcbcbcbcbcbcbcbcbcbc
dddddddddddddddddddd
bcbdbcbcbdbc
hellohell

Code returns:

abc
bc
d
bcbdbc
hellohell

• Just looking at the first for loop this is O(n^2), because each .equals() can take n time.
– Buge
Nov 22 '15 at 19:58

Works in cases such as bcbdbcbcbdbc.

``````function smallestRepeatingString(sequence){
var currentRepeat = '';
var currentRepeatPos = 0;

for(var i=0, ii=sequence.length; i<ii; i++){
if(currentRepeat[currentRepeatPos] !== sequence[i]){
currentRepeatPos = 0;
// Add next character available to the repeat and reset i so we don't miss any matches inbetween
currentRepeat = currentRepeat + sequence.slice(currentRepeat.length, currentRepeat.length+1);
i = currentRepeat.length-1;
}else{
currentRepeatPos++;
}
if(currentRepeatPos === currentRepeat.length){
currentRepeatPos = 0;
}
}

// If repeat wasn't reset then we didn't find a full repeat at the end.
if(currentRepeatPos !== 0){ return sequence; }

return currentRepeat;
}
``````
• This is actually O(n^2). That is because you reset `i` to be smaller with `i = currentRepeat.length-1;`. So with a 10 character string ling 'aaaaaaaaab' it takes 46 iterations. With a 20 character string it takes 191 iterations.
– Buge
Nov 22 '15 at 20:22

I came up with a simple solution that works flawlessly even with very large strings.
PHP Implementation:

``````function get_srs(\$s){
\$hash = md5( \$s );
\$i = 0; \$p = '';

do {
\$p .= \$s[\$i++];
preg_match_all( "/{\$p}/", \$s, \$m );
} while ( ! hash_equals( \$hash, md5( implode( '', \$m ) ) ) );

return \$p;
}
``````
• Would be good if you gave some detail regarding why exactly this works. Providing more detail helps the entire community and helps to get more up votes. Sep 15 '16 at 20:48