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That was an interview question that I was unable to answer:

How to check that a string is a palindrome using regular expressions?

p.s. There is already a question "How to check if the given string is palindrome?" and it gives a lot of answers in different languages, but no answer that uses regular expressions.

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23 Answers 23

up vote 72 down vote accepted

The answer to this question is that "it is impossible". More specifically, the interviewer is wondering if you paid attention in your computational theory class.

In your computational theory class you learned about finite state machines. A finite state machine is composed of nodes and edges. Each edge is annotated with a letter from a finite alphabet. One or more nodes are special "accepting" nodes and one node is the "start" node. As each letter is read from a given word we traverse the given edge in the machine. If we end up in an accepting state then we say that the machine "accepts" that word.

A regular expression can always be translated into an equivalent finite state machine. That is, one that accepts and rejects the same words as the regular expression (in the real world, some regexp languages allow for arbitrary functions, these don't count).

It is impossible to build a finite state machine that accepts all palindromes. The proof relies on the facts that we can easily build a string that requires an arbitrarily large number of nodes, namely the string

a^x b a^x (eg., aba, aabaa, aaabaaa, aaaabaaaa, ....)

where a^x is a repeated x times. This requires at least x nodes because, after seeing the 'b' we have to count back x times to make sure it is a palindrome.

Finally, getting back to the original question, you could tell the interviewer that you can write a regular expression that accepts all palindromes that are smaller than some finite fixed length. If there is ever a real-world application that requires identifying palindromes then it will almost certainly not include arbitrarily long ones, thus this answer would show that you can differentiate theoretical impossibilities from real-world applications. Still, the actual regexp would be quite long, much longer than equivalent 4-line program (easy exercise for the reader: write a program that identifies palindromes).

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No. It can be in Ruby –  hqt Jun 1 '12 at 19:31
7  
@hqt Then whatever you are using in Ruby is not strictly a Regex. –  Steve Moser Oct 22 '12 at 17:36
    
@SteveMoser In Ruby 1.9.x, regular expressions are no longer Regular (in the Automata Theory sense) and thus things like checking for palindromes is possible. However, for the intents and purposes, palindromes cannot be checked with a Regular regex (make sense?). –  John Dec 3 '12 at 0:26
1  
@SteveMoser There is a good writeup of Ruby's regular expression engine (>=1.9) here –  John Dec 3 '12 at 0:49
    
@John right, so in the context of the question Jose is right and hqt is wrong. –  Steve Moser Dec 3 '12 at 15:32

It's not possible. Palindromes aren't defined by a regular language. (See, I DID learn something in computational theory)

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Most regular expressions engines capture more than regular languages (net can capture matching parenthesis for example). Only standard regexes are limited to regular langs. –  Santiago Palladino Oct 24 '08 at 12:45
    
The question did use the term "regular expression" though... so ZCHudson's answer is correct. –  paxos1977 Oct 24 '08 at 15:55
1  
@austirg: ZCHudson's answer is correct but incomplete. Regular expressions used in modern programming languages and regular expressions used in theoretical CS classes are different beasts. The term is just a historical heritage. See stackoverflow.com/questions/233243#235199 and my answer. –  J.F. Sebastian Nov 3 '08 at 21:57
1  
@J.F. Sebastian - I'd have to agree with austirg on this. When the term regular expression is used without a specific programming language mentioned than the comp sci defintion applies. Not all languages that support regexes can do this, so we shouldn't assume the one used here does. –  Rontologist Nov 3 '08 at 22:11
    
@Rontologist: I see no restrictions on the choice of programming language in the question thus any language is allowed. Look at the right: what is the meaning of "regular expression" in the related questions? Are specific programming language being mentioned in any of them? –  J.F. Sebastian Nov 3 '08 at 22:29

Depends what they're looking for... This detects any palindrome, but does require a loop (which will be required because regular expressions can't count).

I don't think "That's not possible" is really what the interviewer is looking for.

$a = "teststring";
while(length $a > 1)
{
   $a =~ /(.)(.*)(.)/;
   die "Not a palindrome: $a" unless $1 eq $3;
   $a = $2;
}
print "Palindrome";
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3  
Good answer. The question didn't ask for a single regexp that detects a palindrome straight out of the box - it simply asked for a method of detecting palindromes that makes use of regexps. Congrats on your insight to look at it this way. –  Stewart Sep 21 '09 at 8:24

With Perl regex:

/^((.)(?1)\2|.?)$/

Though, as many have pointed out, this can't be considered a regular expression if you want to be strict. Regular expressions does not support recursion.

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this doesn't work in PCRE (it doesn't match "ababa"), but it does work in Perl 5.10 –  newacct Oct 2 '09 at 4:33
    
You are right. PCRE does seem treat the recursion as an atomic group, while Perl allows backtracking within it. I don't think it is possible to do this check in PCRE. –  Markus Jarderot Oct 2 '09 at 21:14

Here's one to detect 4-letter palindromes (e.g.: deed), for any type of character:

\(.\)\(.\)\2\1

Here's one to detect 5-letter palindromes (e.g.: radar), checking for letters only:

\([a-z]\)\([a-z]\)[a-z]\2\1

So it seems we need a different regex for each possible word length. This post on a Python mailing list includes some details as to why (Finite State Automata and pumping lemma).

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Depending on how confident you are, I'd give this answer:

I wouldn't do it with a regular expression. It's not an appropriate use of regular expressions.

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1  
I would hope you'd give a little more explanation, to show that you really understand the limitations of regex. Your simple answer might be taken as "I'm stumped". –  Scott Wegner Nov 15 '08 at 2:11
    
Hence the depend clause he gave. –  Will Bickford Oct 2 '09 at 21:17
1  
Intriguing... two recent downvotes on an answer over a year old, and with no explanation. Downvoters, could you please leave a comment so that your vote has more meaning? –  Jon Skeet Feb 18 '10 at 11:02

As a few have already said, there's no single regexp that'll detect a general palindrome out of the box, but if you want to detect palindromes up to a certain length, you can use something like

(.?)(.?)(.?)(.?)(.?).?\5\4\3\2\1
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Yes, you can do it in .Net!

(?<N>.)+.?(?<-N>\k<N>)+(?(N)(?!))

You can check it here! It's a wonderful post!

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It's actually easier to do it with string manipulation rather than regular expressions:

bool isPalindrome(String s1)

{

    String s2 = s1.reverse;

    return s2 == s1;
}

I realize this doesn't really answer the interview question, but you could use it to show how you know a better way of doing a task, and you aren't the typical "person with a hammer, who sees every problem as a nail."

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Whereas I am quite fond of this answer, I do think you'd get extra points by using BreakIterator to properly split the string up into visual characters. –  Trejkaz Jan 20 at 5:32

In ruby you can use named capture groups. so something like this will work -

def palindrome?(string)
  $1 if string =~ /\A(?<p>| \w | (?: (?<l>\w) \g<p> \k<l+0> ))\z/x
end

try it, it works...

1.9.2p290 :017 > palindrome?("racecar")
 => "racecar" 
1.9.2p290 :018 > palindrome?("kayak")
 => "kayak" 
1.9.2p290 :019 > palindrome?("woahitworks!")
 => nil 
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1  
Named capture groups are not strictly regex. willamette.edu/~fruehr/LLC/lab5.html –  Steve Moser Oct 22 '12 at 17:44
2  
You are correct. Thats specifically why I pointed out that you would have to use named capture groups. –  Taylor Oct 30 '12 at 13:56
    
Could someone by any chance explain that RE character by character for a newbie? I understand all of the following (commas separate the 'atoms') /,\A,(,|,\w,|,(,(,\w,),),),\z,/,x but I don't understand any of these ?<p>,?:,?<l>,\g<p>,\k<l+0> and I'm using rubular.com for help and it seems to understand the RE (naturally), but that doesn't help me see it, and even "For a complete Ruby regex guide, see the Pickaxe." doesn't help, for the site linked with 'Pickaxe' does not explain the atoms I am failing to understand. I know ? FOLLOWING a matches Zero or one of a, but ? preceding a character? –  CopyrightX Apr 7 '13 at 18:23
    
Ah, named capture groups! Nice. @SteveMoser that's now a broken link, but I found another. Thanks Taylor for mentioning them, as otherwise, I would have had no idea what was meant by ?<p> and ?<l> and ?: (non-capturing capture group) and \g<p> and \k<l+0>. I still can't see what ?<p>| is though. Doesn't | mean "or"? I'm unable to find documentation of that usage for the pipe in REs. I'd still be delighted to see a detailed explanation for this very nice RE. –  CopyrightX Apr 8 '13 at 2:10

In Perl (see also Zsolt Botykai's answer):

$re = qr/
  .                 # single letter is a palindrome
  |
  (.)               # first letter
  (??{ $re })??     # apply recursivly (not interpolated yet)
  \1                # last letter
/x;

while(<>) {
    chomp;
    say if /^$re$/; # print palindromes
}
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As pointed out by ZCHudson, determine if something is a palindrome cannot be done with an usual regexp, as the set of palindrome is not a regular language.

I totally disagree with Airsource Ltd when he says that "it's not possibles" is not the kind of answer the interviewer is looking for. During my interview, I come to this kind of question when I face a good candidate, to check if he can find the right argument when we proposed to him to do something wrong. I do not want to hire someone who will try to do something the wrong way if he knows better one.

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something you can do with perl: http://www.perlmonks.org/?node_id=577368

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I would explain to the interviewer that the language consisting of palindromes is not a regular language but instead context-free.

The regular expression that would match all palindromes would be infinite. Instead I would suggest he restrict himself to either a maximum size of palindromes to accept; or if all palindromes are needed use at minimum some type of NDPA, or just use the simple string reversal/equals technique.

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Regarding the PCRE expression (from MizardX):

/^((.)(?1)\2|.?)$/

Have you tested it? On my PHP 5.3 under Win XP Pro it fails on: aaaba Actually, I modified the expression expression slightly, to read:

/^((.)(?1)*\2|.?)$/

I think what is happening is that while the outer pair of characters are anchored, the remaining inner ones are not. This is not quite the whole answer because while it incorrectly passes on "aaaba" and "aabaacaa", it does fail correctly on "aabaaca".

I wonder whether there a fixup for this, and also, Does the Perl example (by JF Sebastian / Zsolt) pass my tests correctly?

Csaba Gabor from Vienna

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The best you can do with regexes, before you run out of capture groups:

/(.?)(.?)(.?)(.?)(.?)(.?)(.?)(.?)(.?).?\9\8\7\6\5\4\3\2\1/

This will match all palindromes up to 19 characters in length.

Programatcally solving for all lengths is trivial:

str == str.reverse ? true : false
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I don't have the rep to comment inline yet, but the regex provided by MizardX, and modified by Csaba, can be modified further to make it work in PCRE. The only failure I have found is the single-char string, but I can test for that separately.

/^((.)(?1)?\2|.)$/

If you can make it fail on any other strings, please comment.

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#!/usr/bin/perl

use strict;
use warnings;

print "Enter your string: ";
chop(my $a = scalar(<STDIN>));    
my $m = (length($a)+1)/2;
if( (length($a) % 2 != 0 ) or length($a) > 1 ) { 
  my $r; 
  foreach (0 ..($m - 2)){
    $r .= "(.)";
  }
  $r .= ".?";
  foreach ( my $i = ($m-1); $i > 0; $i-- ) { 
    $r .= "\\$i";
  } 
  if ( $a =~ /(.)(.).\2\1/ ){
    print "$a is a palindrome\n";
  }
  else {
    print "$a not a palindrome\n";
 }
exit(1);
}
print "$a not a palindrome\n";
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From automata theory its impossible to match a paliandrome of any lenght ( because that requires infinite amount of memory). But IT IS POSSIBLE to match Paliandromes of Fixed Length. Say its possible to write a regex that matches all paliandromes of length <= 5 or <= 6 etc, but not >=5 etc where upper bound is unclear

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A slight refinement of Airsource Ltd's method, in pseudocode:

WHILE string.length > 1
    IF /(.)(.*)\1/ matches string
        string = \2
    ELSE
        REJECT
ACCEPT
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It can be done in Perl now. Using recursive reference:

if($istr =~ /^((\w)(?1)\g{-1}|\w?)$/){
    print $istr," is palindrome\n";
}

modified based on the near last part http://perldoc.perl.org/perlretut.html

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Here's my answer to Regex Golf's 5th level (A man, a plan). It works for up to 7 characters with the browser's Regexp (I'm using Chrome 36.0.1985.143).

^(.)(.)(?:(.).?\3?)?\2\1$

Here's one for up to 9 characters

^(.)(.)(?:(.)(?:(.).?\4?)?\3?)?\2\1$

To increase the max number of characters it'd work for, you'd repeatedly replace .? with (?:(.).?\n?)?.

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In Ruby you can use \b(?'word'(?'letter'[a-z])\g'word'\k'letter+0'|[a-z])\b to match palindrome words such as a, dad, radar, racecar, and redivider. ps : this regex only matches palindrome words that are an odd number of letters long.

Let's see how this regex matches radar. The word boundary \b matches at the start of the string. The regex engine enters the capturing group "word". [a-z] matches r which is then stored in the stack for the capturing group "letter" at recursion level zero. Now the regex engine enters the first recursion of the group "word". (?'letter'[a-z]) matches and captures a at recursion level one. The regex enters the second recursion of the group "word". (?'letter'[a-z]) captures d at recursion level two. During the next two recursions, the group captures a and r at levels three and four. The fifth recursion fails because there are no characters left in the string for [a-z] to match. The regex engine must backtrack.

The regex engine must now try the second alternative inside the group "word". The second [a-z] in the regex matches the final r in the string. The engine now exits from a successful recursion, going one level back up to the third recursion.

After matching (&word) the engine reaches \k'letter+0'. The backreference fails because the regex engine has already reached the end of the subject string. So it backtracks once more. The second alternative now matches the a. The regex engine exits from the third recursion.

The regex engine has again matched (&word) and needs to attempt the backreference again. The backreference specifies +0 or the present level of recursion, which is 2. At this level, the capturing group matched d. The backreference fails because the next character in the string is r. Backtracking again, the second alternative matches d.

Now, \k'letter+0' matches the second a in the string. That's because the regex engine has arrived back at the first recursion during which the capturing group matched the first a. The regex engine exits the first recursion.

The regex engine is now back outside all recursion. That this level, the capturing group stored r. The backreference can now match the final r in the string. Since the engine is not inside any recursion any more, it proceeds with the remainder of the regex after the group. \b matches at the end of the string. The end of the regex is reached and radar is returned as the overall match.

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