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# How to find the longest palindrome in a given string? [duplicate]

Possible Duplicate:
Write a function that returns the longest palindrome in a given string

I know how to do this in O(n^2). But it seems like there exist a better solution.

I've found this, and there is a link to O(n) answer, but it's written in Haskell and not clear for me.

It would be great to get an answer in c# or similar.

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## marked as duplicate by bmargulies, Bridge, competent_tech, mimming, Jonas G. DrangeJun 30 '13 at 1:33

This is an exact duplicate of the other question, the one you yourself linked to. If you don't understand the answer there, post a comment there, don't open a new question! (For what it's worth, I think the blog post linked there has a reasonably clear explanation even if you entirely ignore the Haskell code.) – ShreevatsaR Apr 20 '10 at 17:04
There was no mention about the programming language that it should be written in – Hun1Ahpu Apr 20 '10 at 17:05
Yes, good point; I've always felt that Stack Overflow lacks a mechanism for multiple people to ask the same question... if you have enough reputation, I guess you could edit the question and hope it leads to a better answer, but this is not ideal. – ShreevatsaR Apr 20 '10 at 17:07
I think the best approach here would've been to start with your analysis of the link, and try to build a "pseudocode" representation of the algorithm, highlighting the parts that you can't interpret from the blog post's prose...in fact if you do that I'll vote to reopen...asking for this in C# vs. Haskell is just another meaningless translation, there's a lot of value in having a generalized representation. – Mark Elliot Apr 20 '10 at 17:17
Try this link: akalin.cx/2007/11/28/…. It has Python code which may be a little easier for you to understand. It also contains an alternate explanation of the algorithm which might help. – Justin Peel Apr 20 '10 at 17:23

I've found clear explanation of the solution here. Thanks to Justin for this link.

There you can find Python and Java implementations of the algorithm (C++ implementation contains errors).

And here is C# implementation that is just a translation of those algorithms.

``````public static int LongestPalindrome(string seq)
{
int Longest = 0;
List<int> l = new List<int>();
int i = 0;
int palLen = 0;
int s = 0;
int e = 0;
while (i<seq.Length)
{
if (i > palLen && seq[i-palLen-1] == seq[i])
{
palLen += 2;
i += 1;
continue;
}
Longest = Math.Max(Longest, palLen);
s = l.Count - 2;
e = s - palLen;
bool found = false;
for (int j = s; j > e; j--)
{
int d = j - e - 1;
if (l[j] == d)
{
palLen = d;
found = true;
break;
}
}
if (!found)
{
palLen = 1;
i += 1;
}
}
Longest = Math.Max(Longest, palLen);
return Longest;
}
``````
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And this is its java version:

``````public static int LongestPalindrome(String seq) {
int Longest = 0;
List<Integer> l = new ArrayList<Integer>();
int i = 0;
int palLen = 0;
int s = 0;
int e = 0;

while (i < seq.length()) {
if (i > palLen && seq.charAt(i - palLen - 1) == seq.charAt(i)) {
palLen += 2;
i += 1;
continue;
}
Longest = Math.max(Longest, palLen);
s = l.size() - 2;
e = s - palLen;
boolean found = false;
for (int j = s; j > e; j--) {
int d = j - e - 1;
if (l.get(j) == d) {
palLen = d;
found = true;
break;
}
}
if (!found) {
palLen = 1;
i += 1;
}
}
Longest = Math.max(Longest, palLen);
return Longest;
}
``````
-

Recently I wrote following code during interview...

``````    public string FindMaxLengthPalindrome(string s)
{
string maxLengthPalindrome = "";

if (s == null) return s;

int len = s.Length;

for(int i = 0; i < len; i++)
{
for (int j = 0; j < len - i; j++)
{
bool found = true;
for (int k = j; k < (len - j) / 2; k++)
{
if (s[k] != s[len - (k - j + 1)])
{
found = false;
break;
}
}

if (found)
{
if (len - j > maxLengthPalindrome.Length)
maxLengthPalindrome = s.Substring(j, len - j);
}

if(maxLengthPalindrome.Length >= (len - (i + j)))
break;
}

if (maxLengthPalindrome.Length >= (len - i))
break;
}

return maxLengthPalindrome;
}
``````
-

I got this question when i took an interview.

I found out when i was back home, unfortunately.

``````public static string GetMaxPalindromeString(string testingString)
{
int stringLength = testingString.Length;
int maxPalindromeStringLength = 0;
int maxPalindromeStringStartIndex = 0;

for (int i = 0; i < testingString.Length; i++)
{
int currentCharIndex = i;

for (int lastCharIndex = stringLength - 1; lastCharIndex > currentCharIndex; lastCharIndex--)
{
bool isPalindrome = true;

if (testingString[currentCharIndex] != testingString[lastCharIndex])
{
continue;
}

for (int nextCharIndex = currentCharIndex + 1; nextCharIndex < lastCharIndex / 2; nextCharIndex++)
{
if (testingString[nextCharIndex] != testingString[lastCharIndex - 1])
{
isPalindrome = false;
break;
}
}

if (isPalindrome)
{
if (lastCharIndex + 1 - currentCharIndex > maxPalindromeStringLength)
{
maxPalindromeStringStartIndex = currentCharIndex;
maxPalindromeStringLength = lastCharIndex + 1 - currentCharIndex;
}
}
break;
}
}

return testingString.Substring(maxPalindromeStringStartIndex, maxPalindromeStringLength);
}
``````
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Necroposting for the benefit of googlers: This answer is incorrect. Running this with the string "abcdedcbax" returns "dedcbax". – Dassina Jun 2 '15 at 16:54
``````public static string GetMaxPalindromeString(string testingString)
{
int stringLength = testingString.Length;
int maxPalindromeStringLength = 0;
int maxPalindromeStringStartIndex = 0;

for (int i = 0; i < stringLength; i++)
{
int currentCharIndex = i;

for (int lastCharIndex = stringLength - 1; lastCharIndex > currentCharIndex; lastCharIndex--)
{
if (lastCharIndex - currentCharIndex + 1 < maxPalindromeStringLength)
{
break;
}

bool isPalindrome = true;

if (testingString[currentCharIndex] != testingString[lastCharIndex])
{
continue;
}
else
{
int matchedCharIndexFromEnd = lastCharIndex - 1;

for (int nextCharIndex = currentCharIndex + 1; nextCharIndex < matchedCharIndexFromEnd; nextCharIndex++)
{
if (testingString[nextCharIndex] != testingString[matchedCharIndexFromEnd])
{
isPalindrome = false;
break;
}
matchedCharIndexFromEnd--;
}
}

if (isPalindrome)
{
if (lastCharIndex + 1 - currentCharIndex > maxPalindromeStringLength)
{
maxPalindromeStringStartIndex = currentCharIndex;
maxPalindromeStringLength = lastCharIndex + 1 - currentCharIndex;
}
break;
}
}
}

if(maxPalindromeStringLength>0)
{
return testingString.Substring(maxPalindromeStringStartIndex, maxPalindromeStringLength);
}

return null;

}
``````
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C#

First I search for even length palindromes. Then I search for odd length palindromes. When it finds a palindrome, it determines the length and sets the max length accordingly. The average case complexity for this is linear.

``````        protected static int LongestPalindrome(string str)
{
int i = 0;
int j = 1;
int oldJ = 1;
int intMax = 1;
int intCount = 0;

if (str.Length == 0) return 0;
if (str.Length == 1) return 1;

int[] intDistance = new int[2] {0,1};

for( int k = 0; k < intDistance.Length; k++ ){

j = 1 + intDistance[k];
oldJ = j;
intCount = 0;
i = 0;

while (j < str.Length)
{

if (str[i].Equals(str[j]))
{
oldJ = j;
intCount = 2 + intDistance[k];
i--;
j++;
while (i >= 0 && j < str.Length)
{
if (str[i].Equals(str[j]))
{
intCount += 2;
i--;
j++;
continue;
}
else
{
break;
}

}
intMax = getMax(intMax, intCount);
j = oldJ + 1;
i = j - 1 - intDistance[k];

}
else
{
i++;
j++;
}
}
}

return intMax;
}

protected static int getMax(int a, int b)
{
if (a > b) return a; return b;
}
``````
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Please add explanation why this works – Yotam Omer Jun 29 '13 at 23:14
Explanation added. – rgrano Jul 4 '13 at 17:20