# Determine if a given string is a k-palindrome

I'm trying to solve the following interview practice question:

A k-palindrome is a string which transforms into a palindrome on removing at most k characters.

Given a string S, and an integer K, print "YES" if S is a k-palindrome; otherwise print "NO".

Constraints:

`S` has at most 20,000 characters.
`0 <= k <= 30`

Sample Test Cases:

``````Input - abxa 1
Output - YES

Input - abdxa 1
Output - NO
``````

My approach I've decided is going to be taking all possible String combinations of length `s.length - k` or greater, i.e. "abc" and k = 1 -> "ab" "bc" "ac" "abc" and checking if they are palindromes. I have the following code so far, but can't seem to figure out a proper way to generate all these string combinations in the general case:

``````public static void isKPalindrome(String s, int k) {
// Generate all string combinations and call isPalindrome on them,
//   printing "YES" at first true
}

private static boolean isPalindrome(String s) {
char[] c = s.toCharArray()
int slow = 0;
int fast = 0;
Stack<Character> stack = new Stack<>();
while (fast < c.length) {
stack.push(c[slow]);
slow += 1;
fast += 2;
}
if (c.length % 2 == 1) {
stack.pop();
}
while (!stack.isEmpty()) {
if (stack.pop() != c[slow++]) {
return false;
}
}
return true;
}
``````

Can anyone figure out a way to implement this, or perhaps demonstrate a better way?

-
Apache Commons, StringUtils.reverse. It would be: `"abxa".equals(StringUtils.reverse("abxa"))` –  Jorge Campos Jan 2 at 22:01

I think there is a better way

``````package se.wederbrand.stackoverflow;

public class KPalindrome {
public static void main(String[] args) {
KPalindrome kPalindrome = new KPalindrome();
String s = args[0];
int k = Integer.parseInt(args[1]);
if (kPalindrome.testIt(s, k)) {
System.out.println("YES");
}
else {
System.out.println("NO");
}
}

boolean testIt(String s, int k) {
if (s.length() <= 1) {
return true;
}

while (s.charAt(0) == s.charAt(s.length()-1)) {
s = s.substring(1, s.length()-1);

if (s.length() <= 1) {
return true;
}
}

if (k == 0) {
return false;
}

// Try to remove the first or last character
return testIt(s.substring(0, s.length() - 1), k - 1) || testIt(s.substring(1, s.length()), k - 1);
}
}
``````

Since K is max 30 it's likely the string can be invalidated pretty quick and without even examining the middle of the string.

I've tested this with the two provided test cases as well as a 20k characters long string with just "ab" 10k times and k = 30;

All tests are fast and returns the correct results.

-
Thank you so much! This is great, and better than mine, substrings are probably a better idea than char arrays. –  BrandonM Jan 2 at 22:54
Max depth of recursion should be K and it is in this case. –  Luka Rahne Jan 2 at 23:04
NP. Sometimes it helps to think like human. This is how I would solve the problem on paper. Good luck with the job interview. –  Andreas Wederbrand Jan 2 at 23:11
@AndreasWederbrand The number of times the method testIt gets called will be (20000^2)*30 because there will be 20000^2 different possible substrings and for each of them 30 different k are possible. I dont think it should run very fast. What time does your algorithm take in worst case? –  Nikunj Banka Aug 29 at 18:26

Thanks to Andreas, that algo worked like a charm. Here my implementation for anyone who's curious. Slightly different, but fundamentally your same logic:

``````public static boolean kPalindrome(String s, int k) {
if (s.length() <= 1) {
return true;
}
char[] c = s.toCharArray();
if (c[0] != c[c.length - 1]) {
if (k <= 0) {
return false;
} else {
char[] minusFirst = new char[c.length - 1];
System.arraycopy(c, 1, minusFirst, 0, c.length - 1);
char[] minusLast = new char[c.length - 1];
System.arraycopy(c, 0, minusLast, 0, c.length - 1);
return kPalindrome(String.valueOf(minusFirst), k - 1)
|| kPalindrome(String.valueOf(minusLast), k - 1);
}
} else {
char[] minusFirstLast = new char[c.length - 2];
System.arraycopy(c, 1, minusFirstLast, 0, c.length - 2);
return kPalindrome(String.valueOf(minusFirstLast), k);
}
}
``````
-
Need to translate the boolean to yes or no of course, but thats trivial... –  BrandonM Jan 2 at 22:56
If `k == 0`, you can just loop over the array, checking if it's a palindrome - no need to recurse further. Also, I wouldn't recommend creating a `char[]` (or `String`) at each recursive step - you can just keep track of the current left and right indices in the original string instead. –  Dukeling Jan 3 at 7:41