Given a string s, you are allowed to convert it to a palindrome by adding characters in front of it. Find and return the shortest palindrome you can find by performing this transformation.
Example 1:
Input:"aacecaaa"Output:"aaacecaaa"
Example 2:
Input:"abcd"Output:"dcbabcd"
最初的思路就是从头开始增加0,1,2,...len-1个字母,然后判断是否回文,但是最后一个例子会超时
class Solution {
public:
bool isPalindrome(string s, int l, int r){
for(int i = l, j = r; i <= j; i++, j--){
if(s[i] != s[j]) return false;
}
return true;
}
string shortestPalindrome(string s) {
int len = s.length();
string res(s);
int num = 0;
for(int i = 0; i < len; i++){
if(isPalindrome(s, 0, len - i - 1)){
num = i;
break;
}
}
for(int i = 0; i < num; i++){
res.insert(0, 1, s[len - num + i]);
}
return res;
}
};
动态规划就是找到开始最长的回文字符串,然后把后半段补在前面,比如aaacecaa
开始最长的回文是aaa, 那么只要在前面补上aacec即可
但是最后一个案例也要超时,ccc
class Solution {
public:
string shortestPalindrome(string s) {
int len = s.length();
string res(s);
int maxlen = 1;
vector<vector<bool> > dp(len, vector<bool>(len, false));
for(int i = 0; i < len; i++)
dp[i][i] = true;
for(int i = 0; i < len - 1; i++){
if(s[i] == s[i + 1])
dp[i][i + 1] = true;
if(dp[0][1]) maxlen = 2;
}
for(int l = 3; l <= len; l++){
for(int j = 0; j < len - l + 1; j++){
int k = j + l - 1;
if(s[j] == s[k] && dp[j + 1][k - 1])
dp[j][k] = true;
}
if(dp[0][l - 1]) maxlen = l;
}
for(int p = maxlen; p < len; p++)
res.insert(0, 1, s[p]);
return res;
}
};