[LeetCode]5. Longest Palindromic Substring (medium)
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5. Longest Palindromic Substring (medium)
![[LeetCode]5. Longest Palindromic Substring (medium)_LeetCode](https://s2.51cto.com/images/blog/202301/17174346_63c66dd25d3ca66585.png?x-oss-process=image/watermark,size_16,text_QDUxQ1RP5Y2a5a6i,color_FFFFFF,t_30,g_se,x_10,y_10,shadow_20,type_ZmFuZ3poZW5naGVpdGk=/resize,m_fixed,w_1184 "5.1.png")
Brute force
找出所有可能的子串(窗口),O(n^2),再判断是否为回文,O(n^2),所以总的时间复杂度为O(n^3),Time Limit Exceeded
Dynamic Programming
![[LeetCode]5. Longest Palindromic Substring (medium)_Time_02](https://s2.51cto.com/images/blog/202301/17174347_63c66dd33071148790.png?x-oss-process=image/watermark,size_16,text_QDUxQ1RP5Y2a5a6i,color_FFFFFF,t_30,g_se,x_10,y_10,shadow_20,type_ZmFuZ3poZW5naGVpdGk=/resize,m_fixed,w_1184 "5.2.png")
1. 用递归的方式实现P(i,j)会导致 Time Limit Exceeded
能不能借用HashMap实现,有待考虑
//递归实现P(i,j)
class Solution {
public String longestPalindrome(String s) {
int n = s.length(),len = 0,start = 0;
for (int i = 0; i < n; i++){
for (int j = i ;j >= 0; j--){
if(P(s,j,i) && ((i - j + 1) > len)){
start = j;
len = i - j + 1;
}
}
}
return s.substring(start,start + len);
}
private boolean P(String s,int i, int j){
if (i == j) return true;
if (i +1 == j) return s.charAt(i) == s.charAt(j);
return (P(s,i+1,j-1) && s.charAt(i) == s.charAt(j));
}
}
- 使用循环实现P(i,j)
- complexity analysis:
- time complexity: O(n^2)
- space complexity: O(n^2)
//循环实现
class Solution {
public String longestPalindrome(String s) {
int n = s.length(),len = 0,start = 0;
boolean[][] dynamic_prog = new boolean[n][n];
for (int i = 0; i < n; i++){
for (int j = i; j>=0; j--){
boolean temp = s.charAt(j)== s.charAt(i);
//精髓就在于这步
dynamic_prog[j][i] = (temp && (((i - j) < 3)||dynamic_prog[j + 1][i - 1]));
if(dynamic_prog[j][i]&&((i - j + 1) > len)) {
start = j;
//最开始错写成i-j,因为s.substring(start,end)属于左闭右开形式
len = i - j + 1;
}
}
}
return s.substring(start,start + len);
}
}
循环示意图:
![[LeetCode]5. Longest Palindromic Substring (medium)_i++_03](https://s2.51cto.com/images/blog/202301/17174347_63c66dd3b0c6c95265.png?x-oss-process=image/watermark,size_16,text_QDUxQ1RP5Y2a5a6i,color_FFFFFF,t_30,g_se,x_10,y_10,shadow_20,type_ZmFuZ3poZW5naGVpdGk=/resize,m_fixed,w_1184 "5.3.png")
(j,i)构成了一个上三角矩阵,
黄圈表示(i-j)<2的状态,
当(i-j)=3时,p(j-1,i-1)处于对角线上,对角线上i=j,此时如果s_i==s_j则有p(i,j)=true
当(i-j)>3时,就要同时判断p(j-1,i-1)和s_i,s_j了
![[LeetCode]5. Longest Palindromic Substring (medium)_子串_04](https://s2.51cto.com/images/blog/202301/17174348_63c66dd439b8847600.png?x-oss-process=image/watermark,size_16,text_QDUxQ1RP5Y2a5a6i,color_FFFFFF,t_30,g_se,x_10,y_10,shadow_20,type_ZmFuZ3poZW5naGVpdGk=/resize,m_fixed,w_1184 "5.4.png")
中心扩展
- palindrome是轴对称的,对于n个元素,对称轴有2n-1种,其中n个元素可以作为n个对称轴,两个相同的元素也可以作为对称轴,eg:abba中的bb是对称轴,这样的元素可能有n-1个,故共有2n-1种可能.从对称轴向两边扩展,这个逻辑比起动态规划更直观
- complexity analysis:
- time complexity: O(n^2)
- space complexity: O(1)
class Solution {
public static String longestPalindrome(String s) {
int n = s.length(), len1 = 0, len2 = 0;
int res = 0, p = 0;
if(n == 1) return s;
for (int i = 0; i < n - 1; i++){
//1. 对2n-1种可能的对称中心进行扩展
//1.1 对称中心为1个元素
len1 = expandAroundCenter(s,i,i);
//1.2 对称中心为2个元素,前提:相邻两个元素相同
if(s.charAt(i) == s.charAt(i + 1))
len2 = expandAroundCenter(s,i,i + 1);
//1.3 len1一定是奇数,len2一定是偶数,也可以利用这个条件
if(len1 >= len2 && len1 > res){
res = len1;
p = i + (1-len1)/2;
}
else if(len1 < len2 && len2 > res){
res = len2;
p = i + 1 - len2/2;
}
}
return s.substring(p,p+res);
}
public static int expandAroundCenter(String s, int l, int r){
int n = s.length();
while(l >= 0 && r < n && s.charAt(l)== s.charAt(r)){
l--;
r++;
}
return r - l - 1;
}
}
