Count the string
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others)
Total Submission(s): 17918 Accepted Submission(s): 8106
http://acm.hdu.edu.cn/showproblem.php?pid=3336
Problem Description
It is well known that AekdyCoin is good at string problems as well as number theory problems. When given a string s, we can write down all the non-empty prefixes of this string. For example:
s: "abab"
The prefixes are: "a", "ab", "aba", "abab"
For each prefix, we can count the times it matches in s. So we can see that prefix "a" matches twice, "ab" matches twice too, "aba" matches once, and "abab" matches once. Now you are asked to calculate the sum of the match times for all the prefixes. For "abab", it is 2 + 2 + 1 + 1 = 6.
The answer may be very large, so output the answer mod 10007.
s: "abab"
The prefixes are: "a", "ab", "aba", "abab"
For each prefix, we can count the times it matches in s. So we can see that prefix "a" matches twice, "ab" matches twice too, "aba" matches once, and "abab" matches once. Now you are asked to calculate the sum of the match times for all the prefixes. For "abab", it is 2 + 2 + 1 + 1 = 6.
The answer may be very large, so output the answer mod 10007.
Input
The first line is a single integer T, indicating the number of test cases.
For each case, the first line is an integer n (1 <= n <= 200000), which is the length of string s. A line follows giving the string s. The characters in the strings are all lower-case letters.
For each case, the first line is an integer n (1 <= n <= 200000), which is the length of string s. A line follows giving the string s. The characters in the strings are all lower-case letters.
Output
For each case, output only one number: the sum of the match times for all the prefixes of s mod 10007.
Sample Input
1 4 abab
Sample Output
6
#include<stdio.h>//网上大佬的代码; #include<iostream> #include<string.h> #include<stack> using namespace std ; const int maxn = 1e6+5; int Next[maxn]; char str[maxn]; char mo[maxn]; int dp[maxn]; int n1,n2; void GetNext() { int i=0,j=-1; while(i<n2) { if(j==-1||mo[i]==mo[j]) {++i,++j,Next[i]=j;} else j=Next[j]; } return ; } /*int kmp() { int cnt=0; int i=0,j=0; while(i<n1) { if(j==-1||str[i]==mo[j]) i++,j++; else j=Next[j]; if(j==n2) { cnt++; j=0; } } return cnt; }*/ int ans[maxn]; int main() { int cnt; int t; scanf("D% " , & T); the while (T-- ) { Scanf ( " % S% D " , & N2, mo); // N2 is a string, mo is a string; the Next [ 0 ] = - . 1 ; GetNext (); int ANS = 0 ; DP [ 0 ] = 0 ; for ( int I = . 1 ; I <= N2; I ++ ) { the printf ( " % D ### \ n- " , the Next [I]); } for ( int I = . 1; I <= N2; I ++ ) { DP [I] = DP [the Next [I]] + . 1 ; // use mind dynamic programming; each value of the suffix value plus one, plus one represents its own, next [i] expressed // same prefix and a suffix, the prefix and suffix of the same value; prefix has forget; ANS = (ANS DP + [I])% 10007 ; } the printf ( " % D \ n- " , ANS); } return 0 ; }