The French author Georges Perec (1936–1982) once wrote a book, La disparition, without the letter 'e'. He was a member of the Oulipo group. A quote from the book:
Tout avait Pair normal, mais tout s’affirmait faux. Tout avait Fair normal, d’abord, puis surgissait l’inhumain, l’affolant. Il aurait voulu savoir où s’articulait l’association qui l’unissait au roman : stir son tapis, assaillant à tout instant son imagination, l’intuition d’un tabou, la vision d’un mal obscur, d’un quoi vacant, d’un non-dit : la vision, l’avision d’un oubli commandant tout, où s’abolissait la raison : tout avait l’air normal mais…
Perec would probably have scored high (or rather, low) in the following contest. People are asked to write a perhaps even meaningful text on some subject with as few occurrences of a given “word” as possible. Our task is to provide the jury with a program that counts these occurrences, in order to obtain a ranking of the competitors. These competitors often write very long texts with nonsense meaning; a sequence of 500,000 consecutive 'T's is not unusual. And they never use spaces.
So we want to quickly find out how often a word, i.e., a given string, occurs in a text. More formally: given the alphabet {'A', 'B', 'C', …, 'Z'} and two finite strings over that alphabet, a word W and a text T, count the number of occurrences of W in T. All the consecutive characters of W must exactly match consecutive characters of T. Occurrences may overlap.
Input
The first line of the input file contains a single number: the number of test cases to follow. Each test case has the following format:
One line with the word W, a string over {'A', 'B', 'C', …, 'Z'}, with 1 ≤ |W| ≤ 10,000 (here |W| denotes the length of the string W).
One line with the text T, a string over {'A', 'B', 'C', …, 'Z'}, with |W| ≤ |T| ≤ 1,000,000.
Output
For every test case in the input file, the output should contain a single number, on a single line: the number of occurrences of the word W in the text T.
Sample Input
3
BAPC
BAPC
AZA
AZAZAZA
VERDI
AVERDXIVYERDIANSample Output
1
3
0KMP模板code:
#include<iostream>
#include<cstring>
#include<cstdio>
using namespace std;
const int MAXN=1e6+20;
int nex[MAXN],n,m;
char a[MAXN],b[MAXN];
void getnex(){
int i=1,j=0;
nex[0]=0;
while(i<m){
if(b[i]==b[j]) nex[i++]=++j;
else if(j==0) i++;
else j=nex[j-1];
}
}
int kmp(){
int i=0,j=0,ans=0;
while(i<n){//m子串长度
if(a[i]==b[j]){
i++;j++;
}
else if(j==0) i++;
else j=nex[j-1];
if(j==m){//每次都判断一直到母串结束
ans++;
}
}
return ans;
}
/*一样
int kmp(){
int i=0,j=0,ans=0;
while(i<n && j<m){//m子串长度
if(a[i]==b[j]){
i++;j++;
}
else if(j==0) i++;
else j=nex[j-1];
if(j==m){
ans++;j=0;//j归零
}
}
return ans;
}
*/
int main()
{
int T;
scanf("%d",&T);
while(T--){
scanf("%s%s",b,a);
m=strlen(b),n=strlen(a);
getnex();
printf("%d\n",kmp());
}
return 0;
}字符串哈希也可以做本题,直接暴力匹配,O(n*m)复杂度肯定过不了。