【Tsinsen】A1393. Palisection 【Palindromic Tree】
传送门:【Tsinsen】A1393. Palisection
题目分析:首先串S倒着插入构造回文树,处理出以每个下标为结尾的回文串个数cnt2[now] = cnt2[fail[now]]+1,然后处理出后缀和,suffix[i]表示开头下标大于等于下标i的回文串个数。
然后我们再正着插入字符构造回文树,每次插入结束后,ans+=cnt2[i]*suffix[i+1]。
当正着插入结束后,我们求得的ans恰是没有重叠的串的对数!所以我们只要再求得所有的对数,减去ans后就是答案。
代码如下:
#include <cstdio>
#include <cstring>
#include <algorithm>
using namespace std ;
typedef long long LL ;
#define rep( i , a , b ) for ( int i = ( a ) ; i < ( b ) ; ++ i )
#define For( i , a , b ) for ( int i = ( a ) ; i <= ( b ) ; ++ i )
#define rev( i , a , b ) for ( int i = ( a ) ; i >= ( b ) ; -- i )
#define clr( a , x ) memset ( a , x , sizeof a )
const int MAXN = 2000005 ;
const int mod = 51123987 ;
const int N = 26 ;
struct Palindromic_Tree {
int next[MAXN][N] ;
int fail[MAXN] ;
int cnt2[MAXN] ;
int cnt[MAXN] ;
int len[MAXN] ;
int S[MAXN] ;
int last ;
int n ;
int p ;
int newnode ( int l ) {
rep ( i , 0 , N ) next[p][i] = 0 ;
cnt[p] = 0 ;
cnt2[p] = 0 ;
len[p] = l ;
return p ++ ;
}
void init () {
p = 0 ;
newnode ( 0 ) ;
newnode ( -1 ) ;
last = 0 ;
n = 0 ;
S[0] = -1 ;
fail[0] = 1 ;
}
int get_fail ( int x ) {
while ( S[n - len[x] - 1] != S[n] ) x = fail[x] ;
return x ;
}
int add ( int c ) {
c -= 'a' ;
S[++ n] = c ;
int cur = get_fail ( last ) ;
if ( !next[cur][c] ) {
int now = newnode ( len[cur] + 2 ) ;
fail[now] = next[get_fail ( fail[cur] )][c] ;
next[cur][c] = now ;
cnt2[now] = cnt2[fail[now]] + 1 ;
}
last = next[cur][c] ;
cnt[last] ++ ;
return cnt2[last] ;
}
int count ( int ans = 0 ) {
rev ( i , p - 1 , 1 ) {
cnt[fail[i]] = ( cnt[fail[i]] + cnt[i] ) % mod ;
ans = ( ans + cnt[i] ) % mod ;
}
return ans ;
}
} ;
Palindromic_Tree T ;
char s[MAXN] ;
int suffix[MAXN] ;
int n ;
void solve () {
int ans = 0 ;
T.init () ;
suffix[n] = 0 ;
rev ( i , n - 1 , 0 ) suffix[i] = ( suffix[i + 1] + T.add ( s[i] ) ) % mod ;
T.init () ;
rep ( i , 0 , n ) ans = ( ans + ( LL ) T.add ( s[i] ) * suffix[i + 1] ) % mod ;
int tot = T.count () ;
tot = ( ( LL ) tot * ( tot - 1 ) / 2 ) % mod ;
printf ( "%d\n" , ( ( tot - ans ) % mod + mod ) % mod ) ;
}
int main () {
while ( ~scanf ( "%d%s" , &n , s ) ) solve () ;
return 0 ;
}