CF 17E Palisection 求不相交回文串个数

In an English class Nick had nothing to do at all, and remembered about wonderful strings called palindromes. We should remind you that a string is called a palindrome if it can be read the same way both from left to right and from right to left. Here are examples of such strings: «eye», «pop», «level», «aba», «deed», «racecar», «rotor», «madam».

Nick started to look carefully for all palindromes in the text that they were reading in the class. For each occurrence of each palindrome in the text he wrote a pair — the position of the beginning and the position of the ending of this occurrence in the text. Nick called each occurrence of each palindrome he found in the text subpalindrome. When he found all the subpalindromes, he decided to find out how many different pairs among these subpalindromes cross. Two subpalindromes cross if they cover common positions in the text. No palindrome can cross itself.

Let's look at the actions, performed by Nick, by the example of text «babb». At first he wrote out all subpalindromes:

• « b» — 1..1
• « bab» — 1..3
• « a» — 2..2
• « b» — 3..3
• « bb» — 3..4
• « b» — 4..4

Then Nick counted the amount of different pairs among these subpalindromes that cross. These pairs were six:

1. 1..1 cross with 1..3
2. 1..3 cross with 2..2
3. 1..3 cross with 3..3
4. 1..3 cross with 3..4
5. 3..3 cross with 3..4
6. 3..4 cross with 4..4

Since it's very exhausting to perform all the described actions manually, Nick asked you to help him and write a program that can find out the amount of different subpalindrome pairs that cross. Two subpalindrome pairs are regarded as different if one of the pairs contains a subpalindrome that the other does not.

Input

The first input line contains integer n (1 ≤ n ≤ 2·106) — length of the text. The following line contains n lower-case Latin letters (from a to z).

Output

In the only line output the amount of different pairs of two subpalindromes that cross each other. Output the answer modulo 51123987.

Examples

Input
4
babb
Output
6
Input
2
aa
Output
2
题解:题目意思是让你求一个字符串内的相交的回文子串对个数。 (相交=> n*(n-1)/2 -不相交) 问题转化为求不相交子串。 我们可正着跑一遍PAM,求出某个字符前面的回文子串个数,倒着跑一遍PAM求出某个字符后面的回文子串个数,相乘就是该位置的贡献。 然后用总的答案减去它就行了。   参考代码: CF 17E Palisection  求不相交回文串个数
#include<bits/stdc++.h>
using namespace std;
const int N = 2e6+5;
const int mod = 51123987;
int n,fa[N],len[N],dep[N],tot,last,p1[N],p2[N],ans;
int to[N],nxt[N],ww[N],head[N],cnt;
char s[N];
void init()
{
    fa[last=0]=fa[1]=1;
    len[0]=0;len[tot=1]=-1;
    memset(head,0,sizeof(head));cnt=0;
}
void link(int u,int v,int c)
{
    to[++cnt]=v;nxt[cnt]=head[u];ww[cnt]=c;
    head[u]=cnt;
}
int tr(int v,int c)
{
    for(int e=head[v];e;e=nxt[e])
        if(ww[e]==c) return to[e];
    return 0;
}
void extend(int c,int n)
{
    int v=last;
    while(s[n-len[v]-1]!=s[n]) v=fa[v];
    if(!tr(v,c))
    {
        int u=++tot,k=fa[v];
        len[u]=len[v]+2;
        while(s[n-len[k]-1]!=s[n]) k=fa[k];
        fa[u]=tr(k,c); dep[u]=dep[fa[u]]+1;
        link(v,u,c);
    }
    last=tr(v,c);
}
int main()
{
    scanf("%d",&n);
    scanf("%s",s+1);
    init();
    for(int i=1;i<=n;++i) extend(s[i]-'a',i),(ans+=(p1[i]=dep[last]))%=mod;
    ans=1ll*ans*(ans-1)/2%mod;
    reverse(s+1,s+n+1);
    init();
    for(int i=1;i<=n;++i) extend(s[i]-'a',i),p2[n-i+1]=dep[last];
    for(int i=n;i;--i) (p2[i]+=p2[i+1])%=mod;
    for(int i=1;i<=n;++i) ans=(ans-1ll*p1[i]*p2[i+1]%mod+mod)%mod;
    printf("%d\n",ans);
    return 0;
}
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