![Luogu P3975 [TJOI2015]弦论](https://image.shishitao.com:8440/aHR0cHM6Ly9ia3FzaW1nLmlrYWZhbi5jb20vdXBsb2FkL2NoYXRncHQtcy5wbmc%2FIQ%3D%3D.png?!?w=700&webp=1 "Luogu P3975 [TJOI2015]弦论")
[题目链接 \(Click\) \(Here\)](P3975 [TJOI2015]弦论)
题目大意:
重复子串不算的第\(k\)大子串
重复子串计入的第\(k\)大子串
写法:后缀自动机。
和\(OI\) \(Wiki\)上介绍的写法不太一样,因为要同时解决两个问题。
把字符串每个前缀所在等价类的\(siz\)记为\(1\),然后在\(parent\) \(tree\)上跑一次统计,就可以求出来每一个等价类在串中出现的次数。这里采用类似后缀排序的方法,对字符串按\(len\)为关键字进行排序。至于经过每个点的路径数\(sum\),可以在\(Trie\)边上对后面节点的\(sum\)(=每一个等价类在串中出现次数)求和得到(初始值等于\(siz\),因为每个点还有不选的情况)。
不要忘了把\(siz[1]\)和\(sum[1]\)清空!
#include <bits/stdc++.h>
using namespace std;
const int N = 1100010;
char s[N];
int las = 1, node = 1;
int fa[N], len[N], siz[N], ch[N][26];
void extend (int c) {
register int p, q, x, y;
p = las, q = ++node; las = q;
len[q] = len[p] + 1; siz[q] = 1;
while (p != 0 && ch[p][c] == 0) {
ch[p][c] = q;
p = fa[p];
}
if (p == 0) {
fa[q] = 1;
} else {
x = ch[p][c];
if (len[x] == len[p] + 1) {
fa[q] = x;
} else {
y = ++node;
fa[y] = fa[x];
fa[x] = fa[q] = y;
len[y] = len[p] + 1;
memcpy (ch[y], ch[x], sizeof (ch[x]));
while (p != 0 && ch[p][c] == x) {
ch[p][c] = y;
p = fa[p];
}
}
}
}
int t, k, nd[N], bin[N]; long long sum[N];
void output (int u) {
if (k <= siz[u]) return;
k -= siz[u];
register int i;
for (i = 0; i < 26; ++i) {
if (ch[u][i]) {
if (k > sum[ch[u][i]]) {
k -= sum[ch[u][i]];
} else {
printf ("%c", i + 'a');
output (ch[u][i]);
return;
}
}
}
}
int main () {
scanf ("%s %d %d", s, &t, &k);
register int i, j, n;
n = strlen (s);
for (i = 0; i < n; ++i) extend (s[i] - 'a');
for (i = 1; i <= node; ++i) bin[len[i]]++;
for (i = 1; i <= node; ++i) bin[i] += bin[i - 1];
for (i = 1; i <= node; ++i) nd[bin[len[i]]--] = i;
for (i = node; i >= 1; --i) siz[fa[nd[i]]] += siz[nd[i]];
for (i = 1; i <= node; ++i) t == 0 ? (sum[i] = siz[i] = 1) : (sum[i] = siz[i]);
siz[1] = sum[1] = 0;
for (i = node; i >= 1; --i) {
for (j = 0; j < 26; ++j) {
if (ch[nd[i]][j]) {
sum[nd[i]] += sum[ch[nd[i]][j]];
}
}
}
if (sum[1] < k) {
puts ("-1");
} else {
output (1);
}
}
\(p.s\)关于后缀数组求第一问的方法:
枚举每一个后缀,第i个后缀对答案的贡献为\(len−sa[i]+1−height[i]\)。
