[ONTAK2010]Peaks kruskal重构树,主席树
[ONTAK2010]Peaks
kruskal重构树练手题。
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看到“询问从点\(v\)开始只经过困难值小于等于\(x\)的路径”,马上想到kruskal重构树。先把重构树搞出来,可以先用类似NOI2018归程(题解)的方法处理,然后把叶子节点按dfs序放到序列上,重构树上每个点的子树的叶子节点在序列上是连续的,预处理出每个点的子树在序列上对应的左右端点,问题就变成了静态区间第\(k\)大,直接主席树。
#include <cstdio>
#include <cctype>
#include <algorithm>
#define R register
#define I inline
#define B 1000000
using namespace std;
const int N = 200003, M = 500003;
char buf[B], *p1, *p2;
I char gc() { return p1 == p2 && (p2 = (p1 = buf) + fread(buf, 1, B, stdin), p1 == p2) ? EOF : *p1++; }
I int rd() {
R int f = 0;
R char c = gc();
while (c < 48 || c > 57)
c = gc();
while (c > 47 && c < 58)
f = f * 10 + (c ^ 48), c = gc();
return f;
}
int a[N], b[N], f[N], rot[N], dep[N], fa[N][20], son[N][2], val[N], id[N], l[N], r[N], n, tim, T;
struct edge { int u, v, w; }g[M];
struct segtree { int p, q, s; }e[N << 5];
I int operator < (edge x, edge y) { return x.w < y.w; }
I int find(int x) {
R int r = x, y;
while (f[r] ^ r)
r = f[r];
while (x ^ r)
y = f[x], f[x] = r, x = y;
return r;
}
void dfs(int x) {
dep[x] = dep[fa[x][0]] + 1;
for (R int i = 1; i < 20; ++i)
fa[x][i] = fa[fa[x][i - 1]][i - 1];
if (x <= n) {
id[++tim] = x, l[x] = r[x] = tim;
return ;
}
dfs(son[x][0]), dfs(son[x][1]), l[x] = l[son[x][0]], r[x] = r[son[x][1]];
}
void build(int &k, int l, int r) {
k = ++T;
if (l == r)
return ;
R int m = l + r >> 1;
build(e[k].p, l, m), build(e[k].q, m + 1, r);
}
int modify(int k, int l, int r, int x) {
R int t = ++T;
e[t].p = e[k].p, e[t].q = e[k].q, e[t].s = e[k].s + 1;
if (l == r)
return t;
R int m = l + r >> 1;
if (x <= m)
e[t].p = modify(e[k].p, l, m, x);
else
e[t].q = modify(e[k].q, m + 1, r, x);
return t;
}
int query(int k, int t, int l, int r, int x) {
if (l == r)
return x <= e[t].s - e[k].s ? l : -1;
R int m = l + r >> 1, y = e[e[t].q].s - e[e[k].q].s;
if (x > y)
return query(e[k].p, e[t].p, l, m, x - y);
else
return query(e[k].q, e[t].q, m + 1, r, x);
}
int main() {
R int S, m, Q, i, x, y, z, cnt;
cnt = n = rd(), m = rd(), Q = rd();
for (i = 1; i <= n; ++i)
f[i] = i, a[i] = b[i] = rd();
sort(b + 1, b + n + 1), S = unique(b + 1, b + n + 1) - b - 1, build(rot[0], 1, S);
for (i = 1; i <= m; ++i)
g[i] = (edge){rd(), rd(), rd()};
sort(g + 1, g + m + 1);
for (i = 1; i <= m; ++i) {
x = find(g[i].u), y = find(g[i].v);
if (x ^ y) {
val[++cnt] = g[i].w, f[cnt] = f[x] = f[y] = cnt;
son[cnt][0] = x, son[cnt][1] = y, fa[x][0] = fa[y][0] = cnt;
}
}
dfs(cnt);
for (i = 1; i <= n; ++i)
rot[i] = modify(rot[i - 1], 1, S, lower_bound(b + 1, b + S + 1, a[id[i]]) - b);
while (Q--) {
x = rd(), y = rd(), z = rd();
for (i = 19; ~i; --i)
if (dep[x] - (1 << i) > 0 && val[fa[x][i]] <= y)
x = fa[x][i];
z = query(rot[l[x] - 1], rot[r[x]], 1, S, z);
printf("%d\n", ~z ? b[z] : -1);
}
return 0;
}