「JLOI2014」松鼠的新家
传送门
两种做法:
- 树上差分 \(O(n)\)
- 树链剖分 \(O(nlogn)\)
树剖比较好写而且无脑,树上差分复杂度优秀一些但是会有点难调。
这里给出树剖写法:
唯一要讲的就是记得每次都把路径终点的贡献 \(-1\)
参考代码:
/*--------------------------------
Code name: E.cpp
Author: The Ace Bee
This code is made by The Ace Bee
--------------------------------*/
#include
#define rg register
#define file(x) \
freopen(x".in", "r", stdin); \
freopen(x".out", "w", stdout);
const int $ = 500010;
inline void swap(int& a, int& b) { int t = a; a = b; b = t; }
inline int read() {
int s = 0; bool f = false; char c = getchar();
while (c < '0' || c > '9') f |= (c == '-'), c = getchar();
while (c >= '0' && c <= '9') s = (s << 3) + (s << 1) + (c ^ 48), c = getchar();
return f ? -s : s;
}
int n, a[$];
int tot, head[$], nxt[$ << 1], ver[$ << 1];
inline void Add_edge(int u, int v)
{ nxt[++tot] = head[u], head[u] = tot, ver[tot] = v; }
int siz[$], son[$], dep[$];
int top[$], rev[$], seg[$], father[$];
int sum[$ << 2], tag[$ << 2];
inline int lc(int rt) { return rt << 1; }
inline int rc(int rt) { return rt << 1 | 1; }
inline void pushup(int rt) {
sum[rt] = sum[lc(rt)] + sum[rc(rt)];
}
inline void f(int rt, int l, int r, int v) {
tag[rt] += v, sum[rt] += v * (r - l + 1);
}
inline void pushdown(int rt, int l, int r, int mid) {
if (tag[rt]) f(lc(rt), l, mid, tag[rt]), f(rc(rt), mid + 1, r, tag[rt]), tag[rt] = 0;
}
inline void update(int rt, int l, int r, int x, int y, int v) {
if (x <= l && r <= y) return f(rt, l, r, v);
int mid = (l + r) >> 1;
pushdown(rt, l, r, mid);
if (x <= mid) update(lc(rt), l, mid, x, y, v);
if (y > mid) update(rc(rt), mid + 1, r, x, y, v);
pushup(rt);
}
inline int query(int rt, int l, int r, int id) {
if (l == r) return sum[rt];
int mid = (l + r) >> 1, res;
pushdown(rt, l, r, mid);
if (id <= mid) res = query(lc(rt), l, mid, id);
else res = query(rc(rt), mid + 1, r, id);
return res;
}
inline void dfs1(int u, int fa) {
siz[u] = 1, father[u] = fa, dep[u] = dep[fa] + 1;
for (rg int v, i = head[u]; i; i = nxt[i])
if (!dep[v = ver[i]]) {
dfs1(v, u), siz[u] += siz[v];
if (siz[v] > siz[son[u]]) son[u] = v;
}
}
inline void dfs2(int u, int topf) {
top[rev[seg[u] = ++seg[0]] = u] = topf;
if (!son[u]) return; dfs2(son[u], topf);
for (rg int v, i = head[u]; i; i = nxt[i])
if (!top[v = ver[i]]) dfs2(v, v);
}
inline void uptRange(int x, int y, int v) {
int fx = top[x], fy = top[y];
while (fx != fy) {
if (dep[fx] < dep[fy]) swap(x, y), swap(fx, fy);
update(1, 1, n, seg[fx], seg[x], v);
x = father[fx], fx = top[x];
}
if (dep[x] > dep[y]) swap(x, y);
update(1, 1, n, seg[x], seg[y], v);
}
int main() {
// file("E");
n = read();
for (rg int i = 1; i <= n; ++i) a[i] = read();
for (rg int u, v, i = 1; i <= n - 1; ++i)
u = read(), v = read(), Add_edge(u, v), Add_edge(v, u);
dfs1(1, 0), dfs2(1, 1);
for (rg int i = 1; i < n; ++i)
uptRange(a[i], a[i + 1], 1), uptRange(a[i + 1], a[i + 1], -1);
for (rg int i = 1; i <= n; ++i)
printf("%d\n", query(1, 1, n, seg[i]));
return 0;
}