結果
| 問題 | No.1790 Subtree Deletion |
| コンテスト | |
| ユーザー |
 kuhaku
|
| 提出日時 | 2026-04-02 06:22:45 |
| 言語 | C++23 (gcc 15.2.0 + boost 1.89.0) |
| 結果 |
AC
|
| 実行時間 | 702 ms / 3,000 ms |
| コード長 | 18,496 bytes |
| 記録 | |
| コンパイル時間 | 3,892 ms |
| コンパイル使用メモリ | 389,384 KB |
| 実行使用メモリ | 409,736 KB |
| 最終ジャッジ日時 | 2026-04-02 06:22:57 |
| 合計ジャッジ時間 | 11,912 ms |
|
ジャッジサーバーID (参考情報) |
judge3_0 / judge2_1 |
(要ログイン)
| ファイルパターン | 結果 |
|---|---|
| sample | AC * 3 |
| other | AC * 12 |
ソースコード
// competitive-verifier: PROBLEM
#pragma GCC optimize("Ofast,fast-math,unroll-all-loops")
#include <bits/stdc++.h>
#if !defined(ATCODER) && !defined(EVAL)
#pragma GCC target("sse4.2,avx2,bmi2")
#endif
template <class T, class U>
constexpr bool chmax(T &a, const U &b) {
return a < (T)b ? a = (T)b, true : false;
}
template <class T, class U>
constexpr bool chmin(T &a, const U &b) {
return (T)b < a ? a = (T)b, true : false;
}
constexpr std::int64_t INF = 1000000000000000003;
constexpr int Inf = 1000000003;
constexpr double EPS = 1e-7;
constexpr double PI = 3.14159265358979323846;
#define FOR(i, m, n) for (int i = (m); i < int(n); ++i)
#define FORR(i, m, n) for (int i = (m) - 1; i >= int(n); --i)
#define FORL(i, m, n) for (std::int64_t i = (m); i < std::int64_t(n); ++i)
#define rep(i, n) FOR (i, 0, n)
#define repn(i, n) FOR (i, 1, n + 1)
#define repr(i, n) FORR (i, n, 0)
#define repnr(i, n) FORR (i, n + 1, 1)
#define all(s) (s).begin(), (s).end()
struct Sonic {
Sonic() {
std::ios::sync_with_stdio(false);
std::cin.tie(nullptr);
std::cout << std::fixed << std::setprecision(20);
}
constexpr void operator()() const {}
} sonic;
struct increment_impl {
template <class T>
const increment_impl &operator>>(std::vector<T> &v) const {
for (auto &x : v) ++x;
return *this;
}
} Inc;
struct decrement_impl {
template <class T>
const decrement_impl &operator>>(std::vector<T> &v) const {
for (auto &x : v) --x;
return *this;
}
} Dec;
struct sort_impl {
template <class T>
const sort_impl &operator>>(std::vector<T> &v) const {
std::sort(v.begin(), v.end());
return *this;
}
} Sort;
struct unique_impl {
template <class T>
const unique_impl &operator>>(std::vector<T> &v) const {
std::sort(v.begin(), v.end());
v.erase(std::unique(v.begin(), v.end()), v.end());
return *this;
}
} Uniq;
using namespace std;
using ll = std::int64_t;
using ld = long double;
template <class T, class U>
std::istream &operator>>(std::istream &is, std::pair<T, U> &p) {
return is >> p.first >> p.second;
}
template <class T>
std::istream &operator>>(std::istream &is, std::vector<T> &v) {
for (T &i : v) is >> i;
return is;
}
template <class T, class U>
std::ostream &operator<<(std::ostream &os, const std::pair<T, U> &p) {
return os << '(' << p.first << ',' << p.second << ')';
}
template <class T>
std::ostream &operator<<(std::ostream &os, const std::vector<T> &v) {
for (auto it = v.begin(); it != v.end(); ++it) os << (it == v.begin() ? "" : " ") << *it;
return os;
}
template <class Head, class... Tail>
void co(Head &&head, Tail &&...tail) {
if constexpr (sizeof...(tail) == 0) std::cout << head << '\n';
else std::cout << head << ' ', co(std::forward<Tail>(tail)...);
}
template <class Head, class... Tail>
void ce(Head &&head, Tail &&...tail) {
if constexpr (sizeof...(tail) == 0) std::cerr << head << '\n';
else std::cerr << head << ' ', ce(std::forward<Tail>(tail)...);
}
void Yes(bool is_correct = true) { std::cout << (is_correct ? "Yes\n" : "No\n"); }
void No(bool is_not_correct = true) { Yes(!is_not_correct); }
void YES(bool is_correct = true) { std::cout << (is_correct ? "YES\n" : "NO\n"); }
void NO(bool is_not_correct = true) { YES(!is_not_correct); }
void Takahashi(bool is_correct = true) { std::cout << (is_correct ? "Takahashi" : "Aoki") << '\n'; }
void Aoki(bool is_not_correct = true) { Takahashi(!is_not_correct); }
/// @brief 重み付きグラフ
template <class T>
struct Graph {
private:
struct _edge {
constexpr _edge() : _from(), _to(), _weight() {}
constexpr _edge(int from, int to, T weight) : _from(from), _to(to), _weight(weight) {}
constexpr bool operator<(const _edge &rhs) const { return weight() < rhs.weight(); }
constexpr bool operator>(const _edge &rhs) const { return rhs < *this; }
constexpr int from() const { return _from; }
constexpr int to() const { return _to; }
constexpr T weight() const { return _weight; }
private:
int _from, _to;
T _weight;
};
public:
using edge_type = typename Graph<T>::_edge;
Graph() : _size(), edges() {}
Graph(int v) : _size(v), edges(v) {}
const auto &operator[](int i) const { return edges[i]; }
auto &operator[](int i) { return edges[i]; }
const auto begin() const { return edges.begin(); }
auto begin() { return edges.begin(); }
const auto end() const { return edges.end(); }
auto end() { return edges.end(); }
constexpr int size() const { return _size; }
void add_edge(const edge_type &e) { edges[e.from()].emplace_back(e); }
void add_edge(int from, int to, T weight = T(1)) { edges[from].emplace_back(from, to, weight); }
void add_edges(int from, int to, T weight = T(1)) {
edges[from].emplace_back(from, to, weight);
edges[to].emplace_back(to, from, weight);
}
void input_edge(int m, int base = 1) {
for (int i = 0; i < m; ++i) {
int from, to;
T weight;
std::cin >> from >> to >> weight;
add_edge(from - base, to - base, weight);
}
}
void input_edges(int m, int base = 1) {
for (int i = 0; i < m; ++i) {
int from, to;
T weight;
std::cin >> from >> to >> weight;
add_edges(from - base, to - base, weight);
}
}
private:
int _size;
std::vector<std::vector<edge_type>> edges;
};
/// @brief 重みなしグラフ
template <>
struct Graph<void> {
private:
struct _edge {
constexpr _edge() : _from(), _to() {}
constexpr _edge(int from, int to) : _from(from), _to(to) {}
constexpr int from() const { return _from; }
constexpr int to() const { return _to; }
constexpr int weight() const { return 1; }
constexpr bool operator<(const _edge &rhs) const { return weight() < rhs.weight(); }
constexpr bool operator>(const _edge &rhs) const { return rhs < *this; }
private:
int _from, _to;
};
public:
using edge_type = typename Graph<void>::_edge;
Graph() : _size(), edges() {}
Graph(int v) : _size(v), edges(v) {}
const auto &operator[](int i) const { return edges[i]; }
auto &operator[](int i) { return edges[i]; }
const auto begin() const { return edges.begin(); }
auto begin() { return edges.begin(); }
const auto end() const { return edges.end(); }
auto end() { return edges.end(); }
constexpr int size() const { return _size; }
void add_edge(const edge_type &e) { edges[e.from()].emplace_back(e); }
void add_edge(int from, int to) { edges[from].emplace_back(from, to); }
void add_edges(int from, int to) {
edges[from].emplace_back(from, to);
edges[to].emplace_back(to, from);
}
void input_edge(int m, int base = 1) {
for (int i = 0; i < m; ++i) {
int from, to;
std::cin >> from >> to;
add_edge(from - base, to - base);
}
}
void input_edges(int m, int base = 1) {
for (int i = 0; i < m; ++i) {
int from, to;
std::cin >> from >> to;
add_edges(from - base, to - base);
}
}
private:
int _size;
std::vector<std::vector<edge_type>> edges;
};
template <class T>
struct Add {
using value_type = T;
static constexpr T id() { return T(); }
static constexpr T op(const T &lhs, const T &rhs) { return lhs + rhs; }
template <class U>
static constexpr U f(T lhs, U rhs) {
return lhs + rhs;
}
};
template <class T>
struct Mul {
using value_type = T;
static constexpr T id() { return T(1); }
static constexpr T op(const T &lhs, const T &rhs) { return lhs * rhs; }
template <class U>
static constexpr U f(T lhs, U rhs) {
return lhs * rhs;
}
};
template <class T>
struct And {
using value_type = T;
static constexpr T id() { return std::numeric_limits<T>::max(); }
static constexpr T op(const T &lhs, const T &rhs) { return lhs & rhs; }
template <class U>
static constexpr U f(T lhs, U rhs) {
return lhs & rhs;
}
};
template <class T>
struct Or {
using value_type = T;
static constexpr T id() { return T(); }
static constexpr T op(const T &lhs, const T &rhs) { return lhs | rhs; }
template <class U>
static constexpr U f(T lhs, U rhs) {
return lhs | rhs;
}
};
template <class T>
struct Xor {
using value_type = T;
static constexpr T id() { return T(); }
static constexpr T op(const T &lhs, const T &rhs) { return lhs ^ rhs; }
template <class U>
static constexpr U f(T lhs, U rhs) {
return lhs ^ rhs;
}
};
template <class T>
struct Min {
using value_type = T;
static constexpr T id() { return std::numeric_limits<T>::max(); }
static constexpr T op(const T &lhs, const T &rhs) { return std::min(lhs, rhs); }
template <class U>
static constexpr U f(T lhs, U rhs) {
return std::min((U)lhs, rhs);
}
};
template <class T>
struct Max {
using value_type = T;
static constexpr T id() { return std::numeric_limits<T>::lowest(); }
static constexpr T op(const T &lhs, const T &rhs) { return std::max(lhs, rhs); }
template <class U>
static constexpr U f(T lhs, U rhs) {
return std::max((U)lhs, rhs);
}
};
template <class T>
struct Gcd {
using value_type = T;
static constexpr T id() { return std::numeric_limits<T>::max(); }
static constexpr T op(const T &lhs, const T &rhs) {
return lhs == Gcd::id() ? rhs : (rhs == Gcd::id() ? lhs : std::gcd(lhs, rhs));
}
};
template <class T>
struct Lcm {
using value_type = T;
static constexpr T id() { return std::numeric_limits<T>::max(); }
static constexpr T op(const T &lhs, const T &rhs) {
return lhs == Lcm::id() ? rhs : (rhs == Lcm::id() ? lhs : std::lcm(lhs, rhs));
}
};
template <class T>
struct Update {
using value_type = T;
static constexpr T id() { return std::numeric_limits<T>::max(); }
static constexpr T op(const T &lhs, const T &rhs) { return lhs == Update::id() ? rhs : lhs; }
template <class U>
static constexpr U f(T lhs, U rhs) {
return lhs == Update::id() ? rhs : lhs;
}
};
template <class T>
struct Affine {
using P = std::pair<T, T>;
using value_type = P;
static constexpr P id() { return P(1, 0); }
static constexpr P op(P lhs, P rhs) { return {lhs.first * rhs.first, rhs.first * lhs.second + rhs.second}; }
};
template <class M>
struct Rev {
using T = typename M::value_type;
using value_type = T;
static constexpr T id() { return M::id(); }
static constexpr T op(T lhs, T rhs) { return M::op(rhs, lhs); }
};
// Euler Tour Tree
template <class M>
struct euler_tour_tree {
using T = typename M::value_type;
struct node_t {
int u, v;
T val, sum;
int sz;
node_t *par, *l, *r;
node_t(int _u, int _v, const T& _val = M::id())
: u(_u), v(_v), val(_val), sum(_val), sz(u == v ? 1 : 0), par(nullptr), l(nullptr), r(nullptr) {}
};
int n;
std::vector<node_t*> vertex_node;
std::map<std::pair<int, int>, node_t*> edge_node;
euler_tour_tree(int _n) : n(_n) {
vertex_node.resize(n, nullptr);
for (int i = 0; i < n; ++i) {
vertex_node[i] = new node_t(i, i);
}
}
euler_tour_tree(const std::vector<T>& v) : n(v.size()) {
vertex_node.resize(n, nullptr);
for (int i = 0; i < n; ++i) {
vertex_node[i] = new node_t(i, i, v[i]);
}
}
~euler_tour_tree() {
for (auto nd : vertex_node) delete nd;
for (auto& p : edge_node) delete p.second;
}
bool is_root(node_t* t) {
return !t->par;
}
void update(node_t* t) {
if (!t) return;
t->sum = t->val;
t->sz = (t->u == t->v) ? 1 : 0;
if (t->l) {
t->sum = M::op(t->l->sum, t->sum);
t->sz += t->l->sz;
}
if (t->r) {
t->sum = M::op(t->sum, t->r->sum);
t->sz += t->r->sz;
}
}
void rotate(node_t* t) {
node_t* p = t->par;
node_t* pp = p->par;
if (p->l == t) {
p->l = t->r;
if (t->r) t->r->par = p;
t->r = p;
} else {
p->r = t->l;
if (t->l) t->l->par = p;
t->l = p;
}
p->par = t;
t->par = pp;
if (pp) {
if (pp->l == p) pp->l = t;
else pp->r = t;
}
update(p);
update(t);
}
void splay(node_t* t) {
if (!t) return;
while (!is_root(t)) {
node_t* p = t->par;
if (!is_root(p)) {
node_t* pp = p->par;
if ((pp->l == p) == (p->l == t)) rotate(p);
else rotate(t);
}
rotate(t);
}
}
node_t* join(node_t* l, node_t* r) {
if (!l) return r;
if (!r) return l;
while (l->r) l = l->r;
splay(l);
l->r = r;
r->par = l;
update(l);
return l;
}
void reroot(int v) {
node_t* nd = vertex_node[v];
splay(nd);
node_t* l = nd->l;
if (l) {
l->par = nullptr;
nd->l = nullptr;
update(nd);
join(nd, l);
}
}
void link(int u, int v) {
reroot(u);
reroot(v);
node_t* uv = new node_t(u, v);
node_t* vu = new node_t(v, u);
edge_node[{u, v}] = uv;
edge_node[{v, u}] = vu;
node_t* tu = vertex_node[u];
node_t* tv = vertex_node[v];
splay(tu);
splay(tv);
join(tu, join(uv, join(tv, vu)));
}
void cut(int u, int v) {
node_t* uv = edge_node[{u, v}];
node_t* vu = edge_node[{v, u}];
edge_node.erase({u, v});
edge_node.erase({v, u});
reroot(u);
splay(vu);
node_t* C = vu->r;
node_t* AB_uv = vu->l;
if (C) C->par = nullptr;
if (AB_uv) AB_uv->par = nullptr;
vu->l = vu->r = nullptr;
update(vu);
splay(uv);
node_t* B = uv->r;
node_t* A = uv->l;
if (B) B->par = nullptr;
if (A) A->par = nullptr;
uv->l = uv->r = nullptr;
update(uv);
join(A, C);
delete uv;
delete vu;
}
node_t* get_root(node_t* t) {
if (!t) return nullptr;
splay(t);
while (t->l) t = t->l;
splay(t);
return t;
}
bool same(int u, int v) {
return get_root(vertex_node[u]) == get_root(vertex_node[v]);
}
void set(int u, const T& val) {
node_t* nd = vertex_node[u];
splay(nd);
nd->val = val;
update(nd);
}
T get(int u) {
node_t* nd = vertex_node[u];
splay(nd);
return nd->val;
}
T get_subtree(int v, int p = -1) {
if (p == -1 || p == v) {
node_t* nd = vertex_node[v];
splay(nd);
return nd->sum;
}
auto it_pv = edge_node.find({p, v});
assert(it_pv != edge_node.end());
node_t* pv = it_pv->second;
node_t* vp = edge_node[{v, p}];
reroot(p);
splay(vp);
node_t* C = vp->r;
node_t* AB_pv = vp->l;
if (C) C->par = nullptr;
if (AB_pv) AB_pv->par = nullptr;
vp->l = vp->r = nullptr;
update(vp);
splay(pv);
node_t* B = pv->r;
node_t* A = pv->l;
if (B) B->par = nullptr;
if (A) A->par = nullptr;
pv->l = pv->r = nullptr;
update(pv);
T res = B ? B->sum : M::id();
pv->l = A; if (A) A->par = pv;
pv->r = B; if (B) B->par = pv;
update(pv);
vp->l = pv; pv->par = vp;
vp->r = C; if (C) C->par = vp;
update(vp);
return res;
}
int get_size(int v, int p = -1) {
if (p == -1 || p == v) {
node_t* nd = vertex_node[v];
splay(nd);
return nd->sz;
}
auto it_pv = edge_node.find({p, v});
assert(it_pv != edge_node.end());
node_t* pv = it_pv->second;
node_t* vp = edge_node[{v, p}];
reroot(p);
splay(vp);
node_t* C = vp->r;
node_t* AB_pv = vp->l;
if (C) C->par = nullptr;
if (AB_pv) AB_pv->par = nullptr;
vp->l = vp->r = nullptr;
update(vp);
splay(pv);
node_t* B = pv->r;
node_t* A = pv->l;
if (B) B->par = nullptr;
if (A) A->par = nullptr;
pv->l = pv->r = nullptr;
update(pv);
int res = B ? B->sz : 0;
pv->l = A; if (A) A->par = pv;
pv->r = B; if (B) B->par = pv;
update(pv);
vp->l = pv; pv->par = vp;
vp->r = C; if (C) C->par = vp;
update(vp);
return res;
}
};
void solve() {
int n;
cin >> n;
vector<tuple<int, int, ll>> edge(n - 1);
for (auto& [u, v, x] : edge) {
cin >> u >> v >> x;
--u, --v;
}
Graph<void> g(2 * n - 1);
vector<ll> a(2 * n - 1);
rep (i, n - 1) {
auto [u, v, x] = edge[i];
g.add_edges(u, n + i);
g.add_edges(v, n + i);
a[n + i] = x;
}
vector<int> par(2 * n - 1, -1);
auto dfs = [&](auto self, int x, int p) -> void {
par[x] = p;
for (auto e : g[x]) {
if (e.to() == p)
continue;
self(self, e.to(), x);
}
};
dfs(dfs, 0, -1);
euler_tour_tree<Xor<ll>> et(a);
rep (i, n - 1) {
auto [u, v, x] = edge[i];
et.link(u, n + i);
et.link(v, n + i);
}
int q;
cin >> q;
while (q--) {
int t, x;
cin >> t >> x;
--x;
if (t == 1) {
if (et.same(x, 0)) {
et.cut(par[x], par[par[x]]);
}
} else {
if (!et.same(x, 0)) {
co(0);
} else {
co(et.get_subtree(x, par[x]));
}
}
}
}
int main(void) {
int t = 1;
// std::cin >> t;
while (t--) solve();
return 0;
}