Fu_L's Library
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verify/library_checker/graph/shortest_path.test.cpp
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- Last update: 2024-11-09 01:34:39+09:00
- Problem: https://judge.yosupo.jp/problem/shortest_path
Depends on
- dijkstra
(src/graph/dijkstra.hpp)
- Graph
(src/graph/graph_template.hpp)
- template
(src/template/template.hpp)
Code
#define PROBLEM "https://judge.yosupo.jp/problem/shortest_path"
#include "../../../src/template/template.hpp"
#include "../../../src/graph/graph_template.hpp"
#include "../../../src/graph/dijkstra.hpp"
int main(void) {
int n, m, s, t;
cin >> n >> m >> s >> t;
Graph<ll> g(n);
rep(i, 0, m) {
int a, b, c;
cin >> a >> b >> c;
g.add_directed_edge(a, b, c);
}
vector<pair<ll, int>> d = dijkstra(g, s);
if(d[t].first == numeric_limits<ll>::max()) {
cout << -1 << '\n';
return 0;
}
vector<int> path;
int cur = t;
path.push_back(cur);
while(d[cur].second != -1) {
cur = d[cur].second;
path.push_back(cur);
}
reverse(path.begin(), path.end());
cout << d[t].first << ' ' << (int)path.size() - 1 << '\n';
rep(i, 0, (int)path.size() - 1) {
cout << path[i] << ' ' << path[i + 1] << '\n';
}
}#line 1 "verify/library_checker/graph/shortest_path.test.cpp"
#define PROBLEM "https://judge.yosupo.jp/problem/shortest_path"
#line 2 "src/template/template.hpp"
#include <bits/stdc++.h>
using namespace std;
using ll = long long;
using P = pair<long long, long long>;
#define rep(i, a, b) for(long long i = (a); i < (b); ++i)
#define rrep(i, a, b) for(long long i = (a); i >= (b); --i)
constexpr long long inf = 4e18;
struct SetupIO {
SetupIO() {
ios::sync_with_stdio(0);
cin.tie(0);
cout << fixed << setprecision(30);
}
} setup_io;
#line 3 "src/graph/graph_template.hpp"
template <typename T>
struct Edge {
int from, to;
T cost;
int idx;
Edge()
: from(-1), to(-1), cost(-1), idx(-1) {}
Edge(const int from, const int to, const T& cost = 1, const int idx = -1)
: from(from), to(to), cost(cost), idx(idx) {}
operator int() const {
return to;
}
};
template <typename T>
struct Graph {
Graph(const int N)
: n(N), es(0), g(N) {}
int size() const {
return n;
}
int edge_size() const {
return es;
}
void add_edge(const int from, const int to, const T& cost = 1) {
assert(0 <= from and from < n);
assert(0 <= to and to < n);
g[from].emplace_back(from, to, cost, es);
g[to].emplace_back(to, from, cost, es++);
}
void add_directed_edge(const int from, const int to, const T& cost = 1) {
assert(0 <= from and from < n);
assert(0 <= to and to < n);
g[from].emplace_back(from, to, cost, es++);
}
inline vector<Edge<T>>& operator[](const int& k) {
assert(0 <= k and k < n);
return g[k];
}
inline const vector<Edge<T>>& operator[](const int& k) const {
assert(0 <= k and k < n);
return g[k];
}
private:
int n, es;
vector<vector<Edge<T>>> g;
};
template <typename T>
using Edges = vector<Edge<T>>;
#line 4 "src/graph/dijkstra.hpp"
template <typename T>
vector<pair<T, int>> dijkstra(const Graph<T>& g, const int s = 0) {
const int n = g.size();
assert(0 <= s and s < n);
vector<pair<T, int>> d(n, {numeric_limits<T>::max(), -1});
priority_queue<pair<T, int>, vector<pair<T, int>>, greater<pair<T, int>>> pq;
d[s] = {0, -1};
pq.emplace(0, s);
while(!pq.empty()) {
const auto [dist, cur] = pq.top();
pq.pop();
if(d[cur].first < dist) continue;
for(const Edge<T>& e : g[cur]) {
if(d[e.to].first > d[cur].first + e.cost) {
d[e.to] = {d[cur].first + e.cost, cur};
pq.emplace(d[e.to].first, e.to);
}
}
}
return d;
}
#line 5 "verify/library_checker/graph/shortest_path.test.cpp"
int main(void) {
int n, m, s, t;
cin >> n >> m >> s >> t;
Graph<ll> g(n);
rep(i, 0, m) {
int a, b, c;
cin >> a >> b >> c;
g.add_directed_edge(a, b, c);
}
vector<pair<ll, int>> d = dijkstra(g, s);
if(d[t].first == numeric_limits<ll>::max()) {
cout << -1 << '\n';
return 0;
}
vector<int> path;
int cur = t;
path.push_back(cur);
while(d[cur].second != -1) {
cur = d[cur].second;
path.push_back(cur);
}
reverse(path.begin(), path.end());
cout << d[t].first << ' ' << (int)path.size() - 1 << '\n';
rep(i, 0, (int)path.size() - 1) {
cout << path[i] << ' ' << path[i + 1] << '\n';
}
}