#include <bits/stdc++.h>
using namespace std;
using lint = long long;
const int MAXN = 205;
const int MAXM = 50005;
int N, M;
vector<int> adj[MAXN];
vector<int> radj[MAXN];
vector<array<int, 4>> edge;
int par[5][MAXN];
lint dist[5][MAXN];
int sptree[5][MAXM];
lint Dijkstra(int s, int k, vector<int> a[MAXN], int block = -1, int ru = -1, int rv = -1, int rc = -1, int target = -1) {
for (int i = 0; i < MAXN; i++) {
dist[k][i] = 1e18;
}
priority_queue<pair<lint, int>, vector<pair<lint, int>>, greater<pair<lint, int>>> pq;
pq.emplace(0, s);
auto dt = dist[k];
auto pr = par[k];
dt[s] = 0;
pr[s] = -1;
while (!pq.empty()) {
int u = pq.top().second;
lint d = pq.top().first;
pq.pop();
if (dt[u] != d) {
continue;
}
if (u == target) {
return d;
}
if (pr[u] != -1) {
sptree[k][pr[u]] = 1;
}
for (auto e : a[u]) if (e != block) {
int v = edge[e][0] ^ edge[e][1] ^ u;
if (dt[v] > dt[u] + edge[e][2]) {
dt[v] = dt[u] + edge[e][2];
pr[v] = e;
pq.emplace(dt[v], v);
}
}
if (u == ru) {
int v = rv;
if (dt[v] > dt[u] + rc) {
dt[v] = dt[u] + rc;
pr[v] = block;
pq.emplace(dt[v], v);
}
}
}
return 1e18;
}
int main() {
ios::sync_with_stdio(0);
cin.tie(0), cout.tie(0);
cin >> N >> M;
for (int i = 0; i < M; i++) {
int u, v, c, d;
cin >> u >> v >> c >> d;
edge.push_back({u, v, c, d});
adj[u].emplace_back(i);
radj[v].emplace_back(i);
}
Dijkstra(1, 0, adj); // 1 to N
Dijkstra(N, 1, adj); // N to 1
Dijkstra(1, 2, radj); // 1 to N, reverse
Dijkstra(N, 3, radj); // N to 1, reverse
lint ans = dist[0][N] + dist[1][1];
for (int i = 0; i < M; i++) {
int u, v, c, d;
u = edge[i][0], v = edge[i][1], c = edge[i][2], d = edge[i][3];
// if (sptree[0][i] == 0 && sptree[1][i] == 0) {
// ans = min(ans, d + min(dist[0][N], dist[0][v] + c + dist[2][u]) +
min(dist[1][1], dist[1][v] + c + dist[3][u]));
// } else {
ans = min(ans, d + Dijkstra(1, 4, adj, i, v, u, c, N) + Dijkstra(N, 4, adj, i, v, u, c, 1));
// }
}
if (ans > 1e17) {
ans = -1;
}
cout << ans << "\n";
return 0;
}
Compilation message
ho_t4.cpp: In function 'int main()':
ho_t4.cpp:84:70: error: expected ';' before ')' token
min(dist[1][1], dist[1][v] + c + dist[3][u]));
^