最短路
原题链接
以(1)为起点在正图上跑(SPFA)或(Dijkstra),求出(dis1[x]),表示从(1)到节点(x)的所有路径中,经过权值最小的节点的权值;再以(n)为起点在反图上跑(SPFA)或(Dijkstra),求出(dis2[x]),表示从(n)到节点(x)的所有路径中,经过权值最大的节点的权值。
最后枚举节点,求(max{dis2[x]-dis1[x]})即可。
#include<cstdio>
#include<cstring>
using namespace std;
const int N = 1e5 + 10;
const int M = 5e5 + 10;
int fi[N], di[M << 1], pr[N], ne[M << 1], dis[N], disf[N], fif[N], dif[M << 1], nef[M << 1], q[M << 1], l, lf;
bool v[N];
int re()
{
int x = 0;
char c = getchar();
bool p = 0;
for (; c<'0' || c>'9'; c = getchar())
p |= c == '-';
for (; c >= '0'&&c <= '9'; c = getchar())
x = x * 10 + (c - '0');
return p ? -x : x;
}
inline void add(int x, int y)
{
di[++l] = y;
ne[l] = fi[x];
fi[x] = l;
}
inline void addf(int x, int y)
{
dif[++lf] = y;
nef[lf] = fif[x];
fif[x] = lf;
}
inline int minn(int x, int y)
{
return x < y ? x : y;
}
inline int maxn(int x, int y)
{
return x > y ? x : y;
}
int main()
{
int i, n, m, x, y, head = 0, tail = 1, ma = 0;
n = re();
m = re();
for (i = 1; i <= n; i++)
pr[i] = re();
for (i = 1; i <= m; i++)
{
x = re();
y = re();
if (re() == 1)
{
add(x, y);
addf(y, x);
}
else
{
add(x, y);
add(y, x);
addf(x, y);
addf(y, x);
}
}
memset(dis, 60, sizeof(dis));
q[1] = 1;
dis[1] = pr[1];
while (head != tail)
{
x = q[++head];
v[x] = 0;
for (i = fi[x]; i; i = ne[i])
{
y = di[i];
if (dis[y] > minn(dis[x], pr[y]))
{
dis[y] = minn(dis[x], pr[y]);
if (!v[y])
{
q[++tail] = y;
v[y] = 1;
}
}
}
}
memset(v, 0, sizeof(v));
head = 0;
tail = 1;
q[1] = n;
disf[n] = pr[n];
while (head != tail)
{
x = q[++head];
v[x] = 0;
for (i = fif[x]; i; i = nef[i])
{
y = dif[i];
if (disf[y] < maxn(disf[x], pr[y]))
{
disf[y] = maxn(disf[x], pr[y]);
if (!v[y])
{
q[++tail] = y;
v[y] = 1;
}
}
}
}
for (i = 1; i <= n; i++)
ma = maxn(ma, disf[i] - dis[i]);
printf("%d", ma);
return 0;
}