SGU 194. Reactor Cooling

194. Reactor Cooling

time limit per test: 0.5 sec.
memory limit per test: 65536 KB

input: standard
output: standard

The terrorist group leaded by a well known international terrorist Ben Bladen is buliding a nuclear reactor to produce plutonium for the nuclear bomb they are planning to create. Being the wicked computer genius of this group, you are responsible for developing the cooling system for the reactor. 

The cooling system of the reactor consists of the number of pipes that special cooling liquid flows by. Pipes are connected at special points, called nodes, each pipe has the starting node and the end point. The liquid must flow by the pipe from its start point to its end point and not in the opposite direction. 

Let the nodes be numbered from 1 to N. The cooling system must be designed so that the liquid is circulating by the pipes and the amount of the liquid coming to each node (in the unit of time) is equal to the amount of liquid leaving the node. That is, if we designate the amount of liquid going by the pipe from i-th node to j-th as f_ij, (put f_ij = 0 if there is no pipe from node i to node j), for each i the following condition must hold: 


sum(j=1..N, f_ij) = sum(j=1..N, f_ji) 

Each pipe has some finite capacity, therefore for each i and j connected by the pipe must be f_ij ≤ c_ij where c_ij is the capacity of the pipe. To provide sufficient cooling, the amount of the liquid flowing by the pipe going from i-th to j-th nodes must be at least l_ij, thus it must be f_ij ≥ l_ij. 

Given c_ij and l_ij for all pipes, find the amount f_ij, satisfying the conditions specified above. 

Input

The first line of the input file contains the number N (1 ≤ N ≤ 200) - the number of nodes and and M — the number of pipes. The following M lines contain four integer number each - i, j, l_ij and c_ijeach. There is at most one pipe connecting any two nodes and 0 ≤ l_ij ≤ c_ij ≤ 10⁵ for all pipes. No pipe connects a node to itself. If there is a pipe from i-th node to j-th, there is no pipe from j-th node to i-th. 

Output

On the first line of the output file print YES if there is the way to carry out reactor cooling and NO if there is none. In the first case M integers must follow, k-th number being the amount of liquid flowing by the k-th pipe. Pipes are numbered as they are given in the input file. 

Sample test(s)

Input

 

 

Test #1 

4 6 
1 2 1 2 
2 3 1 2 
3 4 1 2 
4 1 1 2 
1 3 1 2 
4 2 1 2 

Test #2 

4 6 
1 2 1 3 
2 3 1 3 
3 4 1 3 
4 1 1 3 
1 3 1 3 
4 2 1 3 

 

 

Output

 

Test #1 

NO 

Test #2 

YES 
1 
2 
3 
2 
1 
1 

分析

无源汇上下界可行流模板题。

每条边的流量就是这条边的反向边的流量+流量下界。

code

#include<cstdio>
#include<algorithm>
#include<cstring>
#include<cmath>
#include<iostream>

using namespace std;

const int N = 20100;
const int INF = 1e9;

struct Edge{
    int to,nxt,c;
}e[500100];
int head[N],dis[N],cur[N],q[N];
int M[N],id[500100],B[500100]; // id存第i条边的编号
int n,m,SS,TT,L,R,Sum,tot;

inline int read() {
    int x = 0,f = 1;char ch = getchar();
    for (; ch<'0'||ch>'9'; ch = getchar()) if (ch=='-') f = -1;
    for (; ch>='0'&&ch<='9'; ch = getchar()) x = x * 10 + ch - '0';
    return x * f;
}
void add_edge(int u,int v,int c) {
    e[++tot].to = v;e[tot].c = c;e[tot].nxt= head[u];head[u] = tot;
}
void init() {
    tot = 1;SS = n+1;TT = n+2;Sum = 0;
}
bool bfs() {
    for (int i=1; i<=n+2; ++i) {
        cur[i] = head[i],dis[i] = -1;
    }
    L = 1;R = 0;
    q[++R] = SS;
    dis[SS] = 0;
    while (L <= R) {
        int u = q[L++];
        for (int i=head[u]; i; i=e[i].nxt) {
            int v = e[i].to;
            if (dis[v] == -1 && e[i].c > 0) {
                dis[v] = dis[u] + 1;
                q[++R] = v;
                if (v == TT) return true;
            }
        }
    }
    return false;
}
int dfs(int u,int flow) {
    if (u == TT) return flow;
    int used = 0;
    for (int &i=cur[u]; i; i=e[i].nxt) {
        int v = e[i].to;
        if (dis[v] == dis[u] + 1 && e[i].c > 0) {
            int tmp = dfs(v,min(e[i].c,flow-used));
            if (tmp > 0) {
                e[i].c -= tmp;e[i^1].c += tmp;
                used += tmp;
                if (used == flow) break;
            }
        }

    }
    if (used != flow) dis[u] = -1;
    return used;
}
int dinic() {
    int ans = 0;
    while (bfs()) ans += dfs(SS,INF);
    return ans;
}

int main() {
    while (~scanf("%d%d",&n,&m)) {
        init();
        for (int i=1; i<=m; ++i) {
            int u = read(),v = read(),b = read(),c = read();
            add_edge(u,v,c-b);
            id[i] = tot;
            add_edge(v,u,0);
            M[u] -= b;M[v] += b;
            B[i] = b;
        }
        for (int i=1; i<=n; ++i) {
            if (M[i] > 0) add_edge(SS,i,M[i]),add_edge(i,SS,0),Sum += M[i];
            if (M[i] < 0) add_edge(i,TT,-M[i]),add_edge(TT,i,0);
        }
        int ans = dinic();
        if (ans == Sum) {
            puts("YES");
            for (int i=1; i<=m; ++i) 
                printf("%d
",e[id[i] ^ 1].c + B[i]);
        }
        else puts("NO");
    }
    return 0;
}