HDU3592(差分约束)
World Exhibition
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others)
Total Submission(s): 1754 Accepted Submission(s): 886
Problem Description
Nowadays, many people want to go to Shanghai to visit the World Exhibition. So there are always a lot of people who are standing along a straight line waiting for entering. Assume that there are N (2 <= N <= 1,000) people numbered 1..N who are standing in the same order as they are numbered. It is possible that two or more person line up at exactly the same location in the condition that those visit it in a group.
There is something interesting. Some like each other and want to be within a certain distance of each other in line. Some really dislike each other and want to be separated by at least a certain distance. A list of X (1 <= X <= 10,000) constraints describes which person like each other and the maximum distance by which they may be separated; a subsequent list of Y constraints (1 <= Y <= 10,000) tells which person dislike each other and the minimum distance by which they must be separated.
Your job is to compute, if possible, the maximum possible distance between person 1 and person N that satisfies the distance constraints.
There is something interesting. Some like each other and want to be within a certain distance of each other in line. Some really dislike each other and want to be separated by at least a certain distance. A list of X (1 <= X <= 10,000) constraints describes which person like each other and the maximum distance by which they may be separated; a subsequent list of Y constraints (1 <= Y <= 10,000) tells which person dislike each other and the minimum distance by which they must be separated.
Your job is to compute, if possible, the maximum possible distance between person 1 and person N that satisfies the distance constraints.
Input
First line: An integer T represents the case of test.
The next line: Three space-separated integers: N, X, and Y.
The next X lines: Each line contains three space-separated positive integers: A, B, and C, with 1 <= A < B <= N. Person A and B must be at most C (1 <= C <= 1,000,000) apart.
The next Y lines: Each line contains three space-separated positive integers: A, B, and C, with 1 <= A < B <= C. Person A and B must be at least C (1 <= C <= 1,000,000) apart.
The next line: Three space-separated integers: N, X, and Y.
The next X lines: Each line contains three space-separated positive integers: A, B, and C, with 1 <= A < B <= N. Person A and B must be at most C (1 <= C <= 1,000,000) apart.
The next Y lines: Each line contains three space-separated positive integers: A, B, and C, with 1 <= A < B <= C. Person A and B must be at least C (1 <= C <= 1,000,000) apart.
Output
For each line: A single integer. If no line-up is possible, output -1. If person 1 and N can be arbitrarily far apart, output -2. Otherwise output the greatest possible distance between person 1 and N.
Sample Input
1
4 2 1
1 3 8
2 4 15
2 3 4
Sample Output
19
Author
alpc20
Source
差分约束系统
建图:
问题询问最大值,因此差分约束求最短路。不等式全部转化成 <= 号。
对于 dis[v] - dis[u] <= w (u < v),从u到v建立一条权值为w的有向边。
对于 dis[v] - dis[u] >= w (u < v), 将不等式转换为dis[u] - dis[v] <= -w (u < v),从v到u建立一条权值为-w的有向边。
spfa找最短路。
1 //2017-08-29 2 #include <cstdio> 3 #include <cstring> 4 #include <iostream> 5 #include <algorithm> 6 #include <queue> 7 #include <stack> 8 9 using namespace std; 10 11 const int N = 300100; 12 const int M = 2500100; 13 const int INF = 0x3f3f3f3f; 14 15 int head[N], tot; 16 struct Edge{ 17 int to, next, w; 18 }edge[M]; 19 20 void init(){ 21 tot = 0; 22 memset(head, -1, sizeof(head)); 23 } 24 25 void add_edge(int u, int v, int w){ 26 edge[tot].w = w; 27 edge[tot].to = v; 28 edge[tot].next = head[u]; 29 head[u] = tot++; 30 } 31 32 int n, m, c; 33 bool vis[N]; 34 int dis[N], cnt[N]; 35 36 bool spfa(int s, int n){ 37 memset(vis, 0, sizeof(vis)); 38 memset(dis, INF, sizeof(dis)); 39 memset(cnt, 0, sizeof(cnt)); 40 vis[s] = 1; 41 dis[s] = 0; 42 cnt[s] = 1; 43 deque<int> dq; 44 dq.push_back(s); 45 int sum = 0, len = 1; 46 while(!dq.empty()){ 47 // LLL 优化 48 while(dis[dq.front()]*len > sum){ 49 dq.push_back(dq.front()); 50 dq.pop_front(); 51 } 52 int u = dq.front(); 53 sum -= dis[u]; 54 len--; 55 dq.pop_front(); 56 vis[u] = 0; 57 for(int i = head[u]; i != -1; i = edge[i].next){ 58 int v = edge[i].to; 59 if(dis[v] > dis[u] + edge[i].w){ 60 dis[v] = dis[u] + edge[i].w; 61 if(!vis[v]){ 62 vis[v] = 1; 63 // SLF 优化 64 if(!dq.empty() && dis[v] < dis[dq.front()]) 65 dq.push_front(v); 66 else dq.push_back(v); 67 sum += dis[v]; 68 len++; 69 if(++cnt[v] > n)return false; 70 } 71 } 72 } 73 } 74 return true; 75 } 76 77 int main() 78 { 79 std::ios::sync_with_stdio(false); 80 //freopen("input.txt", "r", stdin); 81 int T, n, x, y; 82 cin>>T; 83 while(T--){ 84 init(); 85 cin>>n>>x>>y; 86 int u, v, w; 87 while(x--){ 88 cin>>u>>v>>w; 89 add_edge(u, v, w); 90 } 91 while(y--){ 92 cin>>u>>v>>w; 93 add_edge(v, u, -w); 94 } 95 if(spfa(1, n)){ 96 if(dis[n] == INF)cout<<-2<<endl; 97 else cout<<dis[n]<<endl; 98 }else cout<<-1<<endl; 99 } 100 101 return 0; 102 }
