hdu 4387 双连通分量 求权值最小的桥
来源:互联网 发布:淘宝 白酒 知乎 编辑:程序博客网 时间:2024/06/16 22:16
Caocao's Bridges
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others)Total Submission(s): 3639 Accepted Submission(s): 1146
Problem Description
Caocao was defeated by Zhuge Liang and Zhou Yu in the battle of Chibi. But he wouldn't give up. Caocao's army still was not good at water battles, so he came up with another idea. He built many islands in the Changjiang river, and based on those islands, Caocao's army could easily attack Zhou Yu's troop. Caocao also built bridges connecting islands. If all islands were connected by bridges, Caocao's army could be deployed very conveniently among those islands. Zhou Yu couldn't stand with that, so he wanted to destroy some Caocao's bridges so one or more islands would be seperated from other islands. But Zhou Yu had only one bomb which was left by Zhuge Liang, so he could only destroy one bridge. Zhou Yu must send someone carrying the bomb to destroy the bridge. There might be guards on bridges. The soldier number of the bombing team couldn't be less than the guard number of a bridge, or the mission would fail. Please figure out as least how many soldiers Zhou Yu have to sent to complete the island seperating mission.
Input
There are no more than 12 test cases.
In each test case:
The first line contains two integers, N and M, meaning that there are N islands and M bridges. All the islands are numbered from 1 to N. ( 2 <= N <= 1000, 0 < M <= N2 )
Next M lines describes M bridges. Each line contains three integers U,V and W, meaning that there is a bridge connecting island U and island V, and there are W guards on that bridge. ( U ≠ V and 0 <= W <= 10,000 )
The input ends with N = 0 and M = 0.
In each test case:
The first line contains two integers, N and M, meaning that there are N islands and M bridges. All the islands are numbered from 1 to N. ( 2 <= N <= 1000, 0 < M <= N2 )
Next M lines describes M bridges. Each line contains three integers U,V and W, meaning that there is a bridge connecting island U and island V, and there are W guards on that bridge. ( U ≠ V and 0 <= W <= 10,000 )
The input ends with N = 0 and M = 0.
Output
For each test case, print the minimum soldier number Zhou Yu had to send to complete the mission. If Zhou Yu couldn't succeed any way, print -1 instead.
Sample Input
3 31 2 72 3 43 1 43 21 2 72 3 40 0
Sample Output
-14
Source
2013 ACM/ICPC Asia Regional Hangzhou Online
解析:
求无向图的双连通分量的桥,若本来图就没有连通,就不派人去,若桥的权值为0,还要派1个人去。求桥用tarjan算法。
代码:
#include <iostream>#include <cstdio>#include <cstring>#include <vector>#include <algorithm>using namespace std;const int maxn = 1000000+10;const int Maxn = 1000+10;const int inf = 0x3f3f3f3f;int n, m;struct EDGE{ int t, c, next;}edge[maxn];int dfn[Maxn], low[Maxn];vector<int>ans[10000+10];int g[Maxn][Maxn], head[Maxn];int cnt = 0;void addedge(int u, int v, int c) { edge[cnt].t = v; edge[cnt].c = c; edge[cnt].next = head[u]; head[u] = cnt; cnt++; edge[cnt].t = u; edge[cnt].c = c; edge[cnt].next = head[v]; head[v] = cnt; cnt++;}int stack[Maxn], sk;void tarjan(int now, int &sig, int &num, int from) { dfn[now] = low[now] = ++sig; for (int i=head[now]; i!=-1; i=edge[i].next) { if (i == (from^1)) continue; if (!dfn[edge[i].t]) { tarjan(edge[i].t, sig, num, i); low[now] = min(low[now], low[edge[i].t]); if (low[edge[i].t] > dfn[now]) { ans[num].push_back(now); ans[num].push_back(edge[i].t); num++; } } else low[now] = min(low[now], dfn[edge[i].t]); }}int vis[Maxn];void dfs(int u, int &len) { vis[u] = 1; for (int i=head[u]; i!=-1; i=edge[i].next) if (!vis[edge[i].t]) len++, dfs(edge[i].t, len);}int main(){ while (scanf("%d%d", &n, &m)!=EOF) { if (n==0 && m==0) break; cnt = 0; memset(low, 0, sizeof(low)); memset(dfn, 0, sizeof(dfn)); memset(g, inf, sizeof(g));; memset(head, -1, sizeof(head)); for (int i=0; i<m; i++) { int u, v, w; scanf("%d%d%d", &u, &v, &w); g[u][v] = w; g[v][u] = w; addedge(u, v, w); } int sig, num, res = inf; sig = num = 0; memset(vis, 0, sizeof(vis)); int len=1; dfs(1, len); if (len < n) { printf("0\n"); continue; } tarjan(1, sig, num, -1); for (int i=0; i<num; i++) { res = min(res, g[ans[i][0]][ans[i][1]]); } for (int i=0; i<num; i++) ans[i].clear(); if (res != inf && res != 0) printf("%d\n", res); else if (res == 0) cout << "1" << endl; else cout << "-1" << endl; }return 0;}
0 0
- hdu 4387 双连通分量 求权值最小的桥
- HDU 3844 双连通分量
- 双连通分量的求解
- hdu-3394-无向图的双连通分量
- HDU 3394 Railway(点双连通分量的应用)
- HDU 3394 Railway(点双连通分量+桥)
- HDU 3394Railway 点双连通分量 + 桥
- hdu 3394 Railway【点双连通分量、桥、割点】
- HDU 3390 Railway 边双连通分量
- hdu 2242(边双连通分量)
- hdu 2460(边双连通分量+LCA)
- HDU 3394 Railway 点双连通分量
- hdu 5215(边-双连通分量)
- hdu 3749 点双连通分量
- HDU 3394 Railway 点双连通分量
- HDU 3394 Railway 点双连通分量
- 无向图的桥 双连通分量
- POJ 3352 边的双连通分量
- HTTP——10 Status Code Definitions
- Codeforces Round #361 (Div. 2)A. Mike and Cellphone
- Linux Shell 中的反引号,单引号,双引号
- 稀疏编码最优化解法
- 【数据结构】二叉搜索树
- hdu 4387 双连通分量 求权值最小的桥
- C/C++跨平台INI文件解析库:iniparser
- IOS -iphone设备信息读取
- 深入理解Java虚拟机-自动内存管理机制
- ioc 控制反转
- VC++ 注册码
- centos6.5 docker 搜索镜像出错
- java web(二)
- js第三节