HDU-4786-Fibonacci Tree
2015-07-11 20:31
393 查看
HDU-4786-Fibonacci Tree
Problem DescriptionCoach Pang is interested in Fibonacci numbers while Uncle Yang wants him to do some research on Spanning Tree. So Coach Pang decides to solve the following problem:
Consider a bidirectional graph G with N vertices and M edges. All edges are painted into either white or black. Can we find a Spanning Tree with some positive Fibonacci number of white edges?
(Fibonacci number is defined as 1, 2, 3, 5, 8, … )
Input
The first line of the input contains an integer T, the number of test cases.
For each test case, the first line contains two integers N(1 <= N <= 105) and M(0 <= M <= 105).
Then M lines follow, each contains three integers u, v (1 <= u,v <= N, u<> v) and c (0 <= c <= 1), indicating an edge between u and v with a color c (1 for white and 0 for black).
Output
For each test case, output a line “Case #x: s”. x is the case number and s is either “Yes” or “No” (without quotes) representing the answer to the problem.
Sample Input
2
4 4
1 2 1
2 3 1
3 4 1
1 4 0
5 6
1 2 1
1 3 1
1 4 1
1 5 1
3 5 1
4 2 1
Sample Output
Case #1: Yes
Case #2: No
题目链接:HDU-4786
题目思路:最小生成树,求出1最少的情况a和最多的情况b,在判断在在[a,b]区间是否存在至少一个斐波那契数列的值。
以下是代码:
[code]#include <vector> #include <map> #include <set> #include <algorithm> #include <cstdio> #include <cmath> #include <cstdlib> #include <string> #include <cstring> using namespace std; struct node { int l,r; int c; }p[100010]; int fa[100010]; int n,m; bool cmp1(node a,node b) { if (a.c != b.c) return a.c < b.c; return a.l < b.l; } bool cmp2(node a,node b) { if (a.c != b.c) return a.c > b.c; return a.l < b.l; } int find(int x) //并查集 { return fa[x] == x ? x : fa[x] = find(fa[x]); } int solve() //最小生成树 { for (int i = 0; i <= n; i++) fa[i] = i; int cnt = 0; for (int i = 0; i < m; i++) { int u = find(fa[p[i].l]); int v = find(fa[p[i].r]); if (p[i].c == 0) { if (u != v) { fa[v] = u; } } else { if (u != v) { fa[v] = u; cnt++; } } } return cnt; } int main(){ int t; scanf("%d",&t); long long f[105] = {0}; f[0] = 1; f[1] = 1; f[2] = 2; for (int i = 3; i < 100; i++) { f[i] = f[i - 1] + f[i - 2]; } int ret = 1; while(t--) { scanf("%d%d",&n,&m); for (int i = 0; i < m; i++) { scanf("%d%d%d",&p[i].l,&p[i].r,&p[i].c); } sort(p,p + m,cmp1); int cnt1 = solve(); // 1最少的情况,即先把0全部排完,再接入1 int cou1 = 0; for (int i = 1;i <= n; i++) //判断是否连通 { if (fa[i] == i) cou1++; } sort(p,p + m,cmp2); int cnt2 = solve(); //1最多的情况,先接1再补充0的情况 int cou2 = 0; for (int i = 1;i <= n; i++) { if (fa[i] == i) cou2++; } if (cou2 != 1 || cou1 != 1) { printf("Case #%d: No\n",ret++); } else { int flag = 0; for (int i = 0; i < 50; i++) //判断在[cnt1,cnt2]范围内是否存在至少一个斐波那契的数 { if (f[i] >= cnt1 && f[i] <= cnt2) { printf("Case #%d: Yes\n",ret++); flag = 1; break; } if (f[i] > cnt2) break; } if (!flag) printf("Case #%d: No\n",ret++); } } return 0; }
相关文章推荐
- 【面试题】用栈实现队列
- 面试常考算法题 局部最小 求二叉树结点 求两个数组中所有数的上中位数 两个数组的所有数中第K小的数
- myeclipse、eclipse中项目复制后(可能无法访问)注意事项 .
- 【C++】静态成员与单例模式
- Reverse Nodes in k-Group
- C++中的inline函数
- 1002. 写出这个数 (20)
- 从今天开始
- Scala冒泡排序解析
- IIS的安装和详细配置--【ITOO】
- LayoutInfater及inflate方法
- Hibernate之自动生成工具
- DDD Reference
- 简单的PHP算法题
- 轮廓处理之四
- 【bzoj3576】 江南乐 sg函数+根号优化
- oracle中表被锁了怎么办
- VS2008 Property Pages设置
- 通过Jquery中Ajax获取json文件数据
- 啊哈算法-----快速排序