Truck History
Time Limit: 2000MS | Memory Limit: 65536K | |
Total Submissions: 19860 | Accepted: 7673 |
Description
Advanced Cargo Movement, Ltd. uses trucks of different types. Some trucks are used for vegetable delivery, other for furniture, or for bricks. The company has its own code describing each type of a
truck. The code is simply a string of exactly seven lowercase letters (each letter on each position has a very special meaning but that is unimportant for this task). At the beginning of company's history, just a single truck type was used but later other
types were derived from it, then from the new types another types were derived, and so on.
Today, ACM is rich enough to pay historians to study its history. One thing historians tried to find out is so called derivation plan -- i.e. how the truck types were derived. They defined the distance of truck types as the number of positions with different letters in truck type codes. They also assumed that each truck type was derived from exactly one other truck type (except for the first truck type which was not derived from any other type). The quality of a derivation plan was then defined as
1/Σ(to,td)d(to,td)
where the sum goes over all pairs of types in the derivation plan such that to is the original type and td the type derived from it and d(to,td) is the distance of the types.
Since historians failed, you are to write a program to help them. Given the codes of truck types, your program should find the highest possible quality of a derivation plan.
Today, ACM is rich enough to pay historians to study its history. One thing historians tried to find out is so called derivation plan -- i.e. how the truck types were derived. They defined the distance of truck types as the number of positions with different letters in truck type codes. They also assumed that each truck type was derived from exactly one other truck type (except for the first truck type which was not derived from any other type). The quality of a derivation plan was then defined as
where the sum goes over all pairs of types in the derivation plan such that to is the original type and td the type derived from it and d(to,td) is the distance of the types.
Since historians failed, you are to write a program to help them. Given the codes of truck types, your program should find the highest possible quality of a derivation plan.
Input
The input consists of several test cases. Each test case begins with a line containing the number of truck types, N, 2 <= N <= 2 000. Each of the following N lines of input contains one truck type code
(a string of seven lowercase letters). You may assume that the codes uniquely describe the trucks, i.e., no two of these N lines are the same. The input is terminated with zero at the place of number of truck types.
Output
For each test case, your program should output the text "The highest possible quality is 1/Q.", where 1/Q is the quality of the best derivation plan.
Sample Input
4
aaaaaaa
baaaaaa
abaaaaa
aabaaaa
0
Sample Output
The highest possible quality is 1/3.
Source
CTU Open 2003
题目链接:http://poj.org/problem?
题目大意:给出n个长度同样的字符串,一个字符串代表一个点,每两个字符串有多少个字符不同,则不同的个数即为两点之间的距离,要求各个点都连通求quality的最大值
题目分析:quality的公式已经给出。我们能够发现要让quality越大,则分母要越小,及问题转化为最小生成树问题,Kruskal算法跑一下答案就出来了
题目链接:http://poj.org/problem?
id=1789
题目大意:给出n个长度同样的字符串,一个字符串代表一个点,每两个字符串有多少个字符不同,则不同的个数即为两点之间的距离,要求各个点都连通求quality的最大值
题目分析:quality的公式已经给出。我们能够发现要让quality越大,则分母要越小,及问题转化为最小生成树问题,Kruskal算法跑一下答案就出来了
#include <cstdio> #include <cstring> #include <algorithm> using namespace std; int const MAX = 2005; int fa[MAX]; char s[MAX][10]; int n, m; struct Edge { int u, v, w; }e[MAX * MAX / 2]; int cmp(Edge a, Edge b) { return a.w < b.w; } void UF_set() { for(int i = 0; i < MAX; i++) fa[i] = i; } int Find(int x) { return x == fa[x] ? x : fa[x] = Find(fa[x]); } void Union(int a, int b) { int r1 = Find(a); int r2 = Find(b); if(r1 != r2) fa[r2] = r1; } void get_map() { for(int i = 0; i < n; i++) { for(int j = i + 1; j < n; j++) { int cnt = 0; for(int k = 0; k < 7; k++) cnt += (s[i][k] != s[j][k]); e[m].u = i; e[m].v = j; e[m++].w = cnt; } } } int Kruskal() { int num = 0, sum = 0; UF_set(); for(int i = 0; i < m; i++) { int u = e[i].u; int v = e[i].v; if(Find(u) != Find(v)) { Union(u, v); sum += e[i].w; num++; } if(num >= n - 1) break; } return sum; } int main() { while(scanf("%d", &n) != EOF && n) { for(int i = 0; i < n; i++) scanf("%s", s[i]); m = 0; get_map(); sort(e, e + m, cmp); printf("The highest possible quality is 1/%d. ", Kruskal()); } }