POJ1741 tree 【点分治】
Tree
| Time Limit: 1000MS | Memory Limit: 30000K | |
| Total Submissions: 25286 | Accepted: 8421 |
Description
Give a tree with n vertices,each edge has a length(positive integer less than 1001).
Define dist(u,v)=The min distance between node u and v.
Give an integer k,for every pair (u,v) of vertices is called valid if and only if dist(u,v) not exceed k.
Write a program that will count how many pairs which are valid for a given tree.
Define dist(u,v)=The min distance between node u and v.
Give an integer k,for every pair (u,v) of vertices is called valid if and only if dist(u,v) not exceed k.
Write a program that will count how many pairs which are valid for a given tree.
Input
The input contains several test cases. The first line of each test case contains two integers n, k. (n<=10000) The following n-1 lines each contains three integers u,v,l, which means there is an edge between node u and v of length l.
The last test case is followed by two zeros.
The last test case is followed by two zeros.
Output
For each test case output the answer on a single line.
Sample Input
5 4 1 2 3 1 3 1 1 4 2 3 5 1 0 0
Sample Output
8
点分治
点分治通常用以解决树上的分治问题,以点为界分治。【我做题还不够多,先不详细讲,之后再总结
这道题要求所有d(u,v) <= k的对数,直接枚举肯定不行,我们先求出路径经过树上一点的路径数
如何求通过一点的路径数?
我们以该点为根并求出树中所有点到根的距离,再全部排序,用双指针的方法O(n)统计d[u] + d[v] <= k的对数ans1
但是会将都在同一个子树,也就是不经过根的路径也算上,再对每一个子树算一遍ans2减去就好了
就是ans1 - ∑ans2
之后再向下分治,向每颗子树递归。
为防止极端数据,我们每次求出重心为根
#include<iostream>
#include<cstdio>
#include<cstring>
#include<algorithm>
#define LL long long int
#define REP(i,n) for (int i = 1; i <= (n); i++)
#define Redge(u) for (int k = head[u]; k != -1; k = edge[k].next)
using namespace std;
const int maxn = 10005,maxm = 40005,INF = 1000000000;
inline int RD(){
int out = 0,flag = 1; char c = getchar();
while (c < 48 || c > 57) {if (c == '-') flag = -1; c = getchar();}
while (c >= 48 && c <= 57) {out = (out << 1) + (out << 3) + c - '0'; c = getchar();}
return out * flag;
}
int N,K,vis[maxn],head[maxn],d[maxn],dep[maxn],nedge = 0,F[maxn],Siz[maxn],rt = 0,n,ans;
struct EDGE{int to,w,next;}edge[maxm];
inline void build(int u,int v,int w){
edge[nedge] = (EDGE){v,w,head[u]}; head[u] = nedge++;
edge[nedge] = (EDGE){u,w,head[v]}; head[v] = nedge++;
}
void getRT(int u,int fa){
int to; F[u] = 0; Siz[u] = 1;
Redge(u) if ((to = edge[k].to) != fa && !vis[to]){
getRT(to,u);
Siz[u] += Siz[to];
F[u] = max(F[u],Siz[to]);
}
F[u] = max(F[u],n - Siz[u]);
if (F[u] < F[rt]) rt = u;
}
void getdep(int u,int fa){
dep[++dep[0]] = d[u]; int to;
Redge(u) if (!vis[to = edge[k].to] && to != fa){
d[to] = d[u] + edge[k].w;
getdep(to,u);
}
}
int cal(int u,int D){
d[u] = D; dep[0] = 0;
getdep(u,0);
sort(dep + 1,dep + 1 + dep[0]);
int l = 1,r = dep[0],t = 0;
while (l < r)
if (dep[l] + dep[r] <= K) t += r - l++;
else r--;
return t;
}
void solve(int u){
ans += cal(u,0);
vis[u] = true; int to;
Redge(u) if (!vis[to = edge[k].to]){
ans -= cal(to,edge[k].w);
n = Siz[to]; rt = 0;
getRT(to,rt);
solve(rt);
}
}
int main(){
while (true){
memset(head,-1,sizeof(head));
memset(vis,0,sizeof(vis));
int a,b,w; N = RD(); K = RD(); ans = 0; rt = 0; nedge = 0;
if (!N) break;
REP(i,N - 1){
a = RD(); b = RD(); w = RD();
build(a,b,w);
}
n = N; F[0] = INF;
getRT(1,0);
solve(rt);
printf("%d\n",ans);
}
return 0;
}
