题意:给一个N个节点的带权树,求长度小于等于K的路径条数
思路:选取一个点作为根root,假设f(root)是当前树的答案,那么答案来源于两部分:
(1)路径不经过root,那么就是完全在子树内,这部分可以递归统计
(2)路径经过root,这部分可以通过容斥原理统计,具体见有关点分治资料。。。
点分治有个特点,当考虑的问题由根这个子树转为儿子的子树时,可以选取任意点作为新的根,只要它在儿子的子树内,这就使得我们可以通过选取特别的点使得树深度更小,这个点就是树的重心(在程序里面是不断找子树的重心),树分治的复杂度是O(NH+TH)的,其中H是树的深度,T是每层计算答案的复杂度,重心可以将树的深度变成O(logN)。
另外,整体看树分治的遍历节点的过程,发现它与建堆的过程十分相似,也就从侧面说明了树分治的复杂度。。。
#include <iostream>
#include <algorithm>
#include <cstdio>
#include <cstring>
#include <ctime>
#include <map>
#include <vector>
using namespace std;
#define X first
#define Y second
#define pb(x) push_back(x)
#define mp(x, y) make_pair(x, y)
#define all(a) (a).begin(), (a).end()
#define mset(a, x) memset(a, x, sizeof(a))
#define mcpy(a, b) memcpy(a, b, sizeof(b))
#define cas() int T, cas = 0; cin >> T; while (T --)
template<typename T>bool umax(T&a, const T&b){return a<b?(a=b,true):false;}
template<typename T>bool umin(T&a, const T&b){return b<a?(a=b,true):false;}
typedef long long ll;
typedef pair<int, int> pii;
#ifndef ONLINE_JUDGE
#include "local.h"
#endif
const int N = 1e4 + 7;
const int M = N;
const int inf = 1e9 + 7;
namespace Edge {
int last[N], to[M << 1], w[M << 1], next[M << 1], cntE;
void init() {
cntE = 0;
memset(last, -1, sizeof(last));
}
void addEdge(int u, int v, int w) {
to[cntE] = v;
Edge::w[cntE] = w;
next[cntE] = last[u];
last[u] = cntE ++;
}
}
int n, K;
namespace Center {
int root, siz, son[N];
void init() {
siz = inf;
}
void getRoot(int cur, int fa, int total, bool used[]) {
son[cur] = 0;
int buf = 0;
for (int i = Edge::last[cur]; ~i; i = Edge::next[i]) {
int to = Edge::to[i];
if (to != fa && !used[to]) {
getRoot(to, cur, total, used);
son[cur] += son[to] + 1;
buf = max(buf, son[to] + 1);
}
}
buf = max(buf, total - son[cur] - 1);
if (buf < siz || buf == siz && cur < siz) {
siz = buf;
root = cur;
}
}
}
void getDepth(int cur, int fa, int sum, vector<int> &vt, bool used[]) {
vt.pb(sum);
for (int i = Edge::last[cur]; ~i; i = Edge::next[i]) {
int to = Edge::to[i], w = Edge::w[i];
if (to != fa && !used[to]) getDepth(to, cur, sum + w, vt, used);
}
}
int getAns(vector<int> &vt) {
sort(all(vt));
int maxp = vt.size() - 1, ans = 0;
for (int i = 0; i < maxp; i ++) {
while (i < maxp && vt[i] + vt[maxp] > K) maxp --;
ans += maxp - i;
}
return ans;
}
bool used[N];
int work(int cur) {
used[cur] = true;
vector<int> total;
total.push_back(0);
int ans = 0;
for (int i = Edge::last[cur]; ~i; i = Edge::next[i]) {
int to = Edge::to[i], w = Edge::w[i];
if (!used[to]) {
vector<int> local;
getDepth(to, cur, w, local, used);
ans -= getAns(local);
for (int j = 0; j < local.size(); j ++) {
total.push_back(local[j]);
}
Center::init();
Center::getRoot(to, cur, local.size(), used);
ans += work(Center::root);
}
}
return ans += getAns(total);
}
int main() {
#ifndef ONLINE_JUDGE
freopen("in.txt", "r", stdin);
//freopen("out.txt", "w", stdout);
#endif // ONLINE_JUDGE
while (cin >> n >> K, n || K) {
int u, v, w;
Edge::init();
Center::init();
mset(used, 0);
for (int i = 1; i < n; i ++) {
scanf("%d%d%d", &u, &v, &w);
Edge::addEdge(u, v, w);
Edge::addEdge(v, u, w);
}
Center::getRoot(1, 0, n, used);
cout << work(Center::root) << endl;
}
return 0;
}