题意:
一棵树 支持删边加边、路径权值加值、路径权值改值、路径求第二大的数字和其个数
思路:
LCT的第二题 题意已经把功能都告诉了 比較裸
要注意的是权值加值和改值两个操作的标记下放问题 要先down改值 再down加值
对于路径的操作通过mroot变换树的形态再access拿出路径比較方便 不要像我上一篇一样搞lca
代码:
#include<cstdio>
#include<iostream>
#include<cstring>
#include<string>
#include<algorithm>
#include<map>
#include<set>
#include<vector>
#include<queue>
#include<cstdlib>
#include<ctime>
#include<cmath>
using namespace std;
#define N 100010
#define L(x) (ch[x][0])
#define R(x) (ch[x][1])
#define inf -2147483640
int ch[N][2], pre[N], rev[N], me[N];
int cov[N], add[N], size[N], max1[N], num1[N], max2[N], num2[N];
bool rt[N];
struct helper {
int val, num;
bool operator<(const helper ff) const {
return val > ff.val;
}
} hel[10];
void Update_COV(int u, int d) {
if (!u)
return;
me[u] = d;
cov[u] = d;
add[u] = inf;
max1[u] = d;
num1[u] = size[u];
max2[u] = inf;
num2[u] = 0;
}
void Update_Add(int u, int d) {
if (!u)
return;
me[u] += d;
if (add[u] != inf)
add[u] += d;
else
add[u] = d;
max1[u] += d;
if (max2[u] != inf)
max2[u] += d;
}
void Update_Rev(int u) {
if (!u)
return;
swap(L(u), R(u));
rev[u] ^= 1;
}
void down(int u) {
if (rev[u]) {
Update_Rev(L(u));
Update_Rev(R(u));
rev[u] = 0;
}
if (cov[u] != inf) {
Update_COV(L(u), cov[u]);
Update_COV(R(u), cov[u]);
cov[u] = inf;
}
if (add[u] != inf) {
Update_Add(L(u), add[u]);
Update_Add(R(u), add[u]);
add[u] = inf;
}
}
void up(int u) {
size[u] = size[L(u)] + size[R(u)] + 1;
hel[0].val = max1[L(u)];
hel[0].num = num1[L(u)];
hel[1].val = max2[L(u)];
hel[1].num = num2[L(u)];
hel[2].val = max1[R(u)];
hel[2].num = num1[R(u)];
hel[3].val = max2[R(u)];
hel[3].num = num2[R(u)];
hel[4].val = me[u];
hel[4].num = 1;
sort(hel, hel + 5);
int i;
for (i = 1; i < 5; i++) {
if (hel[i].val != hel[i - 1].val)
break;
}
max1[u] = hel[0].val;
max2[u] = hel[i].val;
num1[u] = num2[u] = 0;
for (i = 0; i < 5; i++) {
if (hel[i].val == max1[u])
num1[u] += hel[i].num;
else if (hel[i].val == max2[u])
num2[u] += hel[i].num;
}
}
//Rotate P Splay 一般不变
void Rotate(int x) {
int y = pre[x], kind = ch[y][1] == x;
ch[y][kind] = ch[x][!kind];
pre[ch[y][kind]] = y;
pre[x] = pre[y];
pre[y] = x;
ch[x][!kind] = y;
if (rt[y])
rt[y] = false, rt[x] = true;
else
ch[pre[x]][ch[pre[x]][1] == y] = x;
up(y);
}
//P函数先将splay根结点到u的路径上全部的结点的标记逐级下放
void P(int u) {
if (!rt[u])
P(pre[u]);
down(u);
}
void Splay(int u) {
P(u);
while (!rt[u]) {
int fa = pre[u], ffa = pre[fa];
if (rt[fa])
Rotate(u);
else if ((R(ffa) == fa) == (R(fa) == u))
Rotate(fa), Rotate(u);
else
Rotate(u), Rotate(u);
}
up(u);
}
//将root到u的路径变成实边
int Access(int u) {
int v = 0;
for (; u; u = pre[v = u]) {
Splay(u);
rt[R(u)] = true, rt[R(u) = v] = false;
up(u);
}
return v;
}
//使u成为它所在的树的根
void mroot(int u) {
Access(u);
Splay(u);
Update_Rev(u);
}
//连接两棵树 u接在v上
void link(int u, int v) {
mroot(u);
pre[u] = v;
}
//u-v边断开
void cut(int u, int v) {
mroot(u);
Access(u);
Splay(v);
pre[L(v)] = pre[v];
pre[v] = 0;
rt[L(v)] = true;
L(v) = 0;
up(v);
}
//u-v路径权值变为w
void COV(int u, int v, int w) {
mroot(u);
Access(v);
Splay(v);
Update_COV(v, w);
}
//u-v路径+w
void ADD(int u, int v, int w) {
mroot(u);
Access(v);
Splay(v);
Update_Add(v, w);
}
//u-v路径最大值
void query(int u, int v) {
mroot(u);
Access(v);
Splay(v);
if (max2[v] != inf)
printf("%d %d
", max2[v], num2[v]);
else
printf("ALL SAME
");
}
struct edge {
int v, next;
} ed[N * 2];
int head[N], tot;
void addedge(int u, int v) {
ed[tot].v = v;
ed[tot].next = head[u];
head[u] = tot++;
}
//利用dfs初始化pre数组 建立LCT
void dfs(int u) {
for (int i = head[u]; ~i; i = ed[i].next) {
int v = ed[i].v;
if (pre[v] != 0)
continue;
pre[v] = u;
dfs(v);
}
}
int main() {
int T, t, n, m, i, op, u, v, x, y, w;
max1[0] = max2[0] = inf;
rt[0] = true;
scanf("%d", &T);
for (t = 1; t <= T; t++) {
scanf("%d%d", &n, &m);
for (i = 1; i <= n; i++) {
scanf("%d", &me[i]);
max1[i] = me[i];
max2[i] = inf;
num1[i] = 1;
num2[i] = 0;
size[i] = 1;
add[i] = cov[i] = inf;
L(i) = R(i) = pre[i] = rev[i] = 0;
rt[i] = true;
}
tot = 0;
memset(head, -1, sizeof(head));
for (i = 1; i < n; i++) {
scanf("%d%d", &u, &v);
addedge(u, v);
addedge(v, u);
}
pre[1] = -1;
dfs(1);
pre[1] = 0;
printf("Case #%d:
", t);
while (m--) {
scanf("%d", &op);
if (op == 1) {
scanf("%d%d%d%d", &u, &v, &x, &y);
cut(u, v);
link(x, y);
} else if (op == 2) {
scanf("%d%d%d", &u, &v, &w);
COV(u, v, w);
} else if (op == 3) {
scanf("%d%d%d", &u, &v, &w);
ADD(u, v, w);
} else {
scanf("%d%d", &u, &v);
query(u, v);
}
}
}
return 0;
}