NOI2015 软件包管器
https://www.luogu.org/problem/P2146
题意
维护一棵树,每个节点都有一个为0或1的值,初始值全为0
需要支持
将一条链上的点都变成1,
将一棵子树中的点都变成0,
并统计每次操作改变了多少点的状态。
分析
每次修改链的时候,要记住,他们可能不在同一条重链上(其它题目里面的链修改也要注意),所以,我们需要跳...ctrl
线段树维护区间和,tag表示全改为0/1即可
(遇到错误不要慌!!!手模拟一遍样例说不定就找到错误了)
#include<cstdio>
#include<iostream>
#include<algorithm>
using namespace std;
const int MAXN = 100000+99;
const int MAXM = MAXN<<1;
int n,m;
struct node{
int deep, size, son, fa, tp, in, out;
}a[MAXN];
int _clock;
int head[MAXN], cnt;
struct seg{
int y, next;
}e[MAXM];
void add_edge(int x, int y) {
e[++cnt].y = y;
e[cnt].next = head[x];
head[x] = cnt;
}
void dfs1(int x, int fa) {
a[x].fa = fa;
a[x].deep = a[fa].deep + 1;
a[x].size = 1;
for(int i = head[x]; i; i = e[i].next)
if(e[i].y != fa) {
dfs1(e[i].y, x);
a[x].size += a[e[i].y].size;
a[x].son = a[a[x].son].size > a[e[i].y].size ? a[x].son : e[i].y ;
}
}
void dfs2(int x, int tp) {
a[x].tp = tp;
a[x].in = ++_clock;
if(a[x].son) dfs2(a[x].son , tp);
for(int i = head[x]; i; i = e[i].next)
if(e[i].y != a[x].fa && e[i].y != a[x].son) {
dfs2(e[i].y , e[i].y);
}
a[x].out = _clock;
}
struct tree{
int sum, lazyset;
tree (int sum = 0, int lazyset = -1) : sum(sum), lazyset(lazyset) {}
}tr[MAXN<<2];
void pushup(int o) {tr[o].sum = tr[o<<1].sum + tr[o<<1|1].sum;}
void pushdown(int o, int l, int r) {
if(tr[o].lazyset == -1) return ;
tr[o<<1].lazyset = tr[o<<1|1].lazyset = tr[o].lazyset ;
int mid = (l+r)>>1;
tr[o<<1].sum = tr[o].lazyset * (mid-l+1);
tr[o<<1|1].sum = tr[o].lazyset * (r-mid);
tr[o].lazyset = -1;
}
void optset(int o, int l, int r, int ql, int qr, int k) {
if(ql <= l && r <= qr) {
tr[o].sum = k*(r-l+1);
tr[o].lazyset = k;
return ;
}
pushdown(o, l, r);
int mid = (l+r)>>1;
if(ql <= mid) optset(o<<1, l, mid, ql, qr, k);
if(mid < qr) optset(o<<1|1, mid+1, r, ql, qr, k);
pushup(o);
}
int query(int o, int l, int r, int ql, int qr) {
if(ql <= l && r <= qr) return tr[o].sum;
pushdown(o, l, r);
int mid = (l+r)>>1, ans = 0;
if(ql <= mid) ans += query(o<<1, l, mid, ql, qr);
if(mid < qr) ans += query(o<<1|1, mid+1, r, ql, qr);
return ans;
}
int update_lian(int x) {
int ans = 0;
while(a[x].tp != 1) {
ans += (a[x].in-a[a[x].tp].in+1) - query(1, 1, n, a[a[x].tp].in, a[x].in);
optset(1, 1,n, a[a[x].tp].in, a[x].in, 1);//这题我没想边界咋找,于是就每一步都减一下
x = a[a[x].tp].fa;
}
ans += (a[x].in-a[a[x].tp].in+1) - query(1, 1, n, a[a[x].tp].in, a[x].in);
optset(1, 1, n, a[a[x].tp].in, a[x].in, 1);
return ans;
}
int update_tree(int x) {
int ans = query(1, 1, n, a[x].in, a[x].out);
optset(1, 1, n, a[x].in, a[x].out , 0);
return ans;
}
int main() {
scanf("%d",&n);
int x,y;
for(x = 2; x <= n; x++) {
scanf("%d",&y);
y++;
add_edge(x, y);
add_edge(y, x);
}
dfs1(1, 0);
dfs2(1, 1);
scanf("%d",&m);
string cmd;
for(int i = 1; i <= m; i++) {
cin>>cmd;
scanf("%d",&x);
x++;
if(cmd[0] == 'i') {
printf("%d
",update_lian(x));
} else {
printf("%d
",update_tree(x));
}
}
}