题目链接

BZOJ4552

题解

之前去雅礼培训做过一道题，\(O(nlogn)\)维护区间排序并能在线查询

可惜我至今不能get

但这道题有着\(O(nlog^2n)\)的离线算法

我们看到询问只有一个，自然可以去尝试二分

我们二分一个值，就只关心最终那个位置的值和其的大小关系

所以我们可以令所有\(\ge\)它的值为\(1\)，剩余为\(0\)

然后我们只需对只有\(0\)和\(1\)的序列排序，用一个线段树很轻松就能解决

#include<algorithm>

#include<iostream>

#include<cstring>

#include<cstdio>

#include<cmath>

#include<map>

#define Redge(u) for (int k = h[u],to; k; k = ed[k].nxt)

#define REP(i,n) for (int i = 1; i <= (n); i++)

#define mp(a,b) make_pair<int,int>(a,b)

#define cls(s) memset(s,0,sizeof(s))

#define cp pair<int,int>

#define LL long long int

#define ls (u << 1)

#define rs (u << 1 | 1)

using namespace std;

const int maxn = 100005,maxm = 100005,INF = 1000000000;

inline int read(){

	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 << 3) + (out << 1) + c - 48; c = getchar();}

	return out * flag;

}

int n,m,opt[maxn],ql[maxn],qr[maxn],a[maxn],M,q;

int sum[maxn << 2],tag[maxn << 2];

void upd(int u){sum[u] = sum[ls] + sum[rs];}

void pd(int u,int l,int r){

	if (tag[u] == 1){

		int mid = l + r >> 1;

		sum[ls] = mid - l + 1;

		sum[rs] = r - mid;

		tag[ls] = tag[rs] = 1;

		tag[u] = 0;

	}

	else if (tag[u] == 2){

		sum[ls] = sum[rs] = 0;

		tag[ls] = tag[rs] = 2;

		tag[u] = 0;

	}

}

void build(int u,int l,int r){

	tag[u] = 0;

	if (l == r){

		sum[u] = (a[l] >= M);

		return;

	}

	int mid = l + r >> 1;

	build(ls,l,mid);

	build(rs,mid + 1,r);

	upd(u);

}

void modify(int u,int l,int r,int L,int R,int v){

	if (l >= L && r <= R){sum[u] = v * (r - l + 1); tag[u] = v ? 1 : 2; return;}

	pd(u,l,r);

	int mid = l + r >> 1;

	if (mid >= L) modify(ls,l,mid,L,R,v);

	if (mid < R) modify(rs,mid + 1,r,L,R,v);

	upd(u);

}

int query(int u,int l,int r,int L,int R){

	if (l >= L && r <= R) return sum[u];

	pd(u,l,r);

	int mid = l + r >> 1;

	if (mid >= R) return query(ls,l,mid,L,R);

	if (mid < L) return query(rs,mid + 1,r,L,R);

	return query(ls,l,mid,L,R) + query(rs,mid + 1,r,L,R);

}

bool check(int x){

	M = x; int l,r,s;

	build(1,1,n);

	REP(i,m){

		l = ql[i]; r = qr[i];

		s = query(1,1,n,l,r);

		if (!opt[i]){

			if (s) modify(1,1,n,r - s + 1,r,1);

			if (s != r - l + 1) modify(1,1,n,l,r - s,0);

		}

		else {

			if (s) modify(1,1,n,l,l + s - 1,1);

			if (s != r - l + 1) modify(1,1,n,l + s,r,0);

		}

	}

	return query(1,1,n,q,q) == 1;

}

int main(){

	n = read(); m = read();

	REP(i,n) a[i] = read();

	REP(i,m) opt[i] = read(),ql[i] = read(),qr[i] = read();

	q = read();

	int l = 1,r = n,mid;

	while (l < r){

		mid = (l + r + 1) >> 1;

		if (check(mid)) l = mid;

		else r = mid - 1;

	}

	printf("%d\n",l);

	return 0;

}