多校冲刺 noip 11.10

多校冲刺 noip 11.10

仍然是不太行,又挂分了,不爽

T1 开挂

最后的数字集合是一定的

直接用\(set\)维护数字集合,尽量找最近的匹配,可以让小的变化大些

我考场上怕被卡常,还写了一个链表版的

set
#include<bits/stdc++.h>
using namespace std;
#define int long long
#define fo(i,x,y) for(int i=(x);i<=(y);i++)
#define fu(i,x,y) for(int i=(x);i>=(y);i--)
const int Mxdt=100000; 
inline char gc(){
	static char buf[Mxdt],*p1=buf,*p2=buf;
	return p1==p2&&(p2=(p1=buf)+fread(buf,1,Mxdt,stdin),p1==p2)?EOF:*p1++;
}
inline int read(){
	int t=0,f=0;char v=gc();
	while(v<'0')f|=(v=='-'),v=gc();
	while(v>='0')t=(t<<3)+(t<<1)+v-48,v=gc();
	return f?-t:t;
}
const int N=1e6+5;
int n,a[N],b[N],c[N],add[N];
set<int> st;
unsigned long long ans;
signed main(){
    freopen("openhook.in","r",stdin);
    freopen("openhook.out","w",stdout);
    n=read();
    fo(i,1,n)a[i]=read();
    fo(i,1,n)b[i]=read();
    sort(a+1,a+n+1);
    sort(b+1,b+n+1);
    int now=0;
    fo(i,1,n){
        if(a[i]>now){
            now=a[i];
            st.insert(now);
        }
        else {
            now+=1;
            st.insert(now);
        }
    }
    fu(i,n,1){
        set<int>::iterator it=st.lower_bound(a[i]);
        add[i]=*it-a[i];st.erase(it);
    }
    sort(add+1,add+n+1,greater<int>());
    fo(i,1,n)ans=ans+1ull*add[i]*(1ull*b[i]);
    printf("%llu",ans);
    return 0;
}
链表
#include<bits/stdc++.h>
using namespace std;
#define int long long
#define fo(i,x,y) for(int i=(x);i<=(y);i++)
#define fu(i,x,y) for(int i=(x);i>=(y);i--)
const int Mxdt=100000; 
inline char gc(){
	static char buf[Mxdt],*p1=buf,*p2=buf;
	return p1==p2&&(p2=(p1=buf)+fread(buf,1,Mxdt,stdin),p1==p2)?EOF:*p1++;
}
inline int read(){
	int t=0,f=0;char v=gc();
	while(v<'0')f|=(v=='-'),v=gc();
	while(v>='0')t=(t<<3)+(t<<1)+v-48,v=gc();
	return f?-t:t;
}
const int N=1e6+5;
const int inf=0x3f3f3f3f3f3f3f3f;
int n,a[N],b[N],c[N],add[N];
int bg[N],ed[N],nt[N],hd,rp;
unsigned long long ans;
signed main(){
    freopen("openhook.in","r",stdin);
    freopen("openhook.out","w",stdout);
    n=read();
    fo(i,1,n)a[i]=read();
    fo(i,1,n)b[i]=read();
    sort(a+1,a+n+1);a[n+1]=inf;
    sort(b+1,b+n+1);
    fu(i,n,1){
        if(a[i]!=a[i+1]){
            add[i]=0;
            bg[++rp]=a[i]+1;
            ed[rp]=a[i+1]-1;
            if(bg[rp]>ed[rp])continue;
            nt[rp]=hd;hd=rp;
        }
        else {
            add[i]=bg[hd]-a[i];
            bg[hd]++;
            if(bg[hd]>ed[hd])hd=nt[hd];
        }
    }
    sort(add+1,add+n+1,greater<int>());
    fo(i,1,n)ans=ans+1ull*add[i]*(1ull*b[i]);
    printf("%llu",ans);
    return 0;
}

T2 叁仟柒佰万

看性质,发现每一个区间的\(mex\)都是大区间的\(mex\)

所以我们直接\(\mathcal{O(n)}\)找到\(mex\)

直接判断数字集合,转移就完事了,考场上多开了一个数组,认为内存不太够,只有\(90pts\)

AC_code
#include<bits/stdc++.h>
using namespace std;
#define fo(i,x,y) for(int i=(x);i<=(y);i++)
#define fu(i,x,y) for(int i=(x);i>=(y);i--)
const int Mxdt=100000; 
inline char gc(){
	static char buf[Mxdt],*p1=buf,*p2=buf;
	return p1==p2&&(p2=(p1=buf)+fread(buf,1,Mxdt,stdin),p1==p2)?EOF:*p1++;
}
inline int read(){
	int t=0,f=0;char v=gc();
	while(v<'0')f|=(v=='-'),v=gc();
	while(v>='0')t=(t<<3)+(t<<1)+v-48,v=gc();
	return f?-t:t;
}
const int N=3.7e7+5;
const int mod=1e9+7;
int T,n,a[N],mex;
bool vis[N];
int buc[N],cnt,nxt;
int dp[N];
signed main(){
    freopen("clods.in","r",stdin);
    freopen("clods.out","w",stdout);
	//cout<<(sizeof(dp)*3+sizeof(vis)>>20)<<endl;
	T=read();
	while(T--){
		n=read();int x,y;
		if(n==37000000)x=read(),y=read();
		fo(i,0,n){
			vis[i]=false;
			buc[i]=dp[i]=0;
		}mex=0;cnt=0;nxt=n+1;
		dp[n+1]=0;
		fo(i,1,n){
			if(n==37000000){
				if(i==1)a[i]=0;
				else a[i]=(1ll*a[i-1]*x+y+i)&262143;
			}
			else a[i]=read();
			if(a[i]<=n)vis[a[i]]=true;
		}
		fo(i,0,n)if(!vis[i]){mex=i;break;}
		fo(i,1,n){
			if(a[i]<=mex){
				buc[a[i]]++;
				if(buc[a[i]]==1)cnt++;
				if(cnt==mex){nxt=i;break;}
			}
		}
		if(nxt==n+1)nxt=1;
		int it=nxt;dp[nxt]=1;
		fo(i,1,n){
			if(a[i]<=mex){
				buc[a[i]]--;
				if(!buc[a[i]]){
					cnt--;int las=it;
					for(int j=it+1;j<=n;j++){
						if(a[j]<=mex||mex==0){
							buc[a[j]]++;
							if(buc[a[j]]==1)cnt++;
							if(cnt==mex){
								it=j;
								break;
							}
						}
					}
					if(it==las){
						fo(j,i,n){
							dp[j]=(dp[j]+dp[j-1]);
							dp[j]=dp[j]>=mod?dp[j]-mod:dp[j];
						}
						break;
					}
				}
			}
			it=max(it,i+1);
			dp[i]=(dp[i]+dp[i-1]);
			dp[i]=dp[i]>=mod?dp[i]-mod:dp[i];
			dp[it]=(dp[it]+dp[i]);
			dp[it]=dp[it]>=mod?dp[it]-mod:dp[it];
		}
		printf("%d\n",dp[n]);
	}
    return 0;
}

T3 超级加倍

确实学过单调栈和笛卡尔树在序列上的应用

考场上可以想到将笛卡尔树应用到树上,但是我不会用啊

原来是\(Kruskal\)重构树,我学到了

所以建一个小的,建一个大的,互相是祖先就直接用树状数组判断就好了

AC_code
#include<bits/stdc++.h>
using namespace std;
#define fo(i,x,y) for(int i=(x);i<=(y);i++)
#define fu(i,x,y) for(int i=(x);i>=(y);i--)
const int N=2e6+5;
int n,fa[N];long long ans;
int too[N*2],nt[N*2],hd[N],rp;
void add_edg(int x,int y){
	too[++rp]=y;
	nt[rp]=hd[x];
	hd[x]=rp;
}
struct kcgs{
	int to[N],nxt[N],head[N],rp;
	int fai[N],pot[N];
	int find(int x){return fai[x]==x?x:fai[x]=find(fai[x]);}
	void add(int x,int y){
		to[++rp]=y;
		nxt[rp]=head[x];
		head[x]=rp;
	}
	void rebuild1(){
		fo(i,1,n)fai[i]=i;
		fo(i,1,n){
			int x=pot[i];
			for(int j=hd[x];j;j=nt[j]){
				int y=too[j];
				if(y>x)continue;
				int fx=find(x),fy=find(y);
				if(fx==fy)continue;
				fai[fy]=fx;add(fx,fy);
			}
		}
	}
	void rebuild2(){
		fo(i,1,n)fai[i]=i;
		fo(i,1,n){
			int x=pot[i];
			for(int j=hd[x];j;j=nt[j]){
				int y=too[j];
				if(y<x)continue;
				int fx=find(x),fy=find(y);
				if(fx==fy)continue;
				fai[fy]=fx;add(fx,fy);
			}
		}
	}
}t1,t2;
int dfn[N],cnt,dfm[N];
void dfs_t1(int x){
	dfn[x]=++cnt;
	for(int i=t1.head[x];i;i=t1.nxt[i]){
		int y=t1.to[i];
		dfs_t1(y);
	}
	dfm[x]=cnt;
}
int tr[N];
void ins(int x,int v){
	for(int i=x;i<=n;i+=(i&-i))
		tr[i]+=v;
}
int query(int x){
	int ret=0;
	for(int i=x;i;i-=(i&-i))
		ret+=tr[i];
	return ret;
}
void dfs_t2(int x){
	// cerr<<x<<" "<<dfn[x]<<" "<<dfm[x]<<" "<<query(dfm[x])<<" "<<query(dfn[x]-1)<<endl;
	ans+=query(dfm[x])-query(dfn[x]-1);
	ins(dfn[x],1);
	for(int i=t2.head[x];i;i=t2.nxt[i]){
		int y=t2.to[i];
		dfs_t2(y);	
	}
	ins(dfn[x],-1);
}
signed main(){
	freopen("charity.in","r",stdin);
    freopen("charity.out","w",stdout);
	scanf("%d",&n);
	fo(i,1,n){
		scanf("%d",&fa[i]);
		if(i==1)continue;
		add_edg(fa[i],i);
		add_edg(i,fa[i]);
	}
	fo(i,1,n)t1.pot[i]=i;t1.rebuild1();
	fo(i,1,n)t2.pot[i]=n+1-i;t2.rebuild2();
	dfs_t1(n);dfs_t2(1);
	printf("%lld",ans);
}

T4 欢乐豆

更改的边很少,考虑导出子图

边数很少,我们可以用线段树模拟\(dijstra\)

我想了想,这线段树是依赖边数的,无法直接替换原本的\(dijstra\)

AC_code
#include<bits/stdc++.h>
using namespace std;
#define int long long
#define fo(i,x,y) for(int i=(x);i<=(y);i++)
#define fu(i,x,y) for(int i=(x);i>=(y);i--)
const int N=1e5+5;
const int M=3e3+5;
const int inf=0x3f3f3f3f3f3f3f3f;
int n,m,a[N],ans;
vector<pair<int,int> > e[N];
struct DSU{
	int fa[N],siz[N];
	void init(){fo(i,1,n)fa[i]=i,siz[i]=1;}
	int find(int x){return fa[x]==x?x:fa[x]=find(fa[x]);}
	void merge(int x,int y){
		int fx=find(x),fy=find(y);
		if(fx==fy)return;
		fa[fx]=fy;siz[fy]+=siz[fx];
	}
}dsu;
int ltkcnt,which[N];
vector<int> ltk[N];
multiset<int> st;
int pos_in_xds[N],xds_siz;
int dis[N];
struct XDS{
	#define ls x<<1
	#define rs x<<1|1
	int val[M*4],who[M*4],tag[M*4];
	bool bji[M*4];
	void pushup(int x){
		val[x]=min(val[ls],val[rs]);
		if(val[x]==val[ls]&&!bji[ls])who[x]=who[ls];
		else who[x]=who[rs];
		bji[x]=bji[ls]&bji[rs];
	}
	void pushdown(int x){
		if(!bji[ls])val[ls]=min(val[ls],tag[x]),tag[ls]=min(tag[ls],tag[x]);
		if(!bji[rs])val[rs]=min(val[rs],tag[x]),tag[rs]=min(tag[rs],tag[x]);
		tag[x]=inf;return ;
	}
	void build(int x,int l,int r){
		tag[x]=inf;bji[x]=0;
		if(l==r)return who[x]=l,val[x]=inf,void();
		int mid=l+r>>1;
		build(ls,l,mid);build(rs,mid+1,r);
		pushup(x);return ;
	}
	void huimieba(int x,int l,int r,int pos){
		if(l==r)return bji[x]=true,val[x]=inf,void();
		if(tag[x]!=inf)pushdown(x);
		int mid=l+r>>1;
		if(pos<=mid)huimieba(ls,l,mid,pos);
		else huimieba(rs,mid+1,r,pos);
		pushup(x);return ;
	}
	void ins(int x,int l,int r,int ql,int qr,int v){
		if(ql>qr)return ;
		if(bji[x])return ;
		if(ql<=l&&r<=qr){
			tag[x]=min(tag[x],v);
			val[x]=min(val[x],v);
			return ;
		}
		if(tag[x]!=inf)pushdown(x);
		int mid=l+r>>1;
		if(ql<=mid)ins(ls,l,mid,ql,qr,v);
		if(qr>mid)ins(rs,mid+1,r,ql,qr,v);
		pushup(x);return ;
	}
	#undef ls
	#undef rs
}xds;
signed main(){
	freopen("happybean.in","r",stdin);
    freopen("happybean.out","w",stdout);
	scanf("%lld%lld",&n,&m);
	fo(i,1,n)scanf("%lld",&a[i]),st.insert(a[i]);
	dsu.init();
	fo(i,1,m){
		int x,y,z;scanf("%lld%lld%lld",&x,&y,&z);
		e[x].push_back(make_pair(y,z));dsu.merge(x,y);
	}
	fo(i,1,n)sort(e[i].begin(),e[i].end());
	fo(i,1,n){
		if(dsu.siz[dsu.find(i)]==1)continue;
		if(dsu.fa[i]==i)which[i]=++ltkcnt;
	}
	fo(i,1,n){
		if(dsu.siz[dsu.find(i)]==1){
			ans+=(n-1)*a[i];
			continue;
		}
		ltk[which[dsu.find(i)]].push_back(i);
	}
	fo(i,1,ltkcnt){
		for(int x:ltk[i])st.erase(a[x]);
		int minn=*st.begin();
		if(st.begin()==st.end())minn=inf;
		xds_siz=ltk[i].size();
		fo(j,0,xds_siz-1)pos_in_xds[ltk[i][j]]=j+1;
		for(int u:ltk[i]){
			xds.build(1,1,xds_siz);
			xds.ins(1,1,xds_siz,pos_in_xds[u],pos_in_xds[u],0);
			dis[pos_in_xds[u]]=0;
			while(xds.val[1]!=inf){
				int x=xds.who[1];
				dis[x]=xds.val[1];
				xds.huimieba(1,1,xds_siz,x);
				int bas=dis[x],las=1;
				x=ltk[i][x-1];
				for(auto j:e[x]){
					xds.ins(1,1,xds_siz,las,pos_in_xds[j.first]-1,bas+a[x]);
					xds.ins(1,1,xds_siz,pos_in_xds[j.first],pos_in_xds[j.first],bas+j.second);
					las=pos_in_xds[j.first]+1;
				}
				xds.ins(1,1,xds_siz,las,xds_siz,bas+a[x]);
			}
			fo(j,1,xds_siz)ans+=min(dis[j],a[u]+minn);
			int mn=inf;
			fo(j,1,xds_siz)mn=min(mn,dis[j]+a[ltk[i][j-1]]);
			ans+=mn*(n-xds_siz);
		}
		for(int x:ltk[i])st.insert(a[x]);
	}
	printf("%lld",ans);
}
posted @ 2021-11-11 07:25  fengwu2005  阅读(71)  评论(0编辑  收藏  举报