洛谷P4630 [APIO2018]铁人两项 [广义圆方树]
又学会了一个新东西好开心呢~
思路
显然,假如枚举了起始点\(x\)和终止点\(y\),中转点就必须在它们之间的简单路径上。
不知为何想到了圆方树,可以发现,如果把方点的权值记为双联通分量的大小,圆点权值记为-1,那么\(x \rightarrow y\)的答案就是树上\(x\rightarrow y\)的路径权值和。
直接枚举\(O(n^2)\),点分治\(O(n\log n)\),考虑每个点被经过的次数乘上它的权值即可\(O(n)\)。
注意图可能不连通。
代码
#include<bits/stdc++.h>
clock_t t=clock();
namespace my_std{
using namespace std;
#define pii pair<int,int>
#define fir first
#define sec second
#define MP make_pair
#define rep(i,x,y) for (int i=(x);i<=(y);i++)
#define drep(i,x,y) for (int i=(x);i>=(y);i--)
#define go(x) for (int i=head[x];i;i=edge[i].nxt)
#define templ template<typename T>
#define sz 202020
typedef long long ll;
typedef double db;
mt19937 rng(chrono::steady_clock::now().time_since_epoch().count());
templ inline T rnd(T l,T r) {return uniform_int_distribution<T>(l,r)(rng);}
templ inline bool chkmax(T &x,T y){return x<y?x=y,1:0;}
templ inline bool chkmin(T &x,T y){return x>y?x=y,1:0;}
templ inline void read(T& t)
{
t=0;char f=0,ch=getchar();double d=0.1;
while(ch>'9'||ch<'0') f|=(ch=='-'),ch=getchar();
while(ch<='9'&&ch>='0') t=t*10+ch-48,ch=getchar();
if(ch=='.'){ch=getchar();while(ch<='9'&&ch>='0') t+=d*(ch^48),d*=0.1,ch=getchar();}
t=(f?-t:t);
}
template<typename T,typename... Args>inline void read(T& t,Args&... args){read(t); read(args...);}
char __sr[1<<21],__z[20];int __C=-1,__Z=0;
inline void __Ot(){fwrite(__sr,1,__C+1,stdout),__C=-1;}
inline void print(register int x)
{
if (__C>1<<20) __Ot(); if (x<0) __sr[++__C]='-',x=-x;
while (__z[++__Z]=x%10+48,x/=10);
while (__sr[++__C]=__z[__Z],--__Z);__sr[++__C]='\n';
}
void file()
{
#ifndef ONLINE_JUDGE
freopen("a.in","r",stdin);
#endif
}
inline void chktime()
{
#ifndef ONLINE_JUDGE
cout<<(clock()-t)/1000.0<<'\n';
#endif
}
#ifdef mod
ll ksm(ll x,int y){ll ret=1;for (;y;y>>=1,x=x*x%mod) if (y&1) ret=ret*x%mod;return ret;}
ll inv(ll x){return ksm(x,mod-2);}
#else
ll ksm(ll x,int y){ll ret=1;for (;y;y>>=1,x=x*x) if (y&1) ret=ret*x;return ret;}
#endif
// inline ll mul(ll a,ll b){ll d=(ll)(a*(double)b/mod+0.5);ll ret=a*b-d*mod;if (ret<0) ret+=mod;return ret;}
}
using namespace my_std;
int n,m,N;
ll w[sz];
struct hh{int t,nxt;}edge[sz<<2];
int head[sz],ecnt;
void make_edge(int f,int t)
{
edge[++ecnt]=(hh){t,head[f]};
head[f]=ecnt;
edge[++ecnt]=(hh){f,head[t]};
head[t]=ecnt;
}
namespace BuildTree
{
struct hh{int t,nxt;}edge[sz<<1];
int head[sz],ecnt;
void make_edge(int f,int t)
{
edge[++ecnt]=(hh){t,head[f]};
head[f]=ecnt;
edge[++ecnt]=(hh){f,head[t]};
head[t]=ecnt;
}
int dfn[sz],low[sz],cnt;
stack<int>s;
bool in[sz];
#define v edge[i].t
void tarjan(int x,int fa)
{
dfn[x]=low[x]=++cnt;in[x]=1;s.push(x);w[x]=-1;
go(x) if (v!=fa)
{
if (!dfn[v])
{
tarjan(v,x),chkmin(low[x],low[v]);
if (low[v]>=dfn[x])
{
++N;w[N]=1;::make_edge(x,N);
int y;
do{y=s.top();s.pop();in[y]=0;::make_edge(y,N);++w[N];}while (y!=v);
}
}
else if (in[v]) chkmin(low[x],dfn[v]);
}
}
#undef v
void init()
{
read(n,m);
int x,y;
rep(i,1,m) read(x,y),make_edge(x,y);
N=n;
rep(i,1,n) if (!dfn[i]) tarjan(i,0);
}
}
ll ans=0;
int size[sz];
vector<int>rt;
bool vis[sz];
#define v edge[i].t
void dfs1(int x,int fa)
{
if (x<=n) size[x]=1;
vis[x]=1;
go(x) if (v!=fa)
{
dfs1(v,x);
size[x]+=size[v];
}
}
int S;
void dfs2(int x,int fa)
{
if (x<=n) size[x]=1; else size[x]=0;
ll cnt=0;
go(x) if (v!=fa)
{
dfs2(v,x);
cnt+=1ll*size[x]*size[v];
size[x]+=size[v];
}
cnt+=1ll*size[x]*(S-size[x]);
ans+=2ll*cnt*w[x];
}
#undef v
int main()
{
file();
BuildTree::init();
rep(i,1,N) if (!vis[i]) dfs1(i,0),rt.push_back(i);
for (int x:rt) S=size[x],dfs2(x,0);
cout<<ans;
return 0;
}
