题目:给出空间中的n对点,要求从每对点中选出一个,使得最近的点的距离最远。
分析:
二分的思想很明显,二分答案之后,建图:如果两点之间的距离小于二分值时,连接相应的边,通过2-sat判断一下即可。
注意到题目的要求是向下取整,于是我们可以先*10000,最后直接取模即可。
#include <set>
#include <map>
#include <list>
#include <cmath>
#include <queue>
#include <stack>
#include <string>
#include <vector>
#include <cstdio>
#include <cstring>
#include <iostream>
#include <algorithm>
using namespace std;
typedef long long ll;
typedef unsigned long long ull;
#define debug puts("here")
#define rep(i,n) for(int i=0;i<n;i++)
#define rep1(i,n) for(int i=1;i<=n;i++)
#define REP(i,a,b) for(int i=a;i<=b;i++)
#define foreach(i,vec) for(unsigned i=0;i<vec.size();i++)
#define pb push_back
#define RD(n) scanf("%d",&n)
#define RD2(x,y) scanf("%d%d",&x,&y)
#define RD3(x,y,z) scanf("%d%d%d",&x,&y,&z)
#define RD4(x,y,z,w) scanf("%d%d%d%d",&x,&y,&z,&w)
#define All(vec) vec.begin(),vec.end()
#define MP make_pair
#define PII pair<int,int>
#define PQ priority_queue
#define cmax(x,y) x = max(x,y)
#define cmin(x,y) x = min(x,y)
#define Clear(x) memset(x,0,sizeof(x))
/******** program ********************/
const int MAXN = 405;
const int MAXM = 1000005;
int low[MAXN],sta[MAXN],dfn[MAXN],fa[MAXN],dep,bcnt,top;
bool use[MAXN];
int po[MAXN],tol,n,m;
struct Edge {
int y,next;
} edge[MAXM];
struct Point {
int a[3];
void rd() {
RD3(a[0],a[1],a[2]);
a[0] *= 10000;
a[1] *= 10000;
a[2] *= 10000;
}
} p[MAXN][2];
void add(int x,int y) {
edge[++tol].y = y;
edge[tol].next = po[x];
po[x] = tol;
}
void dfs(int x) {
sta[++top] = x;
use[x] = true;
low[x] = dfn[x] = ++ dep;
int y;
for(int i=po[x]; i; i=edge[i].next) {
y = edge[i].y;
if(!dfn[y]) {
dfs(y);
low[x] = min(low[x],low[y]);
} else if(use[y])
low[x] = min(low[x],dfn[y]);
}
if(low[x]==dfn[x]) {
++ bcnt;
do {
y = sta[top--];
use[y] = false;
fa[y] = bcnt;
} while(x!=y);
}
}
bool sat() {
memset(dfn,0,sizeof(dfn));
memset(use,false,sizeof(use));
dep = top = bcnt = 0;
rep1(i,2*n)
if(!dfn[i])
dfs(i);
rep1(i,n)
if(fa[i]==fa[i+n])
return false;
return true;
}
ll sqr(ll x) {
return x*x;
}
ll dist(Point a,Point b) {
return sqr(a.a[0]-b.a[0])+sqr(a.a[1]-b.a[1])+sqr(a.a[2]-b.a[2]);
}
bool solve(ll mid) {
memset(po,0,sizeof(po));
tol = 0;
rep1(i,n) {
rep1(j,n) {
if(i==j)continue;
ll d = dist(p[i][0],p[j][0]);
if(d<mid) {
add(i,j+n);
add(j,i+n);
}
d = dist(p[i][0],p[j][1]);
if(d<mid) {
add(i,j);
add(j+n,i+n);
}
d = dist(p[i][1],p[j][0]);
if(d<mid) {
add(i+n,j+n);
add(j,i);
}
d = dist(p[i][1],p[j][1]);
if(d<mid) {
add(i+n,j);
add(j+n,i);
}
}
}
return sat();
}
int main() {
#ifndef ONLINE_JUDGE
freopen("sum.in", "r", stdin);
// freopen("cf.out", "w", stdout);
#endif
while(~RD(n)) {
rep1(i,n) {
p[i][0].rd();
p[i][1].rd();
}
ll ans = -1 , l = 0 , r = 2000000000LL;
while(l<=r) {
ll mid = (l+r)/2;
if(solve(mid*mid)) {
l = mid+1;
ans = mid;
} else r = mid-1;
}
printf("%lld.%03lld
",ans/20000,(ans/2%10000)/10 );
}
return 0;
}