旋转卡壳算法如图
证明:对于直径AB 必然有某一时刻 A和B同时被卡住 所以旋转卡壳卡住的点集中必然存在直径
而卡壳过程显然是O(n)的 故可在O(n)时间内求出直径
凸包具有良好的性质 其中的点是有序的 对于某个点 从它之后的点与它的距离必然是一个单峰凸函数 根据这个性质也可以设计一个O(nlogn)的算法
给出代码
#include<iostream>
#include<stdio.h>
#include<stdlib.h>
#include<string.h>
#include<math.h>
#include<algorithm>
#include<queue>
#include<vector>
using namespace std; const double eps=1e-9; int cmp(double x)
{
if(fabs(x)<eps)return 0;
if(x>0)return 1;
else return -1;
} const double pi=acos(-1.0); inline double sqr(double x)
{
return x*x;
} struct point
{
double x,y;
point (){}
point (double a,double b):x(a),y(b){}
void input()
{
scanf("%lf%lf",&x,&y);
}
friend point operator +(const point &a,const point &b)
{
return point(a.x+b.x,a.y+b.y);
}
friend point operator -(const point &a,const point &b)
{
return point(a.x-b.x,a.y-b.y);
}
friend bool operator ==(const point &a,const point &b)
{
return cmp(a.x-b.x)==0&&cmp(a.y-b.y)==0;
}
friend point operator *(const point &a,const double &b)
{
return point(a.x*b,a.y*b);
}
friend point operator*(const double &a,const point &b)
{
return point(a*b.x,a*b.y);
}
friend point operator /(const point &a,const double &b)
{
return point(a.x/b,a.y/b);
}
double norm()
{
return sqr(x)+sqr(y);
}
}; struct line
{
point a,b;
line(){};
line(point x,point y):a(x),b(y)
{ }
};
double det(const point &a,const point &b)
{
return a.x*b.y-a.y*b.x;
} double dot(const point &a,const point &b)
{
return a.x*b.x+a.y*b.y;
} double dist(const point &a,const point &b)
{
return (a-b).norm();
} point rotate_point(const point &p,double A)
{
double tx=p.x,ty=p.y;
return point(tx*cos(A)-ty*sin(A),tx*sin(A)+ty*cos(A));
} bool parallel(line a,line b)
{
return !cmp(det(a.a-a.b,b.a-b.b));
} bool line_joined(line a,line b,point &res)
{
if(parallel(a,b))return false;
double s1=det(a.a-b.a,b.b-b.a);
double s2=det(a.b-b.a,b.b-b.a);
res=(s1*a.b-s2*a.a)/(s1-s2);
return true;
} bool pointonSegment(point p,point s,point t)
{
return cmp(det(p-s,t-s))==0&&cmp(dot(p-s,p-t))<=0;
} void PointProjLine(const point p,const point s,const point t,point &cp)
{
double r=dot((t-s),(p-s))/dot(t-s,t-s);
cp=s+r*(t-s);
} struct polygon_convex
{
vector<point>P;
polygon_convex(int Size=0)
{
P.resize(Size);
}
}; bool comp_less(const point &a,const point &b)
{
return cmp(a.x-b.x)<0||cmp(a.x-b.x)==0&&cmp(a.y-b.y)<0; } polygon_convex convex_hull(vector<point> a)
{
polygon_convex res(2*a.size()+5);
sort(a.begin(),a.end(),comp_less);
a.erase(unique(a.begin(),a.end()),a.end());//删去重复点
int m=0;
for(int i=0;i<a.size();i++)
{
while(m>1&&cmp(det(res.P[m-1]-res.P[m-2],a[i]-res.P[m-2]))<=0)--m;
res.P[m++]=a[i];
}
int k=m;
for(int i=int(a.size())-2;i>=0;--i)
{
while(m>k&&cmp(det(res.P[m-1]-res.P[m-2],a[i]-res.P[m-2]))<=0)--m;
res.P[m++]=a[i];
}
res.P.resize(m);
if(a.size()>1)res.P.resize(m-1);
return res;
} bool is_convex(vector<point> &a)
{
for(int i=0;i<a.size();i++)
{
int i1=(i+1)%int(a.size());
int i2=(i+2)%int(a.size());
int i3=(i+3)%int(a.size());
if((cmp(det(a[i1]-a[i],a[i2]-a[i1]))*cmp(det(a[i2]-a[i1],a[i3]-a[i2])))<0)
return false;
}
return true;
}
int containO(const polygon_convex &a,const point &b)
{
int n=a.P.size();
point g=(a.P[0]+a.P[n/3]+a.P[2*n/3])/3.0;
int l=0,r=n;
while(l+1<r)
{
int mid=(l+r)/2;
if(cmp(det(a.P[l]-g,a.P[mid]-g))>0)
{
if(cmp(det(a.P[l]-g,b-g))>=0&&cmp(det(a.P[mid]-g,b-g))<0)r=mid;
else l=mid;
}else
{
if(cmp(det(a.P[l]-g,b-g))<0&&cmp(det(a.P[mid]-g,b-g))>=0)l=mid;
else r=mid;
}
}
r%=n;
int z=cmp(det(a.P[r]-b,a.P[l]-b))-1;
if(z==-2)return 1;
return z;
}
long long int distant(point a,point b)
{
return (int(b.x)-int(a.x))*(int(b.x)-int(a.x))+(int(b.y)-int(a.y))*(int(b.y)-int(a.y));
}
double convex_diameter(polygon_convex &a,int &First,int &Second)
{
vector<point> &p=a.P;
int n=p.size();
double maxd=0;
if(n==1)
{
First=Second=0;
return maxd;
}
#define next(i)((i+1)%n)
for(int i=0,j=1;i<n;++i)
{
while(cmp(det(p[next(i)]-p[i],p[j]-p[i])-det(p[next(i)]-p[i],p[next(j)]-p[i]))<0)
j=next(j);
double d=dist(p[i],p[j]);
if(d>maxd)
{
maxd=d;
First=i,Second=j;
}
d=dist(p[next(i)],p[next(j)]);
if(d>maxd)
{
maxd=d;
First=next(i),Second=next(j);
} }
return maxd;
} vector<point> pp; int main()
{freopen("t.txt","r",stdin);
pp.clear();
int n;
scanf("%d",&n);
for(int i=0;i<n;i++)
{
point pn;pn.input();
pp.push_back(pn);
}
int a,b;
polygon_convex pc= convex_hull(pp);
int ans=0; printf("%.0lf\n",convex_diameter(pc,a,b));
return 0;
}