LINK

题意：给出一个简单几何，问与其边距离长为L的几何图形的周长。

思路：求一个几何图形的最小外接几何，就是求凸包，距离为L相当于再多增加上一个圆的周长（因为只有四个角）。看了黑书使用graham算法极角序求凸包会有点小问题，最好用水平序比较好。或者用Melkman算法

/** @Date    : 2017-07-13 14:17:05

  * @FileName: POJ 1113 极角序求凸包 基础凸包.cpp

  * @Platform: Windows

  * @Author  : Lweleth (SoungEarlf@gmail.com)

  * @Link    : https://github.com/

  * @Version : $Id$

  */

#include <stdio.h>

#include <iostream>

#include <string.h>

#include <algorithm>

#include <utility>

#include <vector>

#include <map>

#include <set>

#include <string>

#include <stack>

#include <queue>

#include <math.h>

//#include <bits/stdc++.h>

#define LL long long

#define PII pair<int ,int>

#define MP(x, y) make_pair((x),(y))

#define fi first

#define se second

#define PB(x) push_back((x))

#define MMG(x) memset((x), -1,sizeof(x))

#define MMF(x) memset((x),0,sizeof(x))

#define MMI(x) memset((x), INF, sizeof(x))

using namespace std;

const int INF = 0x3f3f3f3f;

const int N = 1e5+20;

const double eps = 1e-8;

const double Pi = acos(-1.0);

struct point

{

	int x, y;

	point(){}

	point(int _x, int _y){x = _x, y = _y;}

	point operator -(const point &b) const

	{

		return point(x - b.x, y - b.y);

	}

	int operator *(const point &b) const

	{

		return x * b.x + y * b.y;

	}

	int operator ^(const point &b) const

	{

		return x * b.y - y * b.x;

	}

};

double xmult(point p1, point p2, point p0)

{

    return (p1 - p0) ^ (p2 - p0);

}  

double distc(point a, point b)

{

	return sqrt((double)((b - a) * (b - a)));

}

int n, l;

point p[N];

stack<int>s;

int cmp(point a, point b)//以p[0]基准 极角序排序

{

	int t = xmult(a, b, p[0]);

	if(t > 0)

		return 1;

	if(t == 0)

		return distc(a, p[0]) < distc(b, p[0]);

	if(t < 0)

		return 0;

}

void graham()

{

	while(!s.empty())

		s.pop();

	for(int i = 0; i < min(n, 2); i++)

		s.push(i);

	int t = 1;

	for(int i = 2; i < n; i++)

	{

		while(s.size() > 1)

		{

			int p2 = s.top();

			s.pop();

			int p1 = s.top();

			if(xmult(p[p1], p[p2], p[i]) > 0)

			{

				s.push(p2);

				break;

			}

		}

		s.push(i);

	}

}

int main()

{

	while(~scanf("%d%d", &n, &l))

	{

		int x, y;

		int mix, miy;

		mix = miy = INF;

		int pos = -1;

		for(int i = 0; i < n; i++)

		{

			scanf("%d%d", &x, &y);

			p[i] = point(x, y);

			if(miy > y || miy == y && mix > x)//注意选第一个点 是最左下方的

			{

				mix = x, miy = y;

				pos = i;

			}

		}

		swap(p[pos], p[0]);

		sort(p + 1, p + n, cmp);

		graham();

		double ans = l * Pi * 2.0000;

		int t = 0;

		while(!s.empty())

		{

			ans += distc(p[t], p[s.top()]);

			t = s.top();

			s.pop();

		}

		printf("%d\n", (int)(ans + 0.500000));

	}

    return 0;

}