FJ省队集训DAY1 T1

题意:有一堆兔子，还有一个r为半径的圆，要求找到最大集合满足这个集合里的兔子两两连边的直线不经过圆。

思路:发现如果有两个点之间连边不经过圆，那么他们到圆的切线会构成一段区间，那么这两个点的区间一定会有交集，形如s0 s1 e0 e1

同样的，如果是n个点，那就是s0 s1 s2..sn e0 e1 e2.. en

因此，我们枚举那个起始点，然后对于其他点我们按照s排序，对于e做最长上升子序列即可。时间复杂度O（n^2 logn)

#include <cstdio>
#include <algorithm>
#include <cmath>
#include <vector>
const double pi = 3.14159265358979324;
double th1[2000], th2[2000], b[2000], x[2000], y[2000];
std::pair<std::pair<double, double>, int> a[2000];
int t[2001], t2[2001], f[2001], n;
std::vector<int> ansv;
double r;
int main() {
    freopen("crazy.in", "r", stdin);
    freopen("crazy.out", "w", stdout);
    scanf("%d%lf", &n, &r);
    for (int i = 0; i < n; i++) {
        scanf("%lf%lf", &x[i], &y[i]);
        double th = atan2(y[i], x[i]);
        double dth = acos(r / sqrt(x[i] * x[i] + y[i] * y[i]));
        th1[i] = th + dth; if (th1[i] > pi) th1[i] -= 2*pi;
        th2[i] = th - dth; if (th2[i] <= -pi) th2[i] += 2*pi;
        if (th1[i] > th2[i]) std::swap(th1[i], th2[i]);
    }
    int ans = 1;
    ansv.push_back(0);
    for (int i = 0; i < n; i++) {
        int l = 0, ans2 = -1;
        for (int j = 0; j < n; j++)
            if (i != j && (th1[j] < th1[i] || th1[j] > th2[i] || th2[j] < th1[i] || th2[j] > th2[i])
                    && (th1[j] > th1[i] && th1[j] < th2[i] || th2[j] > th1[i] && th2[j] < th2[i])) {
                if (th1[j] > th1[i] && th1[j] < th2[i]) {
                    a[l].first.first = th1[j] - th1[i];
                    a[l].first.second = th2[j] - th2[i];
                } else {
                    a[l].first.first = th2[j] - th1[i];
                    a[l].first.second = th1[j] - th2[i];
                }
                if (a[l].first.second < 0) a[l].first.second += 2*pi;
                a[l].second = j;
                l++;
            }
        std::sort(a, a + l);
        for (int j = 0; j < l; j++) b[j] = a[j].first.second;
        std::sort(b, b + l);
        for (int j = 1; j <= l; j++) t[j] = 0;
        for (int j = 0; j < l; j++) {
            int p = std::lower_bound(b, b + l, a[j].first.second) - b + 1;
            int v = 0, v2 = -1;
            for (int k = p; k; k -= k&-k)
                if (t[k] > v) v = t[k], v2 = t2[k];
            v++;
            f[a[j].second] = v2;
            if (v+1 > ans) ans = v+1, ans2 = a[j].second;
            for (int k = p; k <= l; k += k&-k)
                if (t[k] < v) t[k] = v, t2[k] = a[j].second;
        }
        if (ans2 != -1) {
            ansv.clear();
            while (ans2 != -1)
                ansv.push_back(ans2), ans2 = f[ans2];
            ansv.push_back(i);
        }
    }
    printf("%d
", ans);
    return 0;
}