令 \(a\in A,b\in B\) 则移动向量 \(\omega\) 使得存在 \(b+\omega=a\)
那么 \(\omega\) 需要满足 \(\omega=a?b\)
黑科技:闵可夫斯基和
直接构造闵可夫斯基和 \(C={a+(?b)}\)
余下问题便是判断输入的移动向量是否在 \(C\) 内
可以强行使凸包的最下面为 \((0,0)\),这样只要找到与坐标轴夹角最接近的边就好了
# include <bits/stdc++.h>
using namespace std;
typedef long long ll;
const int maxn(2e5 + 5);
const double eps(1e-13);
const double pi(acos(-1));
const double inf(1e15);
struct Point2D {
double x, y;
inline Point2D(double _x = 0, double _y = 0) {
x = _x, y = _y;
}
inline Point2D operator +(Point2D ad) const {
return Point2D(x + ad.x, y + ad.y);
}
inline Point2D operator -(Point2D ad) const {
return Point2D(x - ad.x, y - ad.y);
}
inline double operator ^(Point2D ad) const { //dot
return x * ad.x + y * ad.y;
}
inline double operator *(Point2D ad) const { //cross
return x * ad.y - y * ad.x;
}
inline Point2D operator *(double ad) const {
return Point2D(x * ad, y * ad);
}
inline double Len() {
return sqrt(x * x + y * y);
}
inline double Angle() {
return atan2(y, x);
}
};
struct Segment2D {
Point2D x, y;
inline Segment2D(Point2D _x = Point2D(0, 0), Point2D _y = Point2D(0, 0)) {
x = _x, y = _y;
}
};
inline Point2D CrossPoint2D(Segment2D a, Segment2D b) {
double k1, k2, t;
k1 = (b.y - a.x) * (a.y - a.x);
k2 = (a.y - a.x) * (b.x - a.x);
t = k2 / (k1 + k2);
return b.x + (b.y - b.x) * t;
}
Point2D tmp[maxn];
inline int Cmp(Point2D x, Point2D y) {
return (x - tmp[1]) * (y - tmp[1]) > 0;
}
inline void Graham(Point2D *a, int &len) {
int l = 0, mn = 0, i;
for (i = 1; i <= len; ++i)
if (!mn || (a[i].x < a[mn].x || (a[i].x == a[mn].x && a[i].y < a[mn].y))) mn = i;
swap(a[1], a[mn]), tmp[l = 1] = a[1], sort(a + 2, a + len + 1, Cmp);
for (i = 2; i <= len; ++i) {
while (l > 1 && (a[i] - tmp[l - 1]) * (tmp[l] - tmp[l - 1]) >= 0) --l;
tmp[++l] = a[i];
}
for (i = 1; i <= l; ++i) a[i] = tmp[i];
len = l;
}
int n, m, q, len;
Point2D a[maxn], b[maxn], c[maxn], p;
inline void Minkowski() {
int i, j;
c[len = 1] = a[1] + b[1], a[0] = a[1], b[0] = b[1];
for (i = 1; i < n; ++i) a[i] = a[i + 1] - a[i];
for (i = 1; i < m; ++i) b[i] = b[i + 1] - b[i];
a[n] = a[0] - a[n], b[m] = b[0] - b[m];
for (i = j = 1; i <= n || j <= m; )
if (j > m || (i <= n && a[i] * b[j] >= 0)) ++len, c[len] = c[len - 1] + a[i++];
else ++len, c[len] = c[len - 1] + b[j++];
}
inline int Query() {
int l, r, mid, cur = 2;
p = p - c[1];
if (c[len] * p > 0 || p * c[2] > 0) return 0;
l = 2, r = len - 1;
while (l <= r) {
mid = (l + r) >> 1;
if (c[mid] * p > 0) l = mid + 1, cur = mid;
else r = mid - 1;
}
return (p - c[cur]) * (c[cur + 1] - c[cur]) <= 0;
}
int main() {
int i;
scanf("%d%d%d", &n, &m, &q);
for (i = 1; i <= n; ++i) scanf("%lf%lf", &a[i].x, &a[i].y);
for (i = 1; i <= m; ++i) scanf("%lf%lf", &b[i].x, &b[i].y), b[i] = b[i] * -1;
Graham(a, n), Graham(b, m), Minkowski(), Graham(c, len);
for (i = 2; i <= len; ++i) c[i] = c[i] - c[1];
for (i = 1; i <= q; ++i) scanf("%lf%lf", &p.x, &p.y), printf("%d\n", Query());
return 0;
}原文:https://www.cnblogs.com/cjoieryl/p/10291490.html