BZOJ4049 [Cerc2014] Mountainous landscape

首先对于一个给定的图形，要找到是否存在答案非常简单。。。

只要维护当然图形的凸包，看一下是否有线段在这条直线上方，直接二分即可，单次询问的时间复杂度$O(logn)$

现在用线段树维护凸包，即对于一个区间$[l, r]$，我们维护点$[P_l, P_{r +1}]$形成的凸包

于是每次查询只要在线段树上二分，总复杂度$O(nlogn + nlog^2n)$(建树 + 查询)

 /**************************************************************

     Problem: 4049

     User: rausen

     Language: C++

     Result: Accepted

     Time:5052 ms

     Memory:73960 kb

 ****************************************************************/

 #include <cstdio>

 #include <vector>

 using namespace std;

 typedef long long ll;

 const int N = 1e5 + ;

 int read();

 int n;

 struct point {

     int x, y;

     point(int _x, int _y) : x(_x), y(_y) {}

     point() {}

     inline point operator + (const point &p) const {

         return point(x + p.x, y + p.y);

     }

     inline point operator - (const point &p) const {

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

     }

     inline ll operator * (const point &p) const {

         return 1ll * x * p.y - 1ll * y * p.x;

     }

     inline void get() {

         x = read(), y = read();

     }

     friend inline ll calc(const point &a, const point &b, const point &c) {

         return (a - b) * (c - b);

     }

 } p[N];

 struct convex {

     vector <point> s;

     inline void clear() {

         s.clear();

     }

     #define top ((int) s.size() - 1)

     inline void insert(const point &p) {

         while (top >  && calc(p, s[top - ], s[top]) <= ) s.pop_back();

         s.push_back(p);

     }

     #define mid (l + r >> 1)

     inline bool query(const point &p, const point &q) {

         int l = , r = top - ;

         while (l < r) {

             if (calc(s[mid], p, q) < calc(s[mid + ], p, q)) r = mid;

             else l = mid + ;

         }

         return calc(s[l], p, q) <  || calc(s[l + ], p, q) < ;

     }

     #undef mid

     #undef top

 };

 struct seg {

     seg *ls, *rs;

     convex c;

     #define Len (1 << 16)

     inline void* operator new(size_t, int f = ) {

         static seg mempool[N << ], *c;

         if (f) c = mempool;

         c -> ls = c -> rs = NULL, c -> c.clear();

         return c++;

     }

     #undef Len

     #define mid (l + r >> 1)

     void build(int l, int r) {

         int i;

         for (i = l; i <= r + ; ++i) c.insert(p[i]);

         if (l == r) return;

         (ls = new()seg) -> build(l, mid);

         (rs = new()seg) -> build(mid + , r);

     }

     int query(int l, int r, int L, int R, const point &p, const point &q) {

         if (R < l || r < L) return ;

         if (L <= l && r <= R) {

             if (!c.query(p, q)) return ;

             if (l == r) return l;

         }

         int res = ls -> query(l, mid, L, R, p, q);

         return res ? res : rs -> query(mid + , r, L, R, p, q);

     }

     #undef mid

 } *T;

 int main() {

     int Tmp, i;

     for (Tmp = read(); Tmp; --Tmp) {

         n = read();

         for (i = ; i <= n; ++i) p[i].get();

         (T = new()seg) -> build(, n - );

         for (i = ; i < n - ; ++i)

             printf("%d ", T -> query(, n - , i + , n - , p[i], p[i + ]));

         puts("");

     }

     return ;

 }

 inline int read() {

     static int x;

     static char ch;

     x = , ch = getchar();

     while (ch < '' || '' < ch)

         ch = getchar();

     while ('' <= ch && ch <= '') {

         x = x *  + ch - '';

         ch = getchar();

     }

     return x;

 }