HDU 3824/ BZOJ 3963 [WF2011]MachineWorks (斜率优化DP+CDQ分治维护凸包)

题面

在这里插入图片描述
BZOJ传送门(中文题面但是权限题)
HDU传送门(英文题面)

分析

定义 $f[i]$ 表示在 $i$ 时间(离散化之后)卖出手上的机器的最大收益.转移方程式比较好写 $f[i]=max{f[j]-p[j]+r[j]+(d[i]-d[j]-1)*g[j]}$
显然可以斜率优化,移项之后得到 $(f[j]-p[j]+r[j]-d[j]*g[j]-g[j])=(-d[i]*g[j])+(f[i])$
也就是 $y=kx+b$ 的形式,我们要让 $f[i]$ 最大,也就是截距最大.那么维护一个上凸包就行了.为了求凸包插入点的 $x$ 坐标单增,于是用 $CDQ$ 分治来转移,转移时用归并排序.

啊啊啊啊啊啊啊啊啊啊啊啊啊把 $while$ 写成 $if$ 然后WA爆了

CODE

#include <bits/stdc++.h>
using namespace std;
typedef long long LL;
template<typename T>inline void read(T &num) {
    char ch; int flg=1;
    while((ch=getchar())<'0'||ch>'9')if(ch=='-')flg=-flg;
    for(num=0;ch>='0'&&ch<='9';num=num*10+ch-'0',ch=getchar());
    num*=flg;
}
const int MAXN = 100005;
const double eps = 1e-10;
struct Vector {
    LL x, y;
    Vector(){}
    Vector(LL _x, LL _y):x(_x), y(_y){}
    inline Vector operator -(const Vector &o) { return Vector(x-o.x, y-o.y); }
    inline double operator *(const Vector &o) { return (double)x*o.y - (double)y*o.x; } //会炸longlong,只有用double
}p[MAXN], Q[MAXN];
LL f[MAXN];
struct Node {
    LL p, r, d, g, x, y; int id;
    inline void init() {
        read(d), read(p), read(r), read(g);
        x = g, y = -p+r-d*g-g;
    }
}a[MAXN], tmp[MAXN];
inline bool cmpD(const Node &A, const Node &B) { return A.d < B.d; }
inline bool cmp(const Node &A, const Node &B) {
    return A.x == B.x ? A.y + f[A.id] < B.y + f[B.id] : A.x < B.x;
}
inline int dcmp(double x) {
    return x < -eps ? -1 : x < eps ? 0 : 1;
}
inline LL line(const Vector &P, LL k) { return P.y - k*P.x; } //求截距
void CDQ(int l, int r) {
    if(l == r) { f[l] = max(f[l], f[l-1]); return; }
    int mid = (l + r) >> 1;
    CDQ(l, mid);
    int n = 0, s = 0, t = 0;
    for(int i = l; i <= mid; ++i) if(f[a[i].id] >= a[i].p)
        p[++n] = Vector(a[i].x, a[i].y + f[a[i].id]);
    for(int i = 1; i <= n; ++i) {
        while(s+1 < t && dcmp((Q[t-1]-Q[t-2]) * (p[i]-Q[t-2])) >= 0) --t;
        Q[t++] = p[i];
    }
    for(int i = mid+1; i <= r; ++i) {
        while(s+1 < t && line(Q[s+1], -a[i].d) >= line(Q[s], -a[i].d)) ++s;
        if(s < t) f[i] = max(f[i], line(Q[s], -a[i].d));
    }
    CDQ(mid+1, r);
    int cur1 = l, cur2 = mid+1;
    for(int i = l; i <= r; ++i) {
        if(cur2 > r || (cur1 <= mid && cmp(a[cur1], a[cur2]))) tmp[i] = a[cur1++];
        else tmp[i] = a[cur2++];
    }
    for(int i = l; i <= r; ++i) a[i] = tmp[i];
}

int n, D, kase;

int main () {
    while(read(n), read(f[0]), read(D), n+f[0]+D) {
        for(int i = 1; i <= n; ++i) a[i].init();
        a[++n].d = D + 1;
        sort(a + 1, a + n + 1, cmpD);
        for(int i = 1; i <= n; ++i) a[i].id = i, f[i] = 0;
        CDQ(1, n);
        printf("Case %d: %lld
", ++kase, f[n]);
    }
}
//f[i] = f[j] - p[j] + r[j] + (D[i]-D[j]-1)*G[j]
//f[i] + (-D[i])*G[j] = f[j] - p[j] + r[j] - (D[j]+1)*G[j]