BZOJ-1721|线性dp-缆车支柱

Ski Lift 缆车支柱

Description

Farmer Ron in Colorado is building a ski resort for his cows (though budget constraints dictate construction of just one ski lift). The lift will be constructed as a monorail and will connect a concrete support at the starting location to the support at the ending location via some number of intermediate supports, each of height 0 above its land. A straight-line segment of steel connects every pair of adjacent supports. For obvious reasons, each section of straight steel must lie above the ground at all points. Always frugal, FR wants to minimize the number of supports that he must build. He has surveyed the N (2 <= N <= 5,000) equal-sized plots of land the lift will traverse and recorded the integral height H (0 <= H <= 1,000,000,000) of each plot. Safety regulations require FR to build adjacent supports no more than K (1 <= K <= N - 1) units apart. The steel between each pair of supports is rigid and forms a straight line from one support to the next. Help FR compute the smallest number of supports required such that: each segment of steel lies entirely above (or just tangent to) each piece of ground, no two consecutive supports are more than K units apart horizontally, and a support resides both on the first plot of land and on the last plot of land.

科罗拉州的罗恩打算为他的奶牛们建造一个滑雪场，虽然需要的设施仅仅是一部缆车．建造一部缆车，需要从山脚到山顶立若干根柱子，并用钢丝连结它们．你可以认为相对于地面，柱子的高度可以忽略不计．每相邻两根柱子间都有钢丝直接相连．显然，所有钢丝的任何一段都不能在地面之下． 为了节省建造的费用，罗恩希望在工程中修建尽可能少的柱子．他在准备修建缆车的山坡上迭定了N(2≤N≤5000)个两两之间水平距离相等的点，并且测量了每个点的高度H(O≤日≤10^9)．并且，按照国家安全标准，相邻两根柱子间的距离不能超过K(1≤K≤N-1)个单位长度．柱子间的钢丝都是笔直的. 罗恩希望你帮他计算一下，在满足下列条件的情况下，他至少要修建多少根柱子：首先，所有的柱子都必须修建在他所选定的点上，且每一段钢丝都必须高于地面或者正好跟地面相切．相邻两根柱子的距离不大于K个单位长度．当然，在第一个点与最后一个点上一定都要修建柱子．

Input

• Line 1: Two space-separate integers, N and K

• Lines 2..N+1: Line i+1 contains a single integer that is the height of plot i.

第1行：两个整数N和K，用空格隔开．

第2到N+1行：每行包括一个正整数，第i+l行的数描述了第i个点的高度．

Output

• Line 1: A single integer equal to the fewest number of lift towers FR needs to build subject to the above constraints

输出一个整数，即罗恩最少需要修建的柱子的数目．

Sample Input 1

13 4
0
1
0
2
4
6
8
6
8
8
9
11
12

Sample Output 1

5

思路：

dp状态转移方程:
dp[i] 表示在i点最少建立的柱子
dp[i] 就等于 dp[i-k] ~ dp[i-1] 上建立的最少的柱子数 + 1

计算斜率，判断两个点是否能连接

AC代码

#include
#define eps 1e-6
using namespace std;

typedef long long ll;
const int maxn = 5010;
int n,k;
ll h[maxn];
ll dp[maxn];

/*
线性dp状态转移方程: 
    dp[i] 表示在i点最少建立的柱子
    dp[i] 就等于 dp[i-k] ~ dp[i-1] 上建立的最少的柱子数 + 1
*/


//判断起点e 和 终点s 是否能建立一个连线 (当且仅当 e 和 s连起来的线段上没有经过其他柱子) 
bool check(int s,int e){
    double h1=h[s],k=(h[e]-h[s])*1.0/(e-s); //k表示斜率 h表示当前高度 
    for(int i=s+1;ieps)return 0;
    }
    return true;
}

int main(){
    scanf("%d%d",&n,&k);
    for(int i=1;i<=n;i++) scanf("%lld",&h[i]);
    memset(dp,0x3f3f3f,sizeof(dp));//要求dp的最小值 先要初始化为无穷大 
    dp[1] = 1;
    dp[2] = 2;
    for(int i=3;i<=n;i++){
        for(int j=max(1,i-k);j dp[j] + 1 && check(j,i)) dp[i] = dp[j] + 1; 
        }
    }
    printf("%lld\n",dp[n]);
    return 0;
}