POJ 3171 區間最小花費覆蓋 (DP+線段樹
阿新 • • 發佈:2018-08-19
cat scanf ron have -- sin 排列 resp lin Cleaning Shifts
Farmer John has N (1 <= N <= 10,000) cows who are willing to do some cleaning. Because dust falls continuously, the cows require that the farm be continuously cleaned during the workday, which runs from second number M to second number E during the day (0 <= M <= E <= 86,399). Note that the total number of seconds during which cleaning is to take place is E-M+1. During any given second M..E, at least one cow must be cleaning.
Each cow has submitted a job application indicating her willingness to work during a certain interval T1..T2 (where M <= T1 <= T2 <= E) for a certain salary of S (where 0 <= S <= 500,000). Note that a cow who indicated the interval 10..20 would work for 11 seconds, not 10. Farmer John must either accept or reject each individual application; he may NOT ask a cow to work only a fraction of the time it indicated and receive a corresponding fraction of the salary.
Find a schedule in which every second of the workday is covered by at least one cow and which minimizes the total salary that goes to the cows.
Line 1: Three space-separated integers: N, M, and E.
Lines 2..N+1: Line i+1 describes cow i‘s schedule with three space-separated integers: T1, T2, and S.
FJ has three cows, and the barn needs to be cleaned from second 0 to second 4. The first cow is willing to work during seconds 0, 1, and 2 for a total salary of 3, etc.
Farmer John can hire the first two cows.
Time Limit: 1000MS | Memory Limit: 65536K | |
Total Submissions: 4245 | Accepted: 1429 |
Description
Farmer John‘s cows, pampered since birth, have reached new heights of fastidiousness. They now require their barn to be immaculate. Farmer John, the most obliging of farmers, has no choice but hire some of the cows to clean the barn.Farmer John has N (1 <= N <= 10,000) cows who are willing to do some cleaning. Because dust falls continuously, the cows require that the farm be continuously cleaned during the workday, which runs from second number M to second number E during the day (0 <= M <= E <= 86,399). Note that the total number of seconds during which cleaning is to take place is E-M+1. During any given second M..E, at least one cow must be cleaning.
Each cow has submitted a job application indicating her willingness to work during a certain interval T1..T2 (where M <= T1 <= T2 <= E) for a certain salary of S (where 0 <= S <= 500,000). Note that a cow who indicated the interval 10..20 would work for 11 seconds, not 10. Farmer John must either accept or reject each individual application; he may NOT ask a cow to work only a fraction of the time it indicated and receive a corresponding fraction of the salary.
Find a schedule in which every second of the workday is covered by at least one cow and which minimizes the total salary that goes to the cows.
Input
Lines 2..N+1: Line i+1 describes cow i‘s schedule with three space-separated integers: T1, T2, and S.
Output
Line 1: a single integer that is either the minimum total salary to get the barn cleaned or else -1 if it is impossible to clean the barn.Sample Input
3 0 4 0 2 3 3 4 2 0 0 1
Sample Output
5
Hint
Explanation of the sample:FJ has three cows, and the barn needs to be cleaned from second 0 to second 4. The first cow is willing to work during seconds 0, 1, and 2 for a total salary of 3, etc.
Farmer John can hire the first two cows.
Source
USACO 2005 December Silver題意:給n個區間及其代價值,問要覆蓋[M,E]區間至少要花費多少代價;
解法:這是一個dp問題,先列出方程。
F[i]表示取[0,i]這個區間的代價,初始化F[M-1]=0,答案就是F[E].
則方程為F[a[i].T2]=min(F[a[j].T2])+a[i].s (T1-1<=a[j].T2<T2),找min的過程用線段樹實現。
將a[i]按T2從小到大排列,逐步更新最小值。
代碼:
1 #include"bits/stdc++.h" 2 3 #define ll long long 4 #define vl vector<ll> 5 #define ci(x) scanf("%d",&x) 6 #define pi(x) printf("%d\n",x) 7 #define pl(x) printf("%lld\n",x) 8 #define rep(i, n) for(int i=0;i<n;i++) 9 using namespace std; 10 const int NN = 1e6 + 5; 11 int n,s,t; 12 struct P{int x,y,s;}; 13 P a[NN]; 14 bool cmp(P a,P b){ 15 return a.y<b.y; 16 } 17 const ll INF = 0x3fffffffffffffff; 18 struct SegMin { 19 int N; 20 vl is;vl mul;vl add; 21 ll init; 22 ll merge(ll a, ll b) { 23 return min(a, b); 24 } 25 void push(int o, int L, int R, ll m, ll a) { 26 is[o] = is[o] * m + a; 27 mul[o] = mul[o] * m; 28 add[o] = add[o] * m + a; 29 } 30 31 SegMin(int n, ll init=INF) { 32 N = 1; 33 while (N < n) N *= 2; 34 this->init = init; 35 is = vl(N * 4, init); 36 mul = vl(N * 4, 1); 37 add = vl(N * 4); 38 } 39 40 SegMin(vl a, ll init=INF) { 41 int n = a.size(); 42 N = 1; 43 while (N < n) N *= 2; 44 this->init = init; 45 is = vl(N * 2); 46 mul = vl(N * 2, 1); 47 add = vl(N * 2); 48 copy(a.begin(), a.end(), is.begin() + N); 49 for (int i = N - 1; i > 0; i--) { 50 is[i] = merge(is[i << 1], is[i << 1 | 1]); 51 } 52 } 53 54 void update(int l, int r, ll m, ll a) { 55 if (l < r) update(1, 0, N, l, r, m, a); 56 } 57 58 void update(int o, int L, int R, int l, int r, ll m, ll a) { 59 if (l <= L && R <= r) { 60 push(o, L, R, m, a); 61 } else { 62 int M = (L + R) >> 1; 63 push(o, L, M, R); 64 if (l < M) update(o << 1, L, M, l, r, m, a); 65 if (r > M) update(o << 1 | 1, M, R, l, r, m, a); 66 is[o] = merge(is[o << 1], is[o << 1 | 1]); 67 } 68 } 69 70 void push(int o, int L, int M, int R) { 71 if (mul[o] != 1 || add[o] != 0) { 72 push(o << 1, L, M, mul[o], add[o]); 73 push(o << 1 | 1, M, R, mul[o], add[o]); 74 mul[o] = 1; 75 add[o] = 0; 76 } 77 } 78 79 ll query(int l, int r) { 80 if (l < r) return query(1, 0, N, l, r); 81 return init; 82 } 83 84 ll query(int o, int L, int R, int l, int r) { 85 if (l <= L && R <= r) { 86 return is[o]; 87 } else { 88 int M = (L + R) >> 1; 89 push(o, L, M, R); 90 ll res = init; 91 if (l < M) res = merge(res, query(o << 1, L, M, l, r)); 92 if (r > M) res = merge(res, query(o << 1 | 1, M, R, l, r)); 93 is[o] = merge(is[o << 1], is[o << 1 | 1]); 94 return res; 95 } 96 } 97 }; 98 99 int main(){ 100 ci(n),ci(s),ci(t);//s從1開始 101 s++,t++; 102 int ma=0; 103 for(int i=0;i<n;i++) ci(a[i].x),ci(a[i].y),ci(a[i].s); 104 for(int i=0;i<n;i++) a[i].x++,a[i].y++,ma=max(ma,a[i].y); 105 sort(a,a+n,cmp); 106 SegMin seg(ma+1); 107 seg.update(0,ma+1,0,INF); 108 seg.update(0,s,0,0); 109 110 for(int i=0;i<n;i++){ 111 if(a[i].y<s) continue; 112 int L=a[i].x-1,R=a[i].y; 113 ll res=seg.query(L,R)+a[i].s; 114 res=min(seg.query(R,R+1),res);//與前面的最小值取min 115 seg.update(R,R+1,0,res); 116 } 117 ll ans=seg.query(t,ma+1); 118 if(ans>=INF) puts("-1");//未覆蓋到 119 else pl(ans); 120 return 0; 121 }
POJ 3171 區間最小花費覆蓋 (DP+線段樹