Transfer water
Time Limit: 5000/3000 MS (Java/Others) Memory Limit: 65768/65768 K (Java/Others)
Total Submission(s): 3995 Accepted Submission(s): 1438
Problem Description
XiaoA lives in a village. Last year flood rained the village. So they decide to move the whole village to the mountain nearby this year. There is no spring in the mountain, so each household could only dig a well or build a water line from other household. If the household decide to dig a well, the money for the well is the height of their house multiplies X dollar per meter. If the household decide to build a water line from other household, and if the height of which supply water is not lower than the one which get water, the money of one water line is the Manhattan distance of the two households multiplies Y dollar per meter. Or if the height of which supply water is lower than the one which get water, a water pump is needed except the water line. Z dollar should be paid for one water pump. In addition,therelation of the households must be considered. Some households may do not allow some other households build a water line from there house. Now given the 3‐dimensional position (a, b, c) of every household the c of which means height, can you calculate the minimal money the whole village need so that every household has water, or tell the leader if it can’t be done.
Input
Multiple cases.
First line of each case contains 4 integers n (1<=n<=1000), the number of the households, X (1<=X<=1000), Y (1<=Y<=1000), Z (1<=Z<=1000).
Each of the next n lines contains 3 integers a, b, c means the position of the i‐th households, none of them will exceeded 1000.
Then next n lines describe the relation between the households. The n+i+1‐th line describes the relation of the i‐th household. The line will begin with an integer k, and the next k integers are the household numbers that can build a water line from the i‐th household.
If n=X=Y=Z=0, the input ends, and no output for that.
First line of each case contains 4 integers n (1<=n<=1000), the number of the households, X (1<=X<=1000), Y (1<=Y<=1000), Z (1<=Z<=1000).
Each of the next n lines contains 3 integers a, b, c means the position of the i‐th households, none of them will exceeded 1000.
Then next n lines describe the relation between the households. The n+i+1‐th line describes the relation of the i‐th household. The line will begin with an integer k, and the next k integers are the household numbers that can build a water line from the i‐th household.
If n=X=Y=Z=0, the input ends, and no output for that.
Output
One integer in one line for each case, the minimal money the whole village need so that every household has water. If the plan does not exist, print “poor XiaoA” in one line.
Sample Input
2 10 20 30
1 3 2
2 4 1
1 2
2 1 2
0 0 0 0
Sample Output
30
Hint
In 3‐dimensional space Manhattan distance of point A (x1, y1, z1) and B(x2, y2, z2) is |x2‐x1|+|y2‐y1|+|z2‐z1|.
Source
------------ 遇到一个国人发明的算法(algorithm)--------
下面就开始简单的剖析一下,下面的部分吧! 看图
----------~~~~~~~~~~~~~~~魔板AC~~~~~~~~~~~~~--------------
代码:
#include <iostream> #include <cstdio> #include <cstring> using namespace std; #define maxn 1010 #define type int const int inf = ~0u >> 1; struct node { int u,v; type cost; node(){} node(int _u,int _v,type _c):u(_u),v(_v),cost(_c){} }e[maxn * maxn]; int pre[maxn],id[maxn],vis[maxn]; type in[maxn]; type dirmst(int root,int nv,int ne) { type ret = 0; while(1) { //find the smallest in-arc fill(in,in + nv,inf); for(int i = 0;i < ne;i++) { int u = e[i].u; int v = e[i].v; if(e[i].cost < in[v] && u != v) { pre[v] = u; in[v] = e[i].cost; } } for(int i = 0;i < nv;i++) { if(i == root) continue; if(in[i] == inf) return -1;//there are some nodes other than root with no in-arc connected to it } //find the dir circle int cntnode = 0; fill(id,id + nv,-1); fill(vis,vis + nv,-1); in[root] = 0; for(int i = 0;i < nv;i++) { ret += in[i]; int v = i; while(vis[v] != i && id[v] == -1 && v != root) { vis[v] = i; v = pre[v]; } if(v != root && id[v] == -1) { for(int u = pre[v]; u != v;u = pre[u]) id[u] = cntnode; id[v] = cntnode++; } } if(cntnode == 0) break;//no circle for(int i = 0;i < nv;i++) if(id[i] == -1) id[i] = cntnode++; //compress the nodes for(int i = 0;i < ne;i++) { int v = e[i].v; e[i].u = id[e[i].u]; e[i].v = id[e[i].v]; if(e[i].u != e[i].v) e[i].cost -= in[v]; } nv = cntnode; root = id[root]; } return ret; } int n,tot,X,Y,Z; int ab(int x) { return x >= 0?x:-x; } struct point { int x,y,z; point(){} point(int a,int b,int c):x(a),y(b),z(c){} point operator - (const point p) { return point(x - p.x,y - p.y,z - p.z); } int dis() { return ab(x) + ab(y) + ab(z); } }p[maxn]; int main() { while(scanf("%d %d %d %d",&n,&X,&Y,&Z) == 4 && (n || X || Y || Z)) { tot = 0; for(int i = 1;i <= n;i++) { int a,b,c; scanf("%d %d %d",&a,&b,&c); p[i] = point(a,b,c); e[tot++] = node(0,i,ab(p[i].z) * X); } for(int i = 1;i <= n;i++) { int opt; scanf("%d",&opt); for(int j = 0;j < opt;j++) { int a; scanf("%d",&a); if(a == i) continue; int temp = Y * (p[i] - p[a]).dis(); if(p[i].z < p[a].z) temp += Z; e[tot++] = node(i,a,temp); } } int ans = dirmst(0,n + 1,tot); if(ans == -1) puts("poor XiaoA"); else printf("%d ",ans); } }