POJ 1502:MPI Maelstrom Dijkstra模板题
MPI Maelstrom
Time Limit: 1000MS | Memory Limit: 10000K | |
Total Submissions: 6499 | Accepted: 4036 |
Description
BIT has recently taken delivery of their new supercomputer, a 32 processor Apollo Odyssey distributed shared memory machine with a hierarchical communication subsystem. Valentine McKee's research advisor, Jack Swigert, has asked her to benchmark the new system.
``Since the Apollo is a distributed shared memory machine, memory access and communication times are not uniform,'' Valentine told Swigert. ``Communication is fast between processors that share the same memory subsystem, but it is slower between processors that are not on the same subsystem. Communication between the Apollo and machines in our lab is slower yet.''
``How is Apollo's port of the Message Passing Interface (MPI) working out?'' Swigert asked.
``Not so well,'' Valentine replied. ``To do a broadcast of a message from one processor to all the other n-1 processors, they just do a sequence of n-1 sends. That really serializes things and kills the performance.''
``Is there anything you can do to fix that?''
``Yes,'' smiled Valentine. ``There is. Once the first processor has sent the message to another, those two can then send messages to two other hosts at the same time. Then there will be four hosts that can send, and so on.''
``Ah, so you can do the broadcast as a binary tree!''
``Not really a binary tree -- there are some particular features of our network that we should exploit. The interface cards we have allow each processor to simultaneously send messages to any number of the other processors connected to it. However, the messages don't necessarily arrive at the destinations at the same time -- there is a communication cost involved. In general, we need to take into account the communication costs for each link in our network topologies and plan accordingly to minimize the total time required to do a broadcast.''
``Since the Apollo is a distributed shared memory machine, memory access and communication times are not uniform,'' Valentine told Swigert. ``Communication is fast between processors that share the same memory subsystem, but it is slower between processors that are not on the same subsystem. Communication between the Apollo and machines in our lab is slower yet.''
``How is Apollo's port of the Message Passing Interface (MPI) working out?'' Swigert asked.
``Not so well,'' Valentine replied. ``To do a broadcast of a message from one processor to all the other n-1 processors, they just do a sequence of n-1 sends. That really serializes things and kills the performance.''
``Is there anything you can do to fix that?''
``Yes,'' smiled Valentine. ``There is. Once the first processor has sent the message to another, those two can then send messages to two other hosts at the same time. Then there will be four hosts that can send, and so on.''
``Ah, so you can do the broadcast as a binary tree!''
``Not really a binary tree -- there are some particular features of our network that we should exploit. The interface cards we have allow each processor to simultaneously send messages to any number of the other processors connected to it. However, the messages don't necessarily arrive at the destinations at the same time -- there is a communication cost involved. In general, we need to take into account the communication costs for each link in our network topologies and plan accordingly to minimize the total time required to do a broadcast.''
Input
The input will describe the topology of a network connecting n processors. The first line of the input will be n, the number of processors, such that 1 <= n <= 100.
The rest of the input defines an adjacency matrix, A. The adjacency matrix is square and of size n x n. Each of its entries will be either an integer or the character x. The value of A(i,j) indicates the expense of sending a message directly from node i to node j. A value of x for A(i,j) indicates that a message cannot be sent directly from node i to node j.
Note that for a node to send a message to itself does not require network communication, so A(i,i) = 0 for 1 <= i <= n. Also, you may assume that the network is undirected (messages can go in either direction with equal overhead), so that A(i,j) = A(j,i). Thus only the entries on the (strictly) lower triangular portion of A will be supplied.
The input to your program will be the lower triangular section of A. That is, the second line of input will contain one entry, A(2,1). The next line will contain two entries, A(3,1) and A(3,2), and so on.
The rest of the input defines an adjacency matrix, A. The adjacency matrix is square and of size n x n. Each of its entries will be either an integer or the character x. The value of A(i,j) indicates the expense of sending a message directly from node i to node j. A value of x for A(i,j) indicates that a message cannot be sent directly from node i to node j.
Note that for a node to send a message to itself does not require network communication, so A(i,i) = 0 for 1 <= i <= n. Also, you may assume that the network is undirected (messages can go in either direction with equal overhead), so that A(i,j) = A(j,i). Thus only the entries on the (strictly) lower triangular portion of A will be supplied.
The input to your program will be the lower triangular section of A. That is, the second line of input will contain one entry, A(2,1). The next line will contain two entries, A(3,1) and A(3,2), and so on.
Output
Your program should output the minimum communication time required to broadcast a message from the first processor to all the other processors.
Sample Input
5 50 30 5 100 20 50 10 x x 10
Sample Output
35
这个题只想说前面啰里啰唆的都是什么?。。。完全不用看Description直接看Input都够用了。给了一半的图的邻接表,x就代表两点之间没有通路。题目求的是从第一个processor传播到整个网络的最短时间。
标准的Dijkstra,因为它就是要求从第一个点的最短时间,所以直接调用Dijkstra函数了。
代码:
#include <iostream> #include <algorithm> #include <cmath> #include <vector> #include <string> #include <cstring> #pragma warning(disable:4996) using namespace std; const int MAX=0xfffffff; int edge[105][105]; int vist[105],minidis[105]; int num; void init() { int i,j; memset(vist,0,sizeof(vist)); for(i=1;i<=num;i++) { for(j=1;j<=num;j++) { if(j==i) edge[i][j]=0; else edge[i][j]=-1; } } for(i=1;i<=num;i++) { vist[i]=0; minidis[i]=MAX; } } void dijkstra(int i) { int j,k; int position=i; vist[position]=1; minidis[position]=0; for(j=1;j<=num-1;j++)//一共要添加进num-1个点 { for(k=1;k<=num;k++) { if(vist[k]==0 && edge[position][k]!=-1 && minidis[position]+edge[position][k] < minidis[k])//新填入的点更新minidis { minidis[k]=minidis[position]+edge[position][k]; } } int min_value=MAX,min_pos; for(k=1;k<=num;k++) { if(vist[k]==0 && minidis[k]<min_value)//比较出最小的那一个作为新添入的店 { min_value = minidis[k]; min_pos = k; } } vist[min_pos]=1; position=min_pos; } } int main() { int i,j; char temp[30]; cin>>num; init(); for(i=2;i<=num;i++) { for(j=1;j<i;j++) { cin>>temp; if(strcmp(temp,"x")) edge[j][i]=edge[i][j]=atoi(temp); } } dijkstra(1); int max_value = -1; for(i=1;i<=num;i++) { if(minidis[i]>max_value) { max_value=minidis[i]; } } cout<<max_value<<endl; return 0; }
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