Hart is engaged in playing an interesting game, Gnome Tetravex, these days. In the game, at the beginning, the player is given n*n squares. Each square is divided into four triangles marked four numbers (range from 0 to 9). In a square, the triangles are the left triangle, the top triangle, the right triangle and the bottom triangle. For example, Fig. 1 shows the initial state of 2*2 squares.
Fig. 1 The initial state with 2*2 squares
The player is required to move the squares to the termination state. In the termination state, any two adjoining squares should make the adjacent triangle marked with the same number.
Fig. 2 shows one of the termination states of the above example.
Fig. 2 One termination state of the above example
It seems the game is not so hard. But indeed, Hart is not accomplished in the game. He can finish the easiest game successfully. When facing with a more complex game, he can find no way
out.
One day, when Hart was playing a very complex game, he cried out, "The computer is making a goose of me. It‘s impossible to solve it." To such a poor player, the best way to help him is to tell him whether the game could be solved. If he is told the game is
unsolvable, he needn‘t waste so much time on it.
Input
The input file consists of several game cases. The first line of each game case contains one integer n, 0 <= n <= 5, indicating the size of the game.
The following n*n lines describe the marking number of these triangles. Each line consists of four integers, which in order represent the top triangle, the right triangle, the bottom triangle and the left triangle of one square.
After the last game case, the integer 0 indicates the termination of the input data set.
Output
You should make the decision whether the game case could be solved. For each game case, print the game number, a colon, and a white space, then display your judgment. If the game is solvable, print the string "Possible". Otherwise, please print "Impossible"
to indicate that there‘s no way to solve the problem.
Print a blank line between each game case.
Note: Any unwanted blank lines or white spaces are unacceptable.
Sample Input
2
5 9 1 4
4 4 5 6
6 8 5 4
0 4 4 3
2
1 1 1 1
2 2 2 2
3 3 3 3
4 4 4 4
0
Output for the Sample Input
Game 1: Possible
Game 2: Impossible
对这N*N个格子逐个摆放,每次放当前位置时,判断该格子的上是否和前一行的下相等、该格子的右是否和前一列的左相等。
#include"stdio.h" #include"string.h" #include"queue" #include"algorithm" using namespace std; #define N 50 struct node { int t,r,d,l; bool operator==(const node &a) //定义什么是相等 { return t==a.t&&r==a.r&&d==a.d&&l==a.l; } }tmp,g[N],v[N][N]; int num[N],ok,k; void dfs(int cur,int n) { int i,x,y; if(ok) return ; if(cur==n*n) { ok=1;return ; } x=cur/n; //行列坐标 y=cur%n; for(i=0;i<k;i++) { if(num[i]==0) continue; if(x>0&&g[i].t!=v[x-1][y].d) continue; if(y>0&&g[i].l!=v[x][y-1].r) continue; v[x][y]=g[i]; num[i]--; dfs(cur+1,n); num[i]++; } return ; } int main() { int i,j,n,cnt=0; while(scanf("%d",&n),n) { if(cnt) puts(""); memset(num,0,sizeof(num)); for(i=k=0;i<n*n;i++) { scanf("%d%d%d%d",&tmp.t,&tmp.r,&tmp.d,&tmp.l); for(j=0;j<k;j++) { if(tmp==g[j]) { num[j]++; break; } } if(j==k) { g[k]=tmp; num[k++]=1; } } ok=0; dfs(0,n); if(ok) printf("Game %d: Possible\n",++cnt); else printf("Game %d: Impossible\n",++cnt); } return 0; }
zoj 1008 Gnome Tetravex (dfs+枚举),布布扣,bubuko.com
zoj 1008 Gnome Tetravex (dfs+枚举)
原文:http://blog.csdn.net/u011721440/article/details/38586297