POJ 3009-Curling 2.0（DFS）

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Curling 2.0

Description

On Planet MM-21, after their Olympic games this year, curling is getting popular. But the rules are somewhat different from ours. The game is played on an ice game board on wich a square mesh is marked. They use only a single stone. The purpose of the game is to lead the stone from the start to the goal with the minimum number of moves.

Fig. 1 shows an example of a game board. Some squares may be occupied with blocks. There are two special squares namely the start and the goal, which are not occupied with blocks. (These two squares are distinct.) Once the stone begins to move, it will proceed until it hits a block. In order to bring the stone to the goal, you may have to stop the stone by hitting it against a block, and throw again.

POJ 3009-Curling 2.0（DFS）

Fig. 1: Example of board (S: start, G: goal)

The movement of the stone obeys the following rules:

• At the beginning, the stone stands still at the start square.
• The movements of the stone are restricted to x and y directions. Diagonal moves are prohibited.
• When the stone stands still, you can make it moving by throwing it. You may throw it to any direction unless it is blocked immediately(Fig. 2(a)).
• Once thrown, the stone keeps moving to the same direction until one of the following occurs:
  • The stone hits a block (Fig. 2(b), (c)).
    • The stone stops at the square next to the block it hit.
    • The block disappears.
  • The stone gets out of the board.
    • The game ends in failure.
  • The stone reaches the goal square.
    • The stone stops there and the game ends in success.
• You cannot throw the stone more than 10 times in a game. If the stone does not reach the goal in 10 moves, the game ends in failure.

POJ 3009-Curling 2.0（DFS）

Fig. 2: Stone movements

Under the rules, we would like to know whether the stone at the start can reach the goal and, if yes, the minimum number of moves required.

With the initial configuration shown in Fig. 1, 4 moves are required to bring the stone from the start to the goal. The route is shown in Fig. 3(a). Notice when the stone reaches the goal, the board configuration has changed as in Fig. 3(b).

POJ 3009-Curling 2.0（DFS）

Fig. 3: The solution for Fig. D-1 and the final board configuration

Input

The input is a sequence of datasets. The end of the input is indicated by a line containing two zeros separated by a space. The number of datasets never exceeds 100.

Each dataset is formatted as follows.

the width(=w) and the height(=h) of the board First row of the board … h-th row of the board

The width and the height of the board satisfy: 2 <= w <= 20, 1 <= h <= 20.

Each line consists of w decimal numbers delimited by a space. The number describes the status of the corresponding square.

0 vacant square 1 block 2 start position 3 goal position

The dataset for Fig. D-1 is as follows:

6 6 1 0 0 2 1 0 1 1 0 0 0 0 0 0 0 0 0 3 0 0 0 0 0 0 1 0 0 0 0 1 0 1 1 1 1 1

Output

For each dataset, print a line having a decimal integer indicating the minimum number of moves along a route from the start to the goal. If there are no such routes, print -1 instead. Each line should not have any character other than this number.

Sample Input

2 1
3 2
6 6
1 0 0 2 1 0
1 1 0 0 0 0
0 0 0 0 0 3
0 0 0 0 0 0
1 0 0 0 0 1
0 1 1 1 1 1
6 1
1 1 2 1 1 3
6 1
1 0 2 1 1 3
12 1
2 0 1 1 1 1 1 1 1 1 1 3
13 1
2 0 1 1 1 1 1 1 1 1 1 1 3
0 0

Sample Output

1
4
-1
4
10
-1

写到吐啊有木有。。

题意： 给一张地图。2为起点，3为终点，有一个冰壶，从起点開始滑行。碰到石头（1）停止，这样算1步。越界算失败，问滑到终点最少多少步。到不了终点输出-1；

然后DFS就能够了。。。悲剧的是地图要初始化。不然会wa到死。。尽管如今还是不明确地图为什么非要初始化，可能是搜索过程中开全局变量会变异？

#include <algorithm>
#include <iostream>
#include <cstring>
#include <cstdlib>
#include <string>
#include <cctype>
#include <vector>
#include <cstdio>
#include <cmath>
#include <deque>
#include <stack>
#include <map>
#include <set>
#define ll long long
#define maxn 116
#define pp pair<int,int>
#define INF 0x3f3f3f3f
#define max(x,y) ( ((x) > (y)) ? (x) : (y) )#define min(x,y) ( ((x) > (y)) ? (y) : (x) )using namespace std;int n, m, ans, sx, sy;int ma[24][24];int dir[4][2] = {{0, 1}, {0, -1}, {1, 0}, { -1, 0}};void dfs(int x, int y, int step){	if (step >= 10) {		return ;	}	if (step >= ans) {		return ;	}	for (int i = 0; i < 4; i++) {		int tx = dir[i][0] + x;		int ty = dir[i][1] + y;		if (tx >= 1 && tx <= m && ty >= 1 && ty <= n && ma[tx][ty] != 1) {			while (tx >= 1 && ty >= 1 && tx <= m && ty <= n && ma[tx][ty] != 1 && ma[tx][ty] != 3) {				tx += dir[i][0];				ty += dir[i][1];			}			if ((tx == 1 || ty == 1 || tx == m || ty == n) && ma[tx][ty] == 0) {				continue;			}			if (ma[tx][ty] == 3) {				ans = min(ans, step + 1);				return ;			}			if (ma[tx][ty] == 1) {				ma[tx][ty] = 0;				dfs(tx - dir[i][0], ty - dir[i][1], step + 1);				ma[tx][ty] = 1;			}		}	}}int main(){	while (scanf("%d %d", &n, &m) != EOF) {		if (!n && !m) {			break;		}		memset(ma, 0, sizeof(ma));		for (int i = 1; i <= m; i++)			for (int j = 1; j <= n; j++) {				scanf("%d", &ma[i][j]);				if (ma[i][j] == 2) {					sx = i;					sy = j;				}			}		ans = INF;		dfs(sx, sy, 0);		if (ans != INF) {			printf("%d\n", ans);		} else {			puts("-1");		}	}	return 0;}

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