DFS（二）：骑士游历问题

      在国际象棋的棋盘（8行×8列）上放置一个马，按照“马走日字”的规则，马要遍历棋盘，即到达棋盘上的每一格，并且每格只到达一次。例如，下图给出了骑士从坐标（1,5）出发，游历棋盘的一种可能情况。

【例1】骑士游历问题。

       编写一个程序，对于给定的起始位置（x0,y0），探索出一条路径，沿着这条路径骑士能遍历棋盘上的所有单元格。

       （1）编程思路。

        采用深度优先搜索进行路径的探索。深度优先搜索用递归描述的一般框架为：

    void  dfs(int deep)      //  对deep层进行搜索

    {

          if  (符合某种要求||已经不能再搜了)

         {

               按要求进行一些处理，一般为输出;

               return ;

         }

         if   (符合某种条件且有地方可以继续搜索的)   // 这里可能会有多种情况，可能要循环什么的

        {

             vis[x][y]=1;                       //  表示结点(x，y)已访问到

             dfs(deep+1);                    //  搜索下一层

             vis[x][y]=0;                      // 改回来，表示结点(x，y)以后可能被访问
        }
    } 

      定义数组int vis[10][10]记录骑士走到的步数，vis[x][y]=num表示骑士从起点开始走到坐标为（x,y）的格子用了num步（设起点的步数为1）。初始时vis数组元素的值全部为0。

 （2）源程序。

#include <stdio.h>

#include <stdlib.h>

int N,M;

int vis[10][10]={0};

// 定义马走的8个方向

int dir_x[8] = {-1,-2,-2,-1,1,2,2,1};

int dir_y[8] = {2,1,-1,-2,-2,-1,1,2};

void print()

{

       int i,j;

       for(i=0; i<N; i++)

       {

           for(j=0; j<M; j++)

               printf("%3d ",vis[i][j]);

           printf(" ");

        }

}

void DFS(int cur_x,int cur_y,int step)

{

   if(step==N*M+1 )

   {

        print();

        exit(1);

   } 

   int next_x,next_y;

   for(int i=0; i<8; i++)

   {

     next_x = cur_x+dir_x[i];

     next_y = cur_y+dir_y[i];

     if (next_x<0 || next_x>=N || next_y<0 || next_y>=M || vis[next_x][next_y]!=0)

          continue;

     vis[next_x][next_y] = step;

     DFS(next_x,next_y,step+1);

     vis[next_x][next_y] = 0;

   }

}

int main()

{

   printf("请输入棋盘的行数和列数(均小于10)：");

   scanf("%d %d",&N,&M);

   printf("请输入出发点坐标：(0—%d,0-%d)：",N-1,M-1);

   int x0,y0;

   scanf("%d%d",&x0,&y0);

   vis[x0][y0] = 1;

   DFS(x0,y0,2);

   return 0;

} 

       （3）运行效果。

     

 【例2】A Knight's Journey（POJ 2488）

Description
Background
The knight is getting bored of seeing the same black and white squares again and again and has decided to make a journey around the world. Whenever a knight moves, it is two squares in one direction and one square perpendicular to this. The world of a knight is the chessboard he is living on. Our knight lives on a chessboard that has a smaller area than a regular 8 * 8 board, but it is still rectangular. Can you help this adventurous knight to make travel plans?
Problem
Find a path such that the knight visits every square once. The knight can start and end on any square of the board.
Input
The input begins with a positive integer n in the first line. The following lines contain n test cases. Each test case consists of a single line with two positive integers p and q, such that 1 <= p * q <= 26. This represents a p * q chessboard, where p describes how many different square numbers 1, . . . , p exist, q describes how many different square letters exist. These are the first q letters of the Latin alphabet: A, . . .
Output
The output for every scenario begins with a line containing "Scenario #i:", where i is the number of the scenario starting at 1. Then print a single line containing the lexicographically first path that visits all squares of the chessboard with knight moves followed by an empty line. The path should be given on a single line by concatenating the names of the visited squares. Each square name consists of a capital letter followed by a number.
If no such path exist, you should output impossible on a single line.
Sample Input
3
1 1
2 3
4 3
Sample Output
Scenario #1:
A1

Scenario #2:
impossible

Scenario #3:
A1B3C1A2B4C2A3B1C3A4B2C4

      （1）编程思路。

       同样用深度优先搜索。但由于题目要输出字典序最小的，所以遍历时8个方向的偏移组合顺序为：{-2,-1}, {-2,1}, {-1,-2}, {-1,2}, {1,-2}, {1,2}, {2,-1}, {2,1}。

      （2）源程序。

#include<stdio.h>  

int dir_x[8] = {-2,-2,-1,-1, 1, 1, 2, 2};

int dir_y[8] = {-1, 1,-2, 2,-2, 2,-1, 1};

int vis[27][27]; 

int len,x,y; 

bool flag; 

struct Node 

{ 

    int x,y; 

}node[1000]; 

void DFS(int cur_x,int cur_y) 

{ 

    if(len==x*y) 

    { 

        flag=true; 

        return ; 

    } 

    for(int i=0; i<8; i++) 

    { 

        int next_x=cur_x+dir_x[i]; 

        int next_y=cur_y+dir_y[i]; 

        if(next_x>0 && next_x<=x && next_y>0 && next_y<=y && vis[next_x][next_y]!=1) 

        { 

            node[len].x=next_x; 

            node[len].y=next_y; 

            vis[next_x][next_y]=1; 

            ++len;

            DFS(next_x,next_y); 

            if(len==x*y) 

            { 

                flag=true; 

                return ; 

            } 

            --len; 

            vis[next_x][next_y]=0; 

        } 

    } 

} 

int main() 

{ 

    int nCase; 

    int n,i,j; 

    scanf("%d",&nCase); 

    for(n=1; n<=nCase; n++) 

    { 

        flag=false; 

        len=0;

        for (i=0;i<27;i++)

           for (j=0;j<27;j++)

               vis[i][j]=0; 

        node[0].x=1; 

        node[0].y=1; 

        vis[1][1]=1; 

        scanf("%d%d",&y,&x); 

        ++len; 

        DFS(1,1); 

        printf("Scenario #%d: ",n); 

        if(flag==false) 

        { 

            printf("impossible ");

            continue; 

        } 

        for(i=0; i<len; i++) 

        { 

            printf("%c%d",(node[i].x-1)+'A',node[i].y); 

        } 

        printf(" ");

            } 

    return 0; 

}