seeking communication block dfs
The first question: HDU1241 Oil Deposits
Problem Description
The GeoSurvComp geologic survey company is responsible for detecting underground oil deposits. GeoSurvComp works with one large rectangular region of land at a time, and creates a grid that divides the land into numerous square plots. It then analyzes each plot separately, using sensing equipment to determine whether or not the plot contains oil. A plot containing oil is called a pocket. If two pockets are adjacent, then they are part of the same oil deposit. Oil deposits can be quite large and may contain numerous pockets. Your job is to determine how many different oil deposits are contained in a grid.
Input
The input file contains one or more grids. Each grid begins with a line containing m and n, the number of rows and columns in the grid, separated by a single space. If m = 0 it signals the end of the input; otherwise 1 <= m <= 100 and 1 <= n <= 100. Following this are m lines of n characters each (not counting the end-of-line characters). Each character corresponds to one plot, and is either ’*‘, representing the absence of oil, or ’@‘, representing an oil pocket.
Output
For each grid, output the number of distinct oil deposits. Two different pockets are part of the same oil deposit if they are adjacent horizontally, vertically, or diagonally. An oil deposit will not contain more than 100 pockets.
Sample Input
1 1
*
3 5
*@*@*
**@**
*@*@*
1 8
@@****@*
5 5
****@
*@@*@
*@**@
@@@*@
@@**@
0 0 Sample Output
0
1
2
2
#include<iostream>
#include<cstdio>
using namespace std;
int m,n;
char map[105][105];
int dir[8][2]={{0,1},{0,-1},{1,0},{-1,0},{1,1},{1,-1},{-1,1},{-1,-1}};
void dfs(int x,int y){
for(int i=0;i<8;i++){
int xx=x+dir[i][0];
int yy=y+dir[i][1];
if(xx>=0&&xx<m&&yy>=0&&yy<n){
if(map[xx][yy]=='@'){
map[xx][yy]='*';
dfs(xx,yy);
}
}
}
}
int main(){
while(scanf("%d%d",&m,&n)){
if(m==0&&n==0)break;
//getchar();
for(int i=0;i<m;i++){
for(int j=0;j<n;j++){
//直接用cin的好处,可以无视'\n'也就是说cin无法输入换行符,但是getchar和scanf会输入换行符
cin>>map[i][j];
}
}
int sum=0;
for(int i=0;i<m;i++){
for(int j=0;j<n;j++){
if(map[i][j]=='@'){
map[i][j]='*';
sum++;
dfs(i,j);
}
}
}
printf("%d\n",sum);
}
return 0;
}A similar topic
The second question: HDU1312 Red and Black
Problem Description
There is a rectangular room, covered with square tiles. Each tile is colored either red or black. A man is standing on a black tile. From a tile, he can move to one of four adjacent tiles. But he can't move on red tiles, he can move only on black tiles.
Write a program to count the number of black tiles which he can reach by repeating the moves described above.
Input
The input consists of multiple data sets. A data set starts with a line containing two positive integers W and H; W and H are the numbers of tiles in the x- and y- directions, respectively. W and H are not more than 20.
There are H more lines in the data set, each of which includes W characters. Each character represents the color of a tile as follows.
'.' - a black tile
'#' - a red tile
'@' - a man on a black tile(appears exactly once in a data set)
Output
For each data set, your program should output a line which contains the number of tiles he can reach from the initial tile (including itself).
Sample Input
6 9
....#.
.....#
......
......
......
......
......
#@...#
.#..#.
11 9
.#.........
.#.#######.
.#.#.....#.
.#.#.###.#.
.#.#..@#.#.
.#.#####.#.
.#.......#.
.#########.
...........
11 6
..#..#..#..
..#..#..#..
..#..#..###
..#..#..#@.
..#..#..#..
..#..#..#..
7 7
..#.#..
..#.#..
###.###
...@...
###.###
..#.#..
..#.#..
0 0Sample Output
45
59
6
13
ACcode
#include<iostream>
#include<cstdio>
#include<cstring>
using namespace std;
int w,h;
int s_x,s_y;
int total=0;
char map[22][22];
char vis[22][22];
int dir[4][2]={0,1,0,-1,1,0,-1,0};
void dfs(int x,int y){
for(int i=0;i<4;i++){
int xx=x+dir[i][0];
int yy=y+dir[i][1];
if(xx>=0&&xx<h&&yy>=0&&yy<w&&map[xx][yy]=='.'&&vis[xx][yy]==0){
total++;
vis[xx][yy]=1;
dfs(xx,yy);
}
}
}
int main(){
while(scanf("%d %d",&w,&h)){
if(w==0&&h==0)break;
total=0;
getchar();
for(int i=0;i<h;i++){
for(int j=0;j<w;j++){
scanf("%c",&map[i][j]);
if(map[i][j]=='@'){s_x=i;s_y=j;map[i][j]='.';}
vis[i][j]=0;
}
getchar();
}
vis[s_x][s_y]=1;
total++;
dfs(s_x,s_y);
printf("%d\n",total);
}
return 0;
}
//不给初始点加访问标记的话,如果只有@一个点,直接走出去,为0
//所有这些都得先标记,避免当数很小的时候直接走出去而不进行计数自增操作
//也可以直接在dfs函数的第一行进行x,y访问标记。The third question
1. Parity pruning
very simple concept of a
set starting point coordinates bx, by; the end point coordinates ex, ey;
shortest path is abs (bx-ex) + abs (by-ey)
, but it is clear we can see, whether it is walking, certainly more than the shortest number of steps in our path to an even number
so, the first point to simplify: if the number of steps in the title input than the shortest path plenty an odd number, then we will never go to, the direct output nO;
2. pruning path
once is greater than the number of steps equal to the required end point has not been found and the large ones in the current process of DFS, the output directly nO
& Calculation,
n 1 & n of 2 is equivalent to taking the remainder, if n is odd, the answer is 1
Problem Description
The doggie found a bone in an ancient maze, which fascinated him a lot. However, when he picked it up, the maze began to shake, and the doggie could feel the ground sinking. He realized that the bone was a trap, and he tried desperately to get out of this maze.
The maze was a rectangle with sizes N by M. There was a door in the maze. At the beginning, the door was closed and it would open at the T-th second for a short period of time (less than 1 second). Therefore the doggie had to arrive at the door on exactly the T-th second. In every second, he could move one block to one of the upper, lower, left and right neighboring blocks. Once he entered a block, the ground of this block would start to sink and disappear in the next second. He could not stay at one block for more than one second, nor could he move into a visited block. Can the poor doggie survive? Please help him.
Input
The input consists of multiple test cases. The first line of each test case contains three integers N, M, and T (1 < N, M < 7; 0 < T < 50), which denote the sizes of the maze and the time at which the door will open, respectively. The next N lines give the maze layout, with each line containing M characters. A character is one of the following:
'X': a block of wall, which the doggie cannot enter;
'S': the start point of the doggie;
'D': the Door; or
'.': an empty block.
The input is terminated with three 0's. This test case is not to be processed.
Output
For each test case, print in one line "YES" if the doggie can survive, or "NO" otherwise.
Sample Input
4 4 5
S.X.
..X.
..XD
....
3 4 5
S.X.
..X.
...D
0 0 0
Sample Output
NO
YES
Dfs rather than with bfs, arguably, should be the shortest path, but the problem is the number of steps required and just in time, but bfs can not do this.
So with dfs
ACcode
#include<iostream>
#include<cstdio>
#include<cmath>
#include<cstdlib>
using namespace std;
char maze[8][8];
int ma[8][8];
int s_x,s_y,e_x,e_y;
int n,m,t;
int dir[4][2]={1,0,-1,0,0,1,0,-1};
int flag=0;
int wall=0;
void dfs(int x,int y,int step){
if(step==t&&e_x==x&&e_y==y){
flag=1;
return;
}
if(flag){
return;
}
if(step>t){
return;
}
//奇偶剪枝,目前所在的点到终点的距离与当前已走的点减去时间点比较
int temp=abs(x-e_x)+abs(y-e_y)-abs(step-t);
//如果是一个奇数,或者当要走的路大于应该走的步数的时候return
if(temp>0||temp%2)return;
//temp&1表示判断是偶数还是奇数
for(int i=0;i<4;i++){
int xx=x+dir[i][0];
int yy=y+dir[i][1];
if(xx>=0&&xx<n&&yy>=0&&yy<m&&ma[xx][yy]==1){
ma[xx][yy]=0;
dfs(xx,yy,step+1);
//回溯!!!
ma[xx][yy]=1;
}
}
//
}
int main(){
while(cin>>n>>m>>t,(m+n+t)!=0){
//注意初始
wall=0;
flag=0;
getchar();
for(int i=0;i<n;i++){
for(int j=0;j<m;j++){
char z;
scanf("%c",&z);
if(z=='.'){
ma[i][j]=1;
}else if(z=='S'){
ma[i][j]=1;
s_x=i,s_y=j;
}else if(z=='D'){
ma[i][j]=1;
e_x=i,e_y=j;
}else{
ma[i][j]=0;
wall++;
}
}
getchar();
}
//注意初始
ma[s_x][s_y]=0;
dfs(s_x,s_y,0);
//输入问题,当输入的条件不可执行的时候输出no
if(m*n-wall<t){
printf("NO\n");
}else{
if(flag==1){
printf("YES\n");
}else{
printf("NO\n");
}
}
}
return 0;
}