hdu Illusive Chase 1364 dfs

Illusive Chase


Time Limit: 2000/1000 MS (Java/Others)    Memory Limit: 65536/32768 K (Java/Others)
Total Submission(s): 174    Accepted Submission(s): 74




Problem Description
Tom the robocat is presented in a Robotics Exhibition for an enthusiastic audience of youngsters, placed around an m n field. Tom which is turned off initially is placed in some arbitrary point in the field by a volunteer from the audience. At time zero of the show, Tom is turned on by a remote control. Poor Tom is shown a holographic illusion of Jerry in a short distance such that a direct path between them is either vertical or horizontal. There may be obstacles in the field, but the illusion is always placed such that in the direct path between Tom and the illusion, there would be no obstacles. Tom tries to reach Jerry, but as soon as he gets there, the illusion changes its place and the chase goes on. Let's call each chase in one direction (up, down, left, and right), a chase trip. Each trip starts from where the last illusion was deemed and ends where the next illusion is deemed out. After a number of chase trips, the holographic illusion no more shows up, and poor Tom wonders what to do next. At this time, he is signaled that for sure, if he returns to where he started the chase, a real Jerry is sleeping and he can catch it.


To simplify the problem, we can consider the field as a grid of squares. Some of the squares are occupied with obstacles. At any instant, Tom is in some unoccupied square of the grid and so is Jerry, such that the direct path between them is either horizontal or vertical. It's assumed that each time Tom is shown an illusion; he can reach it by moving only in one of the four directions, without bumping into an obstacle. Tom moves into an adjacent square of the grid by taking one and only one step.


The problem is that Tom's logging mechanism is a bit fuzzy, thus the number of steps he has taken in each chase trip is logged as an interval of integers, e.g. 2 to 5 steps to the left. Now is your turn to send a program to Tom's memory to help him go back. But to ease your task in this contest, your program should only count all possible places that he might have started the chase from.
 


Input
The first line of the input file contains a single integer t (1 <= t <= 10), the number of test cases, followed by the input data for each test case. The first line of each test case contains two integers m and n, which are the number of rows and columns of the grid respectively (1 <= m, n <= 100). Next, there are m lines, each containing n integers which are either 0 or 1, indicating whether the corresponding cell of the grid is empty (0) or occupied by an obstacle (1). After description of the field, there is a sequence of lines, each corresponding to a chase trip of Tom (in order). Each line contains two positive integers which together specify the range of steps Tom has taken (inclusive), followed by a single upper-case character indicating the direction of the chase trip, which is one of the four cases of R (for right), L (for left), U (for up), and D (for down). (Note that these directions are relative to the field and are not directions to which Tom turns). This part of the test case is terminated by a line containing exactly two zeros.
 


Output
For each test case, there should be a single line, containing an integer indicating the number of cells that Tom might have started the chase from.
 


Sample Input
2
6 6
0 0 0 0 0 0
0 0 0 1 1 0
0 1 0 0 0 0
0 0 0 1 0 0
0 0 0 1 0 1
0 0 0 0 0 1
1 2 R
1 2 D
1 1 R
0 0
3 4
0 0 0 0
0 0 0 0
0 0 0 0
1 2 R
3 7 U
0 0
 


Sample Output
10

0

 

題意：輸入1個地圖，0表示可以走，1表示不能走。接下來再出現(xiàn)0 0  之前，輸入若干個操作。前兩個數(shù)字代表走的步數(shù)范圍，每次走的步數(shù)都可以是在這個范圍里的任意步。最后1個字母代表 走的方向。 輸出有多少個 為0的位置可以作為起始點。起始位置的要求是，有1種的走法，可使其  走完 給的若干個操作后，在走的進程中 不會遇到障礙1 ，并且不會超越地圖范圍。

第2個案例，由于第2個操作 最少向上走3步， 所以肯定超越范圍了。所以沒有點可以做為起始點。

 做法：枚舉所有點，dfs  所有走的步數(shù)范圍。 注意 如果步數(shù)范圍 在3⑺ 之間，那末 在小于3步的范圍內(nèi)，不能出現(xiàn)障礙，否者不能走。