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Let T(x,y) be the number of tours over a X × Y grid such that:

  1. the tour starts in the top left square
  2. the tour consists of moves that are up, down, left, or right one square,
  3. the tour visits each square exactly once, and
  4. the tour ends in the bottom left square.

It’s easy to see, for example, that T(2,2) = 1, T(3,3) = 2, T(4,3) = 0, and T(3,4) = 4. Write a program to calculate T(10,4).

  • I have been working on this for hours ... I need a program that takes the dimensions of the grid as input and returns the number of possible tours? Any idea on how I should go about solving this?
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you have the right tags.. if you know how backtracking works this should be easy to implement. what's your problem? –  Karoly Horvath Mar 18 '12 at 23:32
Why is T(3,3) 2? –  Manish Mar 18 '12 at 23:34
and why T(2,2)=1? I can find two paths: 1 moving down 2 moving right-down-left. Maybe I misunderstood the problem... –  Saphrosit Mar 18 '12 at 23:36
@Manish: because there are 2 matching tours.. what number did you expect? –  Karoly Horvath Mar 18 '12 at 23:36
@Saphrosit: the tour visits each square exactly once –  Karoly Horvath Mar 18 '12 at 23:37

2 Answers 2

Since you're new to backtracking, this might give you an idea how you could solve this:

You need some data structure to represent the state of the cells on the grid (visited/not visited).

Your algorithm:

step(posx, posy, steps_left)
    if it is not a valid position, or already visited
    if it's the last step and you are at the target cell
        you've found a solution, increment counter
    mark cell as visited             
    for each possible direction:
       step(posx_next, posy_next, steps_left-1)
    mark cell as not visited

and run with

step(0, 0, sizex*sizey)

The basic building blocks of backtracking are: evaluation of the current state, marking, the recursive step and the unmarking.

This will work fine for small boards. The real fun starts with larger boards where you have to cut branches on the tree which aren't solvable (eg: there's an unreachable area of not visited cells).

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@KarolyHarovath I dont understand what you use step+left for? –  user1277552 Mar 19 '12 at 1:08
@KarolyHarovath Also how do I decide what posx_next and posy_next should be and where do I add the code for that? –  user1277552 Mar 19 '12 at 1:08
example: if you go to the right, posx_next = posx+1, posy_next = posy. –  Karoly Horvath Mar 19 '12 at 1:10
@KorolyHarvoth Can you tell me how I check which move from a specific point in the grid is valid? –  user1277552 Mar 19 '12 at 2:11
<code>#include <iostream> int grid[3][3]; int c = 0; int main(){ solve (0, 0, 9); } int solve (int posx, int posy, steps_left){ if (grid[posx][posy] = 1){ return 0; } if (steps_left = 1 && posx = 0 && posy = 2){ c = c+1; return 0; } grid[posx][posy] = 1; // for all possible directions { solve (posx_next, posy_next, steps_left-1) } grid[posx][posy] = 0; } </code> @KarolyHorvath it only deals with jsut one case right now. I cant seem to figure out how to check all directions ? –  user1277552 Mar 19 '12 at 18:03

The assigned exercise is a good one. It forces you to think through several concepts, step-by-step. I cannot think all the concepts through for you, but maybe I can help by asking the following question.

At some point, your program must represent a partially completed tour. That is, it must represent a path which does not yet pass through all the squares and has not yet reached its target in the bottom left, but which might do both if the path were later extended. How do you mean to represent a partially completed tour?

If you can answer the question, and if you grasp the concept of recursion, then one suspects that you can solve the problem with some work but without too much real trouble. To represent the partially completed tour is your obstacle, so my recommendation is that you go to work on that.

Update: See the comment of @KarolyHorvath below. If you have not yet learned the use of dynamically allocated memory (or, equivalently, of STL containers like std::vector and std::list), then you should rather follow his hint, which is a good hint in any case.

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hint: there's no need to represent the tour –  Karoly Horvath Mar 18 '12 at 23:45
@KarolyHorvath: You're right, of course, though the algorithm is more flexible if one does explicitly represent it. –  thb Mar 18 '12 at 23:48
@KarolyHorvath are you saying this is not how we should do it? DO you have any ideas? –  user1277552 Mar 18 '12 at 23:48
I wouldn't do represent the tour. sure, it's quite simple. but since this looks like a homework assignment I won't post a full answer... see my question in the comment section and please don't post here as it is not related to @thb's answer. thx. –  Karoly Horvath Mar 18 '12 at 23:58
The approach of @KarolyHorvath will enjoy far better performance for large grids. –  thb Mar 19 '12 at 0:08

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