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I need to set up a 2 dimensional space (for all practical purposes, a 2-D array) of paths.. Every index [y][x] contains a path..such as

+--  --+   +--  --+
|  ||  |   |  ||  |
|  | ==     ==++== 
|  ||  |   |      |
+--  --+   +------+

While I can initialize this space randomly, I want to be able to generate a sequence of paths that ensures that every coordinate can be reached from every other coordinate.

What algorithm should I be looking at to solve this?

I've learnt many path finding algorithms such as Dijkstra’s or A*, but I don't think these are usable for my problem.

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brute force method is to solve the maze like a kid. start at the opening and draw a line to every area without lifting the pen. if there's any unpainted areas after you exhausted all the path possibilities, you've got an unreachable area. –  Marc B Apr 23 '13 at 16:59
    
I was looking for any approach better than brute force. Brute force I think will work out to be O(n^2) –  user1761555 Apr 23 '13 at 17:00
    
You want a maze generation algorithm? Well, there you go. –  Dukeling Apr 23 '13 at 17:18
    
Can you explain what's going on in that image? Also, "Every index [y][x] contains a path" - each cell contains an entire path? –  Dukeling Apr 23 '13 at 17:26
    
Those are individual cells, they have paths in the form of a T or a horizontal T. –  Mariano Apr 23 '13 at 17:36

1 Answer 1

The problem you have is essentially equivalent to finding a spanning tree, which can be done in O(n) using either Depth-First Search or Breadth-First Search.

Hint: Note that if A is reachable from B and B is reachable from C, then A is reachable from C (transitivity); also as long as you don't have one way corridor then if A is reachable from B then B is also reachable from A (reflexivity).

For generating maze, once you generated a span, then you may start adding extra edges to add some variation (though extra edges usually makes the maze easier to solve). The span guarantees the connectivity.

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